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	arXiv:1001.0044v3 [math.PR] 31 Mar 2011A law of large numbers approximation for
	Markov population processes with countably
	many types
	A. D. Barbour∗and M. J. Luczak†
	Universit¨ at Z¨ urich and London School of Economics
	Abstract
	When modelling metapopulation dynamics, the inﬂuence of a s in-
	gle patch on the metapopulation depends on the number of indi vidu-
	als in the patch. Since the population size has no natural upp er limit,
	this leads to systems in which there are countably inﬁnitely many
	possible types of individual. Analogous considerations ap ply in the
	transmission of parasitic diseases. In this paper, we prove a law of
	large numbers for quite general systems of this kind, togeth er with
	a rather sharp bound on the rate of convergence in an appropri ately
	chosen weighted ℓ1norm.
	Keywords: Epidemic models, metapopulation processes, countably many
	types, quantitative law of large numbers, Markov population proce sses
	AMS subject classiﬁcation: 92D30, 60J27, 60B12
	Running head: A law of large numbers approximation
	1 Introduction
	There are many biological systems that consist of entities that diﬀe r in their
	inﬂuence according to the number of active elements associated wit h them,
	∗Angewandte Mathematik, Universit¨ at Z¨ urich, Winterthurertra sse 190, CH-8057
	Z¨URICH; ADB was supported in part by Schweizerischer Nationalfond s Projekt Nr. 20–
	107935/1.
	†London School of Economics; MJL was supported in part by a STICE RD grant.
	1and can be divided into types accordingly. In parasitic diseases (Bar bour &
	Kafetzaki 1993, Luchsinger 2001a,b, Kretzschmar 1993), the in fectivity of a
	host depends on the number of parasites that it carries; in metapo pulations,
	the migration pressure exerted by a patch is related to the number of its
	inhabitants (Arrigoni 2003); the behaviour of a cell may depend on the num-
	ber of copies of a particular gene that it contains (Kimmel & Axelrod 2 002,
	Chapter 7); and so on. In none of these examples is there a natura l upper
	limit to the number of associated elements, so that the natural set ting for
	a mathematical model is one in which there are countably inﬁnitely man y
	possible types of individual. In addition, transition rates typically incr ease
	with the number of associated elements in the system — for instance , each
	parasite has an individual death rate, so that the overall death ra te of par-
	asites grows at least as fast as the number of parasites — and this le ads
	to processes with unbounded transition rates. This paper is conce rned with
	approximations to density dependent Markov models of this kind, wh en the
	typical population size Nbecomes large.
	In density dependent Markov population processes with only ﬁnitely
	many types of individual, a law of large numbers approximation, in the f orm
	ofasystemofordinarydiﬀerentialequations, wasestablishedbyK urtz(1970),
	together with a diﬀusion approximation (Kurtz, 1971). In the inﬁnit e di-
	mensional case, the law of large numbers was proved for some spec iﬁc mod-
	els (Barbour & Kafetzaki 1993, Luchsinger 2001b, Arrigoni 2003 , see also
	L´ eonard 1990), using individually tailored methods. A more general result
	was then given by Eibeck & Wagner (2003). In Barbour & Luczak (20 08),
	the law of large numbers was strengthened by the addition of an err or bound
	inℓ1that is close to optimal order in N. Their argument makes use of an
	intermediate approximation involving an independent particles proce ss, for
	which the law of large numbers is relatively easy to analyse. This proce ss is
	then shown to be suﬃciently close to the interacting process of act ual inter-
	est, by means of a coupling argument. However, the generality of t he results
	obtained is limited by the simple structure of the intermediate proces s, and
	the model of Arrigoni (2003), for instance, lies outside their scop e.
	In this paper, we develop an entirely diﬀerent approach, which circu m-
	vents the need for an intermediate approximation, enabling a much w ider
	class of models to be addressed. The setting is that of families of Mar kov
	population processes XN:= (XN(t), t≥0),N≥1, taking values in the
	countable space X+:={X∈ZZ+
	+;/summationtext
	m≥0Xm<∞}. Each component repre-
	2sents the number of individuals of a particular type, and there are c ountably
	many types possible; however, at any given time, there are only ﬁnit ely
	many individuals in the system. The process evolves as a Markov proc ess
	with state-dependent transitions
	X→X+Jat rate NαJ(N−1X), X∈ X+, J∈ J,(1.1)
	where each jump is of bounded inﬂuence, in the sense that
	J ⊂ {X∈ZZ+;/summationdisplay
	m≥0\|Xm\| ≤J∗<∞},for some ﬁxed J∗<∞,(1.2)
	so that the number of individuals aﬀected is uniformly bounded. Dens ity
	dependence is reﬂected in the fact that the arguments of the fun ctionsαJ
	are counts normalised by the ‘typical size’ N. Writing R:=RZ+
	+, the func-
	tionsαJ:R →R+are assumed to satisfy
	/summationdisplay
	J∈JαJ(ξ)<∞, ξ∈ R0, (1.3)
	whereR0:={ξ∈ R:ξi= 0 for all but ﬁnitely many i}; this assumption
	implies that the processes XNare pure jump processes, at least for some
	non-zero length of time. To prevent the paths leaving X+, we also assume
	thatJl≥ −1 for each l, and that αJ(ξ) = 0 ifξl= 0 for any J∈ Jsuch
	thatJl=−1. Some remarks on the consequences of allowing transitions J
	withJl≤ −2 for some lare made at the end of Section 4.
	Thelawoflargenumbersisthenformallyexpressed intermsofthesy stem
	ofdeterministic equations
	dξ
	dt=/summationdisplay
	J∈JJαJ(ξ) =:F0(ξ), (1.4)
	to be understood componentwise for those ξ∈ Rsuch that
	/summationdisplay
	J∈J\|Jl\|αJ(ξ)<∞,for alll≥0,
	thus by assumption including R0. Here, the quantity F0represents the in-
	ﬁnitesimal average drift of the components of the random proces s. However,
	in this generality, it is not even immediately clear that equations (1.4) h ave
	a solution.
	3In order to make progress, it is assumed that the unbounded comp onents
	in the transition rates can be assimilated into a linear part, in the sens e
	thatF0can be written in the form
	F0(ξ) =Aξ+F(ξ), (1.5)
	again to be understood componentwise, where Ais a constant Z+×Z+
	matrix. These equations are then treated as a perturbed linear sy stem
	(Pazy 1983, Chapter 6). Under suitable assumptions on A, there exists a
	measure µonZ+, deﬁning a weighted ℓ1norm/⌊ard⌊l · /⌊ard⌊lµonR, and a strongly
	/⌊ard⌊l·/⌊ard⌊lµ–continuoussemigroup {R(t), t≥0}oftransitionmatriceshaving point-
	wise derivative R′(0) =A. IfFis locally /⌊ard⌊l·/⌊ard⌊lµ–Lipschitz and /⌊ard⌊lx(0)/⌊ard⌊lµ<∞,
	this suggests using the solution xof the integral equation
	x(t) =R(t)x(0)+/integraldisplayt
	0R(t−s)F(x(s))ds (1.6)
	as an approximation to xN:=N−1XN, instead of solving the deterministic
	equations (1.4) directly. We go on to show that the solution XNof the
	stochastic system can be expressed using a formula similar to (1.6), which
	has an additional stochastic component in the perturbation:
	xN(t) =R(t)xN(0)+/integraldisplayt
	0R(t−s)F(xN(s))ds+/tildewidemN(t),(1.7)
	where
	/tildewidemN(t) :=/integraldisplayt
	0R(t−s)dmN(s), (1.8)
	andmNis the local martingale given by
	mN(t) :=xN(t)−xN(0)−/integraldisplayt
	0F0(xN(s))ds. (1.9)
	The quantity mNcanbe expected to be small, at least componentwise, under
	reasonable conditions.
	To obtain tight control over /tildewidemNin all components simultaneously, suf-
	ﬁcient to ensure that sup0≤s≤t/⌊ard⌊l/tildewidemN(s)/⌊ard⌊lµis small, we derive Chernoﬀ–like
	boundsonthedeviations ofthemost signiﬁcant components, witht hehelpof
	a family of exponential martingales. The remaining components are t reated
	usingsomegeneral a prioriboundsonthebehaviourofthestochasticsystem.
	4This allows us to take the diﬀerence between the stochastic and det erministic
	equations (1.7) and (1.6), after which a Gronwall argument can be c arried
	through, leading to the desired approximation.
	The main result, Theorem 4.7, guarantees an approximation error o f or-
	derO(N−1/2√logN) in the weighted ℓ1metric/⌊ard⌊l·/⌊ard⌊lµ, except on an event of
	probability of order O(N−1logN). More precisely, for each T >0, there
	exist constants K(1)
	T,K(2)
	T,K(3)
	Tsuch that, for Nlarge enough, if
	/⌊ard⌊lN−1XN(0)−x(0)/⌊ard⌊lµ≤K(1)
	T/radicalbigg
	logN
	N,
	then
	P/parenleftBig
	sup
	0≤t≤T/⌊ard⌊lN−1XN(t)−x(t)/⌊ard⌊lµ> K(2)
	T/radicalbigg
	logN
	N/parenrightBig
	≤K(3)
	TlogN
	N.(1.10)
	Theerrorboundissharper, byafactoroflog N, thanthatgiveninBarbour&
	Luczak(2008),andthetheoremisapplicabletoamuch widerclassof models.
	However, the method of proof involves moment arguments, which r equire
	somewhat stronger assumptions on the initial state of the system , and, in
	models such as that of Barbour & Kafetzaki (1993), onthe choice of infection
	distributions allowed. The conditions under which the theorem holds c an be
	divided into three categories: growth conditions on the transition r ates, so
	that the a prioribounds, which have the character of moment bounds, can
	be established; conditions on the matrix A, suﬃcient to limit the growth of
	the semigroup R, and (together with the properties of F) to determine the
	weights deﬁning the metric in which the approximation is to be carried o ut;
	and conditions on the initial state of the system. The a priori bounds are
	derived in Section 2, the semigroup analysis is conducted in Section 3, and
	the approximation proper is carried out in Section 4. The paper conc ludes
	in Section 5 with some examples.
	The form (1.8) of the stochastic component /tildewidemN(t) in (1.7) is very simi-
	lar to that of a key element in the analysis of stochastic partial diﬀer ential
	equations; see, for example, Chow (2007, Section 6.6). The SPDE a rguments
	used for its control are however typically conducted in a Hilbert spa ce con-
	text. Our setting is quite diﬀerent in nature, and it does not seem cle ar how
	to translate the SPDE methods into our context.
	52 A priori bounds
	We begin by imposing further conditions on the transition rates of th e pro-
	cessXN, suﬃcient to constrain its paths to bounded subsets of X+dur-
	ing ﬁnite time intervals, and in particular to ensure that only ﬁnitely ma ny
	jumps can occur in ﬁnite time. The conditions that follow have the ﬂav our
	of moment conditions on the jump distributions. Since the index j∈Z+is
	symbolic in nature, we start by ﬁxing an ν∈ R, such that ν(j) reﬂects in
	some sense the ‘size’ of j, with most indices being ‘large’:
	ν(j)≥1 for allj≥0 and lim
	j→∞ν(j) =∞. (2.1)
	We then deﬁne the analogues of higher empirical moments using the q uanti-
	tiesνr∈ R, deﬁned by νr(j) :=ν(j)r,r≥0, setting
	Sr(x) :=/summationdisplay
	j≥0νr(j)xj=xTνr, x∈ R0, (2.2)
	where, for x∈ R0andy∈ R,xTy:=/summationtext
	l≥0xlyl. In particular, for X∈ X+,
	S0(X) =/⌊ard⌊lX/⌊ard⌊l1. Note that, because of (2.1), for any r≥1,
	#{X∈ X+:Sr(X)≤K}<∞for allK >0. (2.3)
	To formulate the conditions that limit the growth of the empirical mom ents
	ofXN(t) witht, we also deﬁne
	Ur(x) :=/summationdisplay
	J∈JαJ(x)JTνr;Vr(x) :=/summationdisplay
	J∈JαJ(x)(JTνr)2, x∈ R.(2.4)
	The assumptions that we shall need are then as follows.
	Assumption 2.1 There exists a νsatisfying (2.1)andr(1)
	max,r(2)
	max≥1such
	that, for all X∈ X+,
	/summationdisplay
	J∈JαJ(N−1X)\|JTνr\|<∞,0≤r≤r(1)
	max,(2.5)
	the case r= 0following from (1.2)and(1.3); furthermore, for some non-
	negative constants krl, the inequalities
	U0(x)≤k01S0(x)+k04,
	U1(x)≤k11S1(x)+k14, (2.6)
	Ur(x)≤ {kr1+kr2S0(x)}Sr(x)+kr4,2≤r≤r(1)
	max;
	6and
	V0(x)≤k03S1(x)+k05,
	Vr(x)≤kr3Sp(r)(x)+kr5,1≤r≤r(2)
	max, (2.7)
	are satisﬁed, where 1≤p(r)≤r(1)
	maxfor1≤r≤r(2)
	max.
	The quantities r(1)
	maxandr(2)
	maxusually need to be reasonably large, if Assump-
	tion 4.2 below is to be satisﬁed.
	Now, for XNas in the introduction, we let tXNndenote the time of its
	n-th jump, with tXN
	0= 0, and set tXN∞:= lim n→∞tXNn, possibly inﬁnite. For
	0≤t < tXN∞, we deﬁne
	S(N)
	r(t) :=Sr(XN(t));U(N)
	r(t) :=Ur(xN(t));V(N)
	r(t) :=Vr(xN(t)),
	(2.8)
	once again with xN(t) :=N−1XN(t), and also
	τ(N)
	r(C) := inf {t < tXN
	∞:S(N)
	r(t)≥NC}, r≥0,(2.9)
	where the inﬁmum of the empty set is taken to be ∞. Our ﬁrst result shows
	thattXN∞=∞a.s., and limits the expectations of S(N)
	0(t) andS(N)
	1(t) for any
	ﬁxedt.
	In what follows, we shall write F(N)
	s=σ(XN(u),0≤u≤s), so that
	(F(N)
	s:s≥0) is the natural ﬁltration of the process XN.
	Lemma 2.2 Under Assumptions 2.1, tXN∞=∞a.s. Furthermore, for any
	t≥0,
	E{S(N)
	0(t)} ≤(S(N)
	0(0)+Nk04t)ek01t;
	E{S(N)
	1(t)} ≤(S(N)
	1(0)+Nk14t)ek11t.
	Proof. Introducing the formal generator ANassociated with (1.1),
	ANf(X) :=N/summationdisplay
	J∈JαJ(N−1X){f(X+J)−f(X)}, X∈ X+,(2.10)
	we note that NUl(x) =ANSl(Nx). Hence, if we deﬁne M(N)
	lby
	M(N)
	l(t) :=S(N)
	l(t)−S(N)
	l(0)−N/integraldisplayt
	0U(N)
	l(u)du, t ≥0,(2.11)
	7for 0≤l≤r(1)
	max, it is immediate from (2.3), (2.5) and (2.6) that the process
	(M(N)
	l(t∧τ(N)
	1(C)), t≥0) is a zero mean F(N)–martingale for each C >0.
	In particular, considering M(N)
	1(t∧τ(N)
	1(C)), it follows in view of (2.6) that
	E{S(N)
	1(t∧τ(N)
	1(C))} ≤S(N)
	1(0)+E/braceleftBigg/integraldisplayt∧τ(N)
	1(C)
	0{k11S(N)
	1(u)+Nk14}du/bracerightBigg
	≤S(N)
	1(0)+/integraldisplayt
	0(k11E{S(N)
	1(u∧τ(N)
	1(C))}+Nk14)du.
	Using Gronwall’s inequality, we deduce that
	E{S(N)
	1(t∧τ(N)
	1(C))} ≤(S(N)
	1(0)+Nk14t)ek11t,(2.12)
	uniformly in C >0, and hence that
	P/bracketleftBig
	sup
	0≤s≤tS1(XN(s))≥NC/bracketrightBig
	≤C−1(S1(xN(0))+k14t)ek11t(2.13)
	also. Hence sup0≤s≤tS1(XN(s))<∞a.s. for any t, limC→∞τ(N)
	1(C) =∞
	a.s., and, from (2.3) and (1.3), it thus follows that tXN∞=∞a.s. The bound
	onE{S(N)
	1(t)}is now immediate, and that on E{S(N)
	0(t)}follows by applying
	the same Gronwall argument to M(N)
	0(t∧τ(N)
	1(C)).
	The next lemma shows that, if any T >0 is ﬁxed and Cis chosen large
	enough, then, with high probability, N−1S(N)
	0(t)≤Cholds for all 0 ≤t≤T.
	Lemma 2.3 Assume that Assumptions 2.1 are satisﬁed, and that S(N)
	0(0)≤
	NC0andS(N)
	1(0)≤NC1. Then, for any C≥2(C0+k04T)ek01T, we have
	P[{τ(N)
	0(C)≤T}]≤(C1∨1)K00/(NC2),
	whereK00depends on Tand the parameters of the model.
	Proof. It is immediate from (2.11) and (2.6) that
	S(N)
	0(t) =S(N)
	0(0)+N/integraldisplayt
	0U(N)
	0(u)du+M(N)
	0(t)
	≤S(N)
	0(0)+/integraldisplayt
	0(k01S(N)
	0(u)+Nk04)du+ sup
	0≤u≤tM(N)
	0(u).(2.14)
	8Hence, from Gronwall’s inequality, if S(N)
	0(0)≤NC0, then
	S(N)
	0(t)≤/braceleftbigg
	N(C0+k04T)+ sup
	0≤u≤tM(N)
	0(u)/bracerightbigg
	ek01t.(2.15)
	Now, considering the quadratic variation of M(N)
	0, we have
	E/braceleftBigg
	{M(N)
	0(t∧τ(N)
	1(C′))}2−N/integraldisplayt∧τ(N)
	1(C′)
	0V(N)
	0(u)du/bracerightBigg
	= 0 (2.16)
	for anyC′>0, from which it follows, much as above, that
	E/parenleftBig
	{M(N)
	0(t∧τ(N)
	1(C′))}2/parenrightBig
	≤E/braceleftbigg
	N/integraldisplayt
	0V(N)
	0(u∧τ(N)
	1(C′))du/bracerightbigg
	≤/integraldisplayt
	0{k03ES(N)
	1(u∧τ(N)
	1(C′))+Nk05}du.
	Using (2.12), we thus ﬁnd that
	E/parenleftBig
	{M(N)
	0(t∧τ(N)
	1(C′))}2/parenrightBig
	≤k03
	k11N(C1+k14T)(ek11t−1)+Nk05t,(2.17)
	uniformlyforall C′. Doob’smaximal inequality appliedto M(N)
	0(t∧τ(N)
	1(C′))
	now allows us to deduce that, for any C′,a >0,
	P/bracketleftBig
	sup
	0≤u≤TM(N)
	0(u∧τ(N)
	1(C′))> aN/bracketrightBig
	≤1
	Na2/braceleftbiggk03
	k11(C1+k14T){ek11T−1}+k05T/bracerightbigg
	=:C1K01+K02
	Na2,
	say, so that, letting C′→ ∞,
	P/bracketleftBig
	sup
	0≤u≤TM(N)
	0(u)> aN/bracketrightBig
	≤C1K01+K02
	Na2
	also. Taking a=1
	2Ce−k01Tand putting the result into (2.15), the lemma
	follows.
	In the next theorem, we control the ‘higher ν-moments’ S(N)
	r(t) ofXN(t).
	9Theorem 2.4 Assume thatAssumptions 2.1are satisﬁed, andthat S(N)
	1(0)≤
	NC1andS(N)
	p(1)(0)≤NC′
	1. Then, for 2≤r≤r(1)
	maxand for any C >0, we
	have
	E{S(N)
	r(t∧τ(N)
	0(C))} ≤(S(N)
	r(0)+Nkr4t)e(kr1+Ckr2)t,0≤t≤T.(2.18)
	Furthermore, if for 1≤r≤r(2)
	max,S(N)
	r(0)≤NCrandS(N)
	p(r)(0)≤NC′
	r,
	then, for any γ≥1,
	P[ sup
	0≤t≤TS(N)
	r(t∧τ(N)
	0(C))≥NγC′′
	rT]≤Kr0γ−2N−1, (2.19)
	where
	C′′
	rT:= (Cr+kr4T+/radicalbig
	(C′
	r∨1))e(kr1+Ckr2)T
	andKr0depends on C,Tand the parameters of the model.
	Proof. Recalling (2.11), use the argument leading to (2.12) with the martin-
	galesM(N)
	r(t∧τ(N)
	1(C′)∧τ(N)
	0(C)), for any C′>0, to deduce that
	ES(N)
	r(t∧τ(N)
	1(C′)∧τ(N)
	0(C))
	≤S(N)
	r(0)+/integraldisplayt
	0/parenleftBig
	{kr1+Ckr2}E/braceleftBig
	S(N)
	r(u∧τ(N)
	1(C′)∧τ(N)
	0(C))/bracerightBig
	+Nkr4/parenrightBig
	du,
	for 1≤r≤r(1)
	max, sinceN−1S(N)
	0(u)≤Cwhenu≤τ(N)
	0(C): deﬁne k12= 0.
	Gronwall’s inequality now implies that
	ES(N)
	r(t∧τ(N)
	1(C′)∧τ(N)
	0(C))≤(S(N)
	r(0)+Nkr4t)e(kr1+Ckr2)t,(2.20)
	for 1≤r≤r(1)
	max, and (2.18) follows by Fatou’s lemma, on letting C′→ ∞.
	Now, also from (2.11) and (2.6), we have, for t≥0 and each r≤r(1)
	max,
	S(N)
	r(t∧τ(N)
	0(C))
	=S(N)
	r(0)+N/integraldisplayt∧τ(N)
	0(C)
	0U(N)
	r(u)du+M(N)
	r(t∧τ(N)
	0(C))
	≤S(N)
	r(0)+/integraldisplayt
	0/parenleftBig
	{kr1+Ckr2}S(N)
	r(u∧τ(N)
	0(C))+Nkr4/parenrightBig
	du
	+ sup
	0≤u≤tM(N)
	r(u∧τ(N)
	0(C)).
	10Hence, from Gronwall’s inequality, for all t≥0 andr≤r(1)
	max,
	S(N)
	r(t∧τ(N)
	0(C))≤/braceleftBig
	N(Cr+kr4t)+ sup
	0≤u≤tM(N)
	r(u∧τ(N)
	0(C))/bracerightBig
	e(kr1+Ckr2)t.
	(2.21)
	Now, as in (2.16), we have
	E/braceleftBigg
	{M(N)
	r(t∧τ(N)
	1(C′)∧τ(N)
	0(C))}2−N/integraldisplayt∧τ(N)
	1(C′)∧τ(N)
	0(C)
	0V(N)
	r(u)du/bracerightBigg
	= 0,
	(2.22)
	from which it follows, using (2.7), that, for 1 ≤r≤r(2)
	max,
	E/parenleftBig
	{M(N)
	r(t∧τ(N)
	1(C′)∧τ(N)
	0(C))}2/parenrightBig
	≤E/braceleftBigg
	N/integraldisplayt∧τ(N)
	1(C′)∧τ(N)
	0(C))
	0V(N)
	r(u)du/bracerightBigg
	≤/integraldisplayt
	0{kr3ES(N)
	p(r)(u∧τ(N)
	1(C′)∧τ(N)
	0(C))+Nkr5}du
	≤N(C′
	r+kp(r),4T)kr3
	kp(r),1+Ckp(r),2(e(kp(r),1+Ckp(r),2t)−1)+Nkr5T,
	this last by (2.20), since p(r)≤r(1)
	maxfor 1≤r≤r(2)
	max. Using Doob’s
	inequality, it follows that, for any a >0,
	P/bracketleftBig
	sup
	0≤u≤TM(N)
	r(u∧τ(N)
	0(C))> aN/bracketrightBig
	≤1
	Na2/braceleftbiggkr3(C′
	r+kp(r),4T)
	kp(r),1+Ckp(r),2(e(kp(r),1+Ckp(r),2T)−1)+kr5T/bracerightbigg
	=:C′
	rKr1+Kr2
	Na2.
	Takinga=γ/radicalbig
	(C′
	r∨1) and putting the result into (2.21) gives (2.19), with
	Kr0= (C′
	rKr1+Kr2)/(C′
	r∨1).
	Note also that sup0≤t≤TS(N)
	r(t)<∞a.s. for all 0 ≤r≤r(2)
	max, in view of
	Lemma 2.3 and Theorem 2.4.
	In what follows, we shall particularly need to control quantities of t he
	form/summationtext
	J∈JαJ(xN(s))d(J,ζ), where xN:=N−1XNand
	d(J,ζ) :=/summationdisplay
	j≥0\|Jj\|ζ(j), (2.23)
	11forζ∈ Rchosen such that ζ(j)≥1 grows fast enough with j: see (4.12).
	Deﬁning
	τ(N)(a,ζ) := inf/braceleftBigg
	s:/summationdisplay
	J∈JαJ(xN(s))d(J,ζ)≥a/bracerightBigg
	,(2.24)
	inﬁnite if there is no such s, we show in the following corollary that, under
	suitable assumptions, τ(N)(a,ζ) is rarely less than T.
	Corollary 2.5 Assume that Assumptions 2.1 hold, and that ζis such that
	/summationdisplay
	J∈JαJ(N−1X)d(J,ζ)≤ {k1N−1Sr(X)+k2}b(2.25)
	for some 1≤r:=r(ζ)≤r(2)
	maxand some b=b(ζ)≥1. For this value
	ofr, assume that S(N)
	r(0)≤NCrandS(N)
	p(r)(0)≤NC′
	rfor some constants
	CrandC′
	r. Assume further that S(N)
	0(0)≤NC0,S(N)
	1(0)≤NC1for some
	constants C0,C1, and deﬁne C:= 2(C0+k04T)ek01T. Then
	P[τ(N)(a,ζ)≤T]≤N−1{Kr0γ−2
	a+K00(C1∨1)C−2},
	for anya≥ {k2+k1C′′
	rT}b, whereγa:= (a1/b−k2)/{k1C′′
	rT},Kr0andC′′
	rT
	are as in Theorem 2.4, and K00is as in Lemma 2.3.
	Proof. In view of (2.25), it is enough to bound the probability
	P[ sup
	0≤t≤TS(N)
	r(t)≥N(a1/b−k2)/k1].
	However, Lemma 2.3 and Theorem 2.4 together bound this probability by
	N−1/braceleftbig
	Kr0γ−2
	a+K00(C1∨1)C−2/bracerightbig
	,
	whereγais as deﬁned above, as long as a1/b−k2≥k1C′′
	rT.
	If (2.25) is satisﬁed,/summationtext
	J∈JαJ(xN(s))d(J,ζ)isa.s. bounded on0 ≤s≤T,
	becauseS(N)
	r(s) is. The corollary shows that the sum is then bounded by
	{k2+k1C′′
	r,T}b, except on an event of probability of order O(N−1). Usually,
	one can choose b= 1.
	123 Semigroup properties
	We make the following initial assumptions about the matrix A: ﬁrst, that
	Aij≥0 for alli/ne}ationslash=j≥0;/summationdisplay
	j/negationslash=iAji<∞for alli≥0,(3.1)
	and then that, for some µ∈RZ+
	+such that µ(m)≥1 for each m≥0, and
	for some w≥0,
	ATµ≤wµ. (3.2)
	We then use µto deﬁne the µ-norm
	/⌊ard⌊lξ/⌊ard⌊lµ:=/summationdisplay
	m≥0µ(m)\|ξm\|onRµ:={ξ∈ R:/⌊ard⌊lξ/⌊ard⌊lµ<∞}.(3.3)
	Note that there may be many possible choices for µ. In what follows, it is
	important that Fbe a Lipschitz operator with respect to the µ-norm, and
	this has to be borne in mind when choosing µ.
	Setting
	Qij:=AT
	ijµ(j)/µ(i)−wδij, (3.4)
	whereδis the Kronecker delta, we note that Qij≥0 fori/ne}ationslash=j, and that
	0≤/summationdisplay
	j/negationslash=iQij=/summationdisplay
	j/negationslash=iAT
	ijµ(j)/µ(i)≤w−Aii=−Qii,
	using (3.2) for the inequality, so that Qii≤0. Hence Qcan be augmented to
	a conservative Q–matrix, in the sense of Markov jump processes, by adding a
	coﬃn state ∂, and setting Qi∂:=−/summationtext
	j≥0Qij≥0. LetP(·) denote the semi-
	group of Markov transition matrices corresponding to the minimal p rocess
	associated with Q; then, in particular,
	Q=P′(0) and P′(t) =QP(t) for all t≥0 (3.5)
	(Reuter 1957, Theorem 3). Set
	RT
	ij(t) :=ewtµ(i)Pij(t)/µ(j). (3.6)
	13Theorem 3.1 LetAsatisfy Assumptions (3.1)and(3.2). Then, with the
	above deﬁnitions, Ris a strongly continuous semigroup on Rµ, and
	/summationdisplay
	i≥0µ(i)Rij(t)≤µ(j)ewtfor alljandt. (3.7)
	Furthermore, the sums/summationtext
	j≥0Rij(t)Ajk= (R(t)A)ikare well deﬁned for all
	i,k, and
	A=R′(0)andR′(t) =R(t)Afor allt≥0.(3.8)
	Proof. We note ﬁrst that, for x∈ Rµ,
	/⌊ard⌊lR(t)x/⌊ard⌊lµ≤/summationdisplay
	i≥0µ(i)/summationdisplay
	j≥0Rij(t)\|xj\|=ewt/summationdisplay
	i≥0/summationdisplay
	j≥0µ(j)Pji(t)\|xj\|
	≤ewt/summationdisplay
	j≥0µ(j)\|xj\|=ewt/⌊ard⌊lx/⌊ard⌊lµ, (3.9)
	sinceP(t) is substochastic on Z+; henceR:Rµ→ Rµ. To show strong
	continuity, we take x∈ Rµ, and consider
	/⌊ard⌊lR(t)x−x/⌊ard⌊lµ=/summationdisplay
	i≥0µ(i)/vextendsingle/vextendsingle/vextendsingle/vextendsingle/vextendsingle/summationdisplay
	j≥0Rij(t)xj−xi/vextendsingle/vextendsingle/vextendsingle/vextendsingle/vextendsingle=/summationdisplay
	i≥0/vextendsingle/vextendsingle/vextendsingle/vextendsingle/vextendsingleewt/summationdisplay
	j≥0µ(j)Pji(t)xj−µ(i)xi/vextendsingle/vextendsingle/vextendsingle/vextendsingle/vextendsingle
	≤(ewt−1)/summationdisplay
	i≥0/summationdisplay
	j≥0µ(j)Pji(t)xj+/summationdisplay
	i≥0/summationdisplay
	j/negationslash=iµ(j)Pji(t)xj+/summationdisplay
	i≥0µ(i)xi(1−Pii(t))
	≤(ewt−1)/summationdisplay
	j≥0µ(j)xj+2/summationdisplay
	i≥0µ(i)xi(1−Pii(t)),
	from which it follows that lim t→0/⌊ard⌊lR(t)x−x/⌊ard⌊lµ= 0, by dominated conver-
	gence, since lim t→0Pii(t) = 1 for each i≥0.
	The inequality (3.7) follows from the deﬁnition of Rand the fact that P
	is substochastic on Z+. Then
	(ATRT(t))ij=/summationdisplay
	k/negationslash=iQikµ(i)
	µ(k)ewtµ(k)
	µ(j)Pkj(t)+(Qii+w)ewtµ(i)
	µ(j)Pij(t)
	=µ(i)
	µ(j)[(QP(t))ij+wPij(t)]ewt,
	14with (QP(t))ij=/summationtext
	k≥0QikPkj(t) well deﬁned because P(t) is sub-stochastic
	andQis conservative. Using (3.5), this gives
	(ATRT(t))ij=µ(i)
	µ(j)d
	dt[Pij(t)ewt] =d
	dtRT
	ij(t),
	and this establishes (3.8).
	4 Main approximation
	LetXN,N≥1, beasequence ofpure jumpMarkov processes asinSection 1,
	withAandFdeﬁned as in (1.4) and (1.5), and suppose that F:Rµ→ Rµ,
	withRµas deﬁned in (3.3), for some µsuch that Assumption (3.2) holds.
	Suppose also that Fis locally Lipschitz in the µ-norm: for any z >0,
	sup
	x/negationslash=y:/bardblx/bardblµ,/bardbly/bardblµ≤z/⌊ard⌊lF(x)−F(y)/⌊ard⌊lµ//⌊ard⌊lx−y/⌊ard⌊lµ≤K(µ,F;z)<∞.(4.1)
	Then, for x(0)∈ RµandRas in (3.6), the integral equation
	x(t) =R(t)x(0)+/integraldisplayt
	0R(t−s)F(x(s))ds. (4.2)
	has a unique continuous solution xinRµon some non-empty time interval
	[0,tmax), such that, if tmax<∞, then/⌊ard⌊lx(t)/⌊ard⌊lµ→ ∞ast→tmax(Pazy 1983,
	Theorem 1.4, Chapter 6). Thus, if Awere the generator of R, the function x
	would be a mild solution of the deterministic equations (1.4). We now wish
	to show that the process xN:=N−1XNis close to x. To do so, we need a
	corresponding representation for XN.
	To ﬁnd such a representation, let W(t),t≥0, be a pure jump path on X+
	that has only ﬁnitely many jumps up to time T. Then we can write
	W(t) =W(0)+/summationdisplay
	j:σj≤t∆W(σj),0≤t≤T, (4.3)
	where ∆W(s) :=W(s)−W(s−)andσj,j≥1, denote thetimes when Whas
	its jumps. Now let Asatisfy (3.1) and (3.2), and let R(·) be the associated
	semigroup, as deﬁned in (3.6). Deﬁne the path W∗(t), 0≤t≤T, from the
	equation
	W∗(t) :=R(t)W(0)+/summationtext
	j:σj≤tR(t−σj)∆j−/integraltextt
	0R(t−s)AW(s)ds,
	(4.4)
	15where ∆ j:= ∆W(σj). Note that the latter integral makes sense, because
	each of the sums/summationtext
	j≥0Rij(t)Ajkis well deﬁned, from Theorem 3.1, and
	because only ﬁnitely many of the coordinates of Ware non-zero.
	Lemma 4.1 W∗(t) =W(t)for all0≤t≤T.
	Proof. Fix any t, and suppose that W∗(s) =W(s) for alls≤t. This is
	clearly the case for t= 0. Let σ(t)> tdenote the time of the ﬁrst jump
	ofWaftert. Then, for any 0 < h < σ(t)−t, using the semigroup property
	forRand (4.4),
	W∗(t+h)−W∗(t)
	= (R(h)−I)R(t)W(0)+/summationdisplay
	j:σj≤t(R(h)−I)R(t−σj)∆j (4.5)
	−/integraldisplayt
	0(R(h)−I)R(t−s)AW(s)ds−/integraldisplayt+h
	tR(t+h−s)AW(t)ds,
	where, in the last integral, we use the fact that there are no jumps ofW
	between tandt+h. Thus we have
	W∗(t+h)−W∗(t)
	= (R(h)−I)
	
	R(t)W(0)+/summationdisplay
	j:σj≤tR(t−σj)∆j−/integraldisplayt
	0R(t−s)AW(s)ds
	
	
	−/integraldisplayt+h
	tR(t+h−s)AW(t)ds
	= (R(h)−I)W(t)−/integraldisplayt+h
	tR(t+h−s)AW(t)ds. (4.6)
	But now, for x∈ X+,
	/integraldisplayt+h
	tR(t+h−s)Axds= (R(h)−I)x,
	from (3.8), so that W∗(t+h) =W∗(t) for all t+h < σ(t), implying that
	W∗(s) =W(s) for all s < σ(t). On the other hand, from (4.4), we have
	W∗(σ(t))−W∗(σ(t)−) = ∆W(σ(t)), so that W∗(s) =W(s) for alls≤σ(t).
	Thus we can prove equality over the interval [0 ,σ1], and then successively
	over the intervals [ σj,σj+1], until [0 ,T] is covered.
	16Now suppose that Warises as a realization of XN. ThenXNhas transi-
	tion rates such that
	MN(t) :=/summationdisplay
	j:σj≤t∆XN(σj)−/integraldisplayt
	0AXN(s)ds−/integraldisplayt
	0NF(xN(s))ds(4.7)
	is a zero mean local martingale. In view of Lemma 4.1, we can use (4.4) t o
	write
	XN(t) =R(t)XN(0)+/tildewiderMN(t)+N/integraldisplayt
	0R(t−s)F(xN(s))ds,(4.8)
	where
	/tildewiderMN(t) :=/summationdisplay
	j:σj≤tR(t−σj)∆XN(σj)
	−/integraldisplayt
	0R(t−s)AXN(s)ds−/integraldisplayt
	0R(t−s)NF(xN(s))ds.(4.9)
	Thus, comparing (4.8) and (4.2), we expect xNandxto be close, for
	0≤t≤T < tmax, provided that we can show that supt≤T/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµis small,
	where/tildewidemN(t) :=N−1/tildewiderMN(t). Indeed, if xN(0) andx(0) are close, then
	/⌊ard⌊lxN(t)−x(t)/⌊ard⌊lµ
	≤ /⌊ard⌊lR(t)(xN(0)−x(0))/⌊ard⌊lµ
	+/integraldisplayt
	0/⌊ard⌊lR(t−s)[F(xN(s))−F(x(s))]/⌊ard⌊lµds+/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµ
	≤ewt/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ
	+/integraldisplayt
	0ew(t−s)K(µ,F;2ΞT)/⌊ard⌊lxN(s)−x(s)/⌊ard⌊lµds+/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµ,(4.10)
	by (3.9), with the stage apparently set for Gronwall’s inequality, ass uming
	that/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµand sup0≤t≤T/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµare small enough that then
	/⌊ard⌊lxN(t)/⌊ard⌊lµ≤2ΞTfor 0≤t≤T, where Ξ T:= sup0≤t≤T/⌊ard⌊lx(t)/⌊ard⌊lµ.
	Bounding sup0≤t≤T/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµis, however, not so easy. Since /tildewiderMNis not
	itselfamartingale, wecannotdirectlyapplymartingaleinequalitiestoc ontrol
	its ﬂuctuations. However, since
	/tildewiderMN(t) =/integraldisplayt
	0R(t−s)dMN(s), (4.11)
	17we can hope to use control over the local martingale MNinstead. For this
	and the subsequent argument, we introduce some further assum ptions.
	Assumption 4.2
	1. There exists r=rµ≤r(2)
	maxsuch that supj≥0{µ(j)/νr(j)}<∞.
	2. There exists ζ∈ Rwithζ(j)≥1for alljsuch that (2.25)is satisﬁed
	for some b=b(ζ)≥1andr=r(ζ)such that 1≤r(ζ)≤r(2)
	max, and that
	Z:=/summationdisplay
	k≥0µ(k)(\|Akk\|+1)/radicalbig
	ζ(k)<∞. (4.12)
	The requirement that ζsatisﬁes (4.12) as well as satisfying (2.25) for some
	r≤r(2)
	maximplies in practice that it must be possible to take r(1)
	maxandr(2)
	max
	to be quite large in Assumption 2.1; see the examples in Section 5.
	Note that part 1 of Assumption 4.2 implies that lim j→∞{µ(j)/νr(j)}= 0
	for some r= ˜rµ≤rµ+1. We deﬁne
	ρ(ζ,µ) := max {r(ζ),p(r(ζ)),˜rµ}, (4.13)
	wherep(·) is as in Assumptions 2.1. We can now prove the following lemma,
	which enables us to control the paths of /tildewiderMNby using ﬂuctuation bounds for
	the martingale MN.
	Lemma 4.3 Under Assumption 4.2,
	/tildewiderMN(t) =MN(t)+/integraldisplayt
	0R(t−s)AMN(s)ds.
	Proof. From (3.8), we have
	R(t−s) =I+/integraldisplayt−s
	0R(v)Adv.
	Substituting this into (4.11), we obtain
	/tildewiderMN(t) =/integraldisplayt
	0R(t−s)dMN(s)
	18=MN(t)+/integraldisplayt
	0/braceleftbigg/integraldisplayt
	0R(v)A1[0,t−s](v)dv/bracerightbigg
	dMN(s)
	=MN(t)+/integraldisplayt
	0/braceleftbigg/integraldisplayt
	0R(v)A1[0,t−s](v)dv/bracerightbigg
	dXN(s)
	−/integraldisplayt
	0/braceleftbigg/integraldisplayt
	0R(v)A1[0,t−s](v)dv/bracerightbigg
	F0(xN(s))ds.
	It remains to change the order of integration in the double integrals , for
	which we use Fubini’s theorem.
	In the ﬁrst, the outer integral is almost surely a ﬁnite sum, and at e ach
	jump time tXN
	lwe havedXN(tXN
	l)∈ J. Hence it is enough that, for each i,
	mandt,/summationtext
	j≥0Rij(t)Ajmis absolutely summable, which follows from Theo-
	rem 3.1. Thus we have
	/integraldisplayt
	0/braceleftbigg/integraldisplayt
	0R(v)A1[0,t−s](v)dv/bracerightbigg
	dXN(s) =/integraldisplayt
	0R(v)A{XN(t−v)−XN(0)}dv.
	(4.14)
	For the second, the k-th component of R(v)AF0(xN(s)) is just
	/summationdisplay
	j≥0Rkj(v)/summationdisplay
	l≥0Ajl/summationdisplay
	J∈JJlαJ(xN(s)). (4.15)
	Now, from (3.7), we have 0 ≤Rkj(v)≤µ(j)ewv/µ(k), and
	/summationdisplay
	j≥0µ(j)\|Ajl\| ≤µ(l)(2\|All\|+w), (4.16)
	becauseATµ≤wµ. Hence, puttingabsolutevaluesinthesummandsin(4.15)
	yields at most
	ewv
	µ(k)/summationdisplay
	J∈JαJ(xN(s))/summationdisplay
	l≥0\|Jl\|µ(l)(2\|All\|+w).
	Now, in view of (4.12) and since ζ(j)≥1 for allj, there is a constant K <∞
	such that µ(l)(2\|All\|+w)≤Kζ(l). Furthermore, ζsatisﬁes (2.25), so that,
	by Corollary 2.5,/summationtext
	J∈JαJ(xN(s))/summationtext
	l≥0\|Jl\|ζ(l) is a.s. uniformly bounded in
	0≤s≤T. Hence we can apply Fubini’s theorem, obtaining
	/integraldisplayt
	0/braceleftbigg/integraldisplayt
	0R(v)A1[0,t−s](v)dv/bracerightbigg
	F0(xN(s))ds=/integraldisplayt
	0R(v)A/braceleftbigg/integraldisplayt−v
	0F0(xN(s))ds/bracerightbigg
	dv,
	19and combining this with (4.14) proves the lemma.
	We now introduce the exponential martingales that we use to bound the
	ﬂuctuations of MN. Forθ∈RZ+bounded and x∈ Rµ,
	ZN,θ(t) :=eθTxN(t)exp/braceleftBig
	−/integraltextt
	0gNθ(xN(s−))ds/bracerightBig
	, t≥0,
	is a non-negative ﬁnite variation local martingale, where
	gNθ(ξ) :=/summationdisplay
	J∈JNαJ(ξ)/parenleftBig
	eN−1θTJ−1/parenrightBig
	.
	Fort≥0, we have
	logZN,θ(t) =θTxN(t)−/integraldisplayt
	0gNθ(xN(s−))ds
	=θTmN(t)−/integraldisplayt
	0ϕN,θ(xN(s−),s)ds, (4.17)
	where
	ϕN,θ(ξ) :=/summationdisplay
	J∈JNαJ(ξ)/parenleftBig
	eN−1θTJ−1−N−1θTJ/parenrightBig
	,(4.18)
	andmN(t) :=N−1MN(t). Note also that we can write
	ϕN,θ(ξ) =N/integraldisplay1
	0(1−r)D2vN(ξ,rθ)[θ,θ]dr, (4.19)
	where
	vN(ξ,θ′) :=/summationdisplay
	J∈JαJ(ξ)eN−1(θ′)TJ,
	andD2vNdenotes thematrixofsecond derivatives withrespect totheseco nd
	argument:
	D2vN(ξ,θ′)[ζ1,ζ2] :=N−2/summationdisplay
	J∈JαJ(ξ)eN−1(θ′)TJζT
	1JJTζ2(4.20)
	for anyζ1,ζ2∈ Rµ.
	Now choose any B:= (Bk, k≥0)∈ R, and deﬁne ˜ τ(N)
	k(B) by
	˜τ(N)
	k(B) := inf/braceleftBigg
	t≥0:/summationdisplay
	J:Jk/negationslash=0αJ(xN(t−))> Bk/bracerightBigg
	.
	Our exponential bound is as follows.
	20Lemma 4.4 For anyk≥0,
	P
	sup
	0≤t≤T∧˜τ(N)
	k(B)\|mk
	N(t)\| ≥δ
	≤2exp(−δ2N/2BkK∗T).
	for all0< δ≤BkK∗T, whereK∗:=J2
	∗eJ∗, andJ∗is as in(1.2).
	Proof. Takeθ=e(k)β, forβto be chosen later. We shall argue by stopping
	the local martingale ZN,θat timeσ(N)(k,δ), where
	σ(N)(k,δ) :=T∧˜τ(N)
	k(B)∧inf{t:mk
	N(t)≥δ}.
	Note that eN−1θTJ≤eJ∗, so long as \|β\| ≤N, so that
	D2vN(ξ,rθ)[θ,θ]≤N−2/parenleftBigg/summationdisplay
	J:Jk/negationslash=0αJ(ξ)/parenrightBigg
	β2K∗.
	Thus, from (4.19), we have
	ϕN,θ(xN(u−))≤1
	2N−1Bkβ2K∗, u≤˜τ(N)
	k(B),
	and hence, on the event that σ(N)(k,δ) = inf{t:mk
	N(t)≥δ} ≤(T∧˜τ(N)
	k(B)),
	we have
	ZN,θ(σ(k,δ))≥exp{βδ−1
	2N−1Bkβ2K∗T}.
	But since ZN,θ(0) = 1, it now follows from the optional stopping theorem
	and Fatou’s lemma that
	1≥E{ZN,θ(σ(N)(k,δ))}
	≥P/bracketleftBig
	sup
	0≤t≤T∧˜τ(N)
	k(B)mk
	N(t)≥δ/bracketrightBig
	exp{βδ−1
	2N−1Bkβ2K∗T}.
	We can choose β=δN/B kK∗T, as long as δ/BkK∗T≤1, obtaining
	P
	sup
	0≤t≤T∧˜τ(N)
	k(B)mk
	N(t)≥δ
	≤exp(−δ2N/2BkK∗T).
	Repeating with
	˜σ(N)(k,δ) :=T∧˜τ(N)
	k(B)∧inf{t:−mk
	N(t)≥δ},
	21and choosing β=δN/B kK∗T, gives the lemma.
	Theprecedinglemmagivesaboundforeachindividualcomponentof MN.
	We need ﬁrst to translate this into a statement for all components simulta-
	neously. For ζas in Assumption 4.2, we start by writing
	Z(1)
	∗:= max
	k≥1k−1#{m:ζ(m)≤k};Z(2)
	∗:= sup
	k≥0µ(k)(\|Akk\|+1)/radicalbig
	ζ(k).(4.21)
	Z(2)
	∗is clearly ﬁnite, because of Assumption 4.2, and the same is true for Z(1)
	∗
	also, since Zof Assumption 4.2 is at least # {m:ζ(m)≤k}/√
	k, for each k.
	Then, using the deﬁnition (2.24) of τ(N)(a,ζ), note that, for every k,
	/summationdisplay
	J:Jk/negationslash=0αJ(xN(t))h(k)≤/summationdisplay
	J:Jk/negationslash=0αJ(xN(t))h(k)d(J,ζ)
	\|Jk\|ζ(k)≤ah(k)
	ζ(k),(4.22)
	for anyt < τ(N)(a,ζ) and any h∈ R, and that, for any K ⊆Z+,
	/summationdisplay
	k∈K/summationdisplay
	J:Jk/negationslash=0αJ(xN(t))h(k)≤/summationdisplay
	k∈K/summationdisplay
	J:Jk/negationslash=0αJ(xN(t))h(k)d(J,ζ)
	\|Jk\|ζ(k)
	≤a
	mink∈K(ζ(k)/h(k)). (4.23)
	From (4.22) with h(k) = 1 for all k, if we choose B:= (a/ζ(k), k≥0), then
	τ(N)(a,ζ)≤˜τ(N)
	k(B) for allk. For this choice of B, we can take
	δ2
	k:=δ2
	k(a) :=4aK∗TlogN
	Nζ(k)=4BkK∗TlogN
	N(4.24)
	in Lemma 4.4 for k∈κN(a), where
	κN(a) :=/braceleftbig
	k:ζ(k)≤1
	4aK∗TN/logN/bracerightbig
	={k:Bk≥4logN/K∗TN},
	(4.25)
	since then δk(a)≤BkK∗T. Note that then, from (4.12),
	/summationdisplay
	k∈κN(a)µ(k)δk(a)≤2Z/radicalbig
	aK∗TN−1logN, (4.26)
	withZas deﬁned in Assumption 4.2, and that
	\|κN(a)\| ≤1
	4aZ(1)
	∗K∗TN/logN. (4.27)
	22Lemma 4.5 If Assumptions 4.2 are satisﬁed, taking δk(a)andκN(a)as
	deﬁned in (4.24)and(4.25), and for any η∈ R, we have
	1.P
	/uniondisplay
	k∈κN(a)/braceleftBig
	sup
	0≤t≤T∧τ(N)(a,ζ)\|mN(t)\| ≥δk(a)/bracerightBig
	≤aZ(1)
	∗K∗T
	2NlogN;
	2.P
	/summationdisplay
	k/∈κN(a)Xk
	N(t) = 0for all0≤t≤T∧τ(N)(a,ζ)
	≥1−4logN
	K∗N;
	3. sup
	0≤t≤T∧τ(N)(a,ζ)
	
	/summationdisplay
	k/∈κN(a)η(k)\|Fk(xN(t))\|
	
	≤aJ∗
	mink/∈κN(a)(ζ(k)/η(k)).
	Proof. For part 1, use Lemma 4.4 together with (4.24) and (4.27) to give
	the bound. For part 2, the total rate of jumps into coordinates w ith indices
	k /∈κN(a) is
	/summationdisplay
	k/∈κN(a)/summationdisplay
	J:Jk/negationslash=0αJ(xN(t))≤a
	mink/∈κN(a)ζ(k),
	ift≤τ(N)(a,ζ),using(4.23)with K= (κN(a))c,which, combinedwith(4.25),
	proves the claim. For the ﬁnal part, if t≤τ(N)(a,ζ),
	/summationdisplay
	k/∈κN(a)η(k)\|Fk(xN(t))\| ≤/summationdisplay
	k/∈κN(a)η(k)/summationdisplay
	J:Jk/negationslash=0αJ(xN(t))J∗,
	and the inequality follows once more from (4.23).
	LetB(1)
	N(a) andB(2)
	N(a) denote the events
	B(1)
	N(a) :=
	
	/summationdisplay
	k/∈κN(a)Xk
	N(t) = 0 for all 0 ≤t≤T∧τ(N)(a,ζ)
	
	;
	B(2)
	N(a) :=
	/intersectiondisplay
	k∈κN(a)/braceleftBig
	sup
	0≤t≤T∧τ(N)(a,ζ)\|mN(t)\| ≤δk(a)/bracerightBig
	,(4.28)
	and setBN(a) :=B(1)
	N(a)∩B(2)
	N(a). Then, by Lemma 4.5, we deduce that
	P[BN(a)c]≤aZ(1)
	∗K∗T
	2NlogN+4logN
	K∗N, (4.29)
	23of order O(N−1logN) for each ﬁxed a. Thus we have all the components
	ofMNsimultaneously controlled, except on a set of small probability. We
	now translate this into the desired assertion about the ﬂuctuation s of/tildewidemN.
	Lemma 4.6 If Assumptions 4.2 are satisﬁed, then, on the event BN(a),
	sup
	0≤t≤T∧τ(N)(a,ζ)/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµ≤√aK4.6/radicalbigg
	logN
	N,
	where the constant K4.6depends on Tand the parameters of the process.
	Proof. From Lemma 4.3, it follows that
	sup
	0≤t≤T∧τ(N)(a,ζ)/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµ (4.30)
	≤sup
	0≤t≤T∧τ(N)(a,ζ)/⌊ard⌊lmN(t)/⌊ard⌊lµ+ sup
	0≤t≤T∧τ(N)(a,ζ)/integraldisplayt
	0/⌊ard⌊lR(t−s)AmN(s)/⌊ard⌊lµds.
	For the ﬁrst term, on BN(a) and for 0 ≤t≤T∧τ(N)(a,ζ), we have
	/⌊ard⌊lmN(t)/⌊ard⌊lµ≤/summationdisplay
	k∈κN(a)µ(k)δk(a)+/integraldisplayt
	0/summationdisplay
	k/∈κN(a)µ(k)\|Fk(xN(u))\|du.
	The ﬁrst sum is bounded using (4.26) by 2 Z√aK∗T N−1/2√logN, the sec-
	ond, from Lemma 4.5 and (4.25), by
	TaJ∗
	mink/∈κN(a)(ζ(k)/µ(k))≤Z(2)
	∗2J∗/radicalbigg
	Ta
	K∗/radicalbigg
	logN
	N.
	For the second term in (4.30), from (3.7) and (4.16), we note that
	/⌊ard⌊lR(t−s)AmN(s)/⌊ard⌊lµ≤/summationdisplay
	k≥0µ(k)/summationdisplay
	l≥0Rkl(t−s)/summationdisplay
	r≥0\|Alr\|\|mr
	N(s)\|
	≤ew(t−s)/summationdisplay
	l≥0µ(l)/summationdisplay
	r≥0\|Alr\|\|mr
	N(s)\|
	≤ew(t−s)/summationdisplay
	r≥0µ(r){2\|Arr\|+w}\|mr
	N(s)\|.
	24OnBN(a) and for 0 ≤s≤T∧τ(N)(a,ζ), from (4.12), the sum for r∈κN(a)
	is bounded using
	/summationdisplay
	r∈κN(a)µ(r){2\|Arr\|+w}\|mr
	N(s)\|
	≤/summationdisplay
	r∈κN(a)µ(r){2\|Arr\|+w}δr(a)
	≤/summationdisplay
	r∈κN(a)µ(r){2\|Arr\|+w}/radicalBigg
	4aK∗TlogN
	Nζ(r)
	≤(2∨w)Z/radicalbig
	4aK∗T/radicalbigg
	logN
	N.
	The remaining sum is then bounded by Lemma 4.5, on the set BN(a) and
	for 0≤s≤T∧τ(N)(a,ζ), giving at most
	/summationdisplay
	r/∈κN(a)µ(r){2\|Arr\|+w}\|mr
	N(s)\|
	≤/summationdisplay
	r/∈κN(a)µ(r){2\|Arr\|+w}/integraldisplays
	0\|Fr(xN(t))\|dt
	≤(2∨w)saJ∗
	mink/∈κN(a)(ζ(k)/µ(k){\|Akk\|+1})
	≤(2∨w)Z(2)
	∗2J∗/radicalbigg
	Ta
	K∗/radicalbigg
	logN
	N.
	Integrating, it follows that
	sup
	0≤t≤T∧τ(N)(a,ζ)/integraldisplayt
	0/⌊ard⌊lR(t−s)AmN(s)/⌊ard⌊lµds
	≤(2T∨1)ewT/braceleftBigg/radicalbig
	4aK∗TZ+Z(2)
	∗J2J∗/radicalbigg
	Ta
	K∗/bracerightBigg/radicalbigg
	logN
	N,
	and the lemma follows.
	This has now established the control on sup0≤t≤T/⌊ard⌊l/tildewidemN(t)/⌊ard⌊lµthat we need,
	in order to translate (4.10) into a proof of the main theorem.
	25Theorem 4.7 Suppose that (1.2),(1.3),(3.1),(3.2)and(4.1)are all satis-
	ﬁed, and that Assumptions 2.1 and 4.2 hold. Recalling the deﬁ nition(4.13)
	ofρ(ζ,µ), forζas given in Assumption 4.2, suppose that S(N)
	ρ(ζ,µ)(0)≤NC∗
	for some C∗<∞.
	Letxdenote the solution to (4.2)with initial condition x(0)satisfying
	Sρ(ζ,µ)(x(0))<∞. Thentmax=∞.
	Fix any T, and deﬁne ΞT:= sup0≤t≤T/⌊ard⌊lx(t)/⌊ard⌊lµ. If/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ≤
	1
	2ΞTe−(w+k∗)T, wherek∗:=ewTK(µ,F;2ΞT), then there exist constants c1,c2
	depending on C∗,Tand the parameters of the process, such that for all N
	large enough
	P/parenleftBigg
	sup
	0≤t≤T/⌊ard⌊lxN(t)−x(t)/⌊ard⌊lµ>/parenleftBigg
	ewT/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ+c1/radicalbigg
	logN
	N/parenrightBigg
	ek∗T/parenrightBigg
	≤c2logN
	N. (4.31)
	Proof. AsS(N)
	ρ(ζ,µ)(0)≤NC∗, it follows also that S(N)
	r(0)≤NC∗for all
	0≤r≤ρ(ζ,µ). Fix any T < tmax, takeC:= 2(C∗+k04T)ek01T, and observe
	that, for r≤ρ(ζ,µ)∧r(2)
	max, and such that p(r)≤ρ(ζ,µ), we can take
	C′′
	rT≤/tildewideCrT:={2(C∗∨1)+kr4T}e(kr1+Ckr2)T, (4.32)
	in Theorem 2.4, since we can take C∗to bound CrandC′
	r. In particular,
	r=r(ζ) as deﬁned in Assumption 4.2 satisﬁes both the conditions on r
	for (4.32) to hold. Then, taking a:={k2+k1/tildewideCr(ζ)T}b(ζ)in Corollary 2.5, it
	follows that for some constant c3>0, on the event BN(a),
	P[τ(N)(a,ζ)≤T]≤c3N−1.
	Then, from (4.29), for some constant c4,P[BN(a)c]≤c4N−1logN. Here,
	the constants c3,c4depend on C∗,Tand the parameters of the process.
	We now use Lemma 4.6 to bound the martingale term in (4.10). It fol-
	lows that, on the event BN(a)∩ {τ(N)(a,ζ)> T}and on the event that
	/⌊ard⌊lxN(s)−x(s)/⌊ard⌊lµ≤ΞTfor all 0≤s≤t,
	/⌊ard⌊lxN(t)−x(t)/⌊ard⌊lµ≤/parenleftBigg
	ewT/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ+√aK4.6/radicalbigg
	logN
	N/parenrightBigg
	+k∗/integraldisplayt
	0/⌊ard⌊lxN(s)−x(s)/⌊ard⌊lµds,
	26wherek∗:=ewTK(µ,F;2ΞT). Then from Gronwall’s inequality, on the
	eventBN(a)∩{τ(N)(a,ζ)> T},
	/⌊ard⌊lxN(t)−x(t)/⌊ard⌊lµ≤/parenleftBigg
	ewT/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ+√aK4.6/radicalbigg
	logN
	N/parenrightBigg
	ek∗t,
	(4.33)
	for all 0≤t≤T, provided that
	/parenleftBigg
	ewT/⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ+√aK4.6/radicalbigg
	logN
	N/parenrightBigg
	≤ΞTe−k∗T.
	This is true for all Nsuﬃciently large, if /⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ≤1
	2ΞTe−(w+k∗)T,
	which we have assumed. We have thus proved (4.31), since, as show n above,
	P(BN(a)c∪{τ(N)(a,ζ)> T}c) =O(N−1logN).
	We now use this to show that in fact tmax=∞. Forx(0) as above, we
	can take xj
	N(0) :=N−1⌊Nxj(0)⌋ ≤xj(0), so that S(N)
	ρ(ζ,µ)(0)≤NC∗forC∗:=
	Sρ(ζ,µ)(x(0))<∞. Then, by (4.13), lim j→∞{µ(j)/νρ(ζ,µ)(j)}= 0, so it fol-
	lowseasilyusing boundedconvergence that /⌊ard⌊lxN(0)−x(0)/⌊ard⌊lµ→0asN→ ∞.
	Hence, for any T < t max, it follows from (4.31) that /⌊ard⌊lxN(t)−x(t)/⌊ard⌊lµ→D0
	asN→ ∞, fort≤T, with uniform bounds over the interval, where ‘ →D’
	denotes convergence in distribution. Also, by Assumption 4.2, ther e is a con-
	stantc5such that /⌊ard⌊lxN(t)/⌊ard⌊lµ≤c5N−1S(N)
	rµ(t) for each t, whererµ≤r(2)
	maxand
	rµ≤ρ(ζ,µ). Hence, using Lemma 2.3 and Theorem 2.4, sup0≤t≤2T/⌊ard⌊lxN(t)/⌊ard⌊lµ
	remains bounded in probability as N→ ∞. Hence it is impossible that
	/⌊ard⌊lx(t)/⌊ard⌊lµ→ ∞asT→tmax<∞,implyingthatinfact tmax=∞forsuchx(0).
	Remark . The dependence on the initial conditions is considerably compli-
	cated by the way the constant Cappears in the exponent, for instance in the
	expression for /tildewideCrTin the proof of Theorem 4.7. However, if kr2in Assump-
	tions 2.1 can be chosen to be zero, as for instance in the examples be low, the
	dependence simpliﬁes correspondingly.
	Therearebiologicallyplausiblemodelsinwhichtherestrictionto Jl≥ −1
	is irksome. In populations in which members of a given type lcan ﬁght one
	another, a natural possibility is to have a transition J=−2e(l)at a rate
	proportional to Xl(Xl−1), which translates to αJ=α(N)
	J=γxl(xl−N−1),
	a function depending on N. Replacing this with αJ=γ(xl)2removes the
	27N-dependence, but yields a process that can jump to negative value s ofXl.
	For this reason, it is useful to be able to allow the transition rates αJto
	depend on N.
	Since the arguments inthis paper are not limiting arguments for N→ ∞,
	it does not require many changes to derive the corresponding resu lts. Quan-
	tities such as A,F,Ur(x) andVr(x) now depend on N; however, Theorem 4.7
	continues toholdwithconstants c1andc2thatdo notdepend on N, provided
	thatµ,w,ν, theklmfrom Assumption 2.1 and ζfrom Assumption 4.2 can
	be chosen to be independent of N, and that the quantities Z(l)
	∗from (4.21)
	can be bounded uniformly in N. On the other hand, the solution x=x(N)
	of (4.2) that acts as approximation to xNin Theorem 4.7 now itself depends
	onN, through R=R(N)andF=F(N). IfA(and hence R) can be taken
	to be independent of N, and lim N→∞/⌊ard⌊lF(N)−F/⌊ard⌊lµ= 0 for some ﬁxed µ–
	Lipschitz function F, a Gronwall argument can be used to derive a bound
	for the diﬀerence between x(N)and the (ﬁxed) solution xto equation (4.2)
	withN-independent RandF. IfAhas to depend on N, the situation is
	more delicate.
	5 Examples
	We begin with some general remarks, to show that the assumptions are sat-
	isﬁed in many practical contexts. We then discuss two particular ex amples,
	those of Kretzschmar (1993) and of Arrigoni (2003), that ﬁtte d poorly or
	not at all into the general setting of Barbour & Luczak (2008), th ough the
	other systems referred to in the introduction could also be treate d similarly.
	In both of our chosen examples, the index jrepresents a number of individ-
	uals — parasites in a host in the ﬁrst, animals in a patch in the second —
	and we shall for now use the former terminology for the preliminary, general
	discussion.
	Transitions that can typically be envisaged are: births of a few para sites,
	which may occur either in the same host, or in another, if infection is b eing
	represented; births and immigration of hosts, with or without para sites; mi-
	gration of parasites between hosts; deaths of parasites; death s of hosts; and
	treatment of hosts, leading to the deaths of many of the host’s pa rasites. For
	births of parasites, there is a transition X→X+J, whereJtakes the form
	Jl= 1;Jm=−1;Jj= 0, j/ne}ationslash=l,m, (5.1)
	28indicating that one m-host has become an l-host. For births of parasites
	within a host, a transition rate of the form bl−mmXmcould be envisaged,
	withl > m, the interpretation being that there are Xmhosts with parasite
	burdenm, each of which gives birth to soﬀspring at rate bs, for some small
	values of s. For infection of an m-host, a possible transition rate would be
	of the form
	Xm/summationdisplay
	j≥0N−1Xjλpj,l−m,
	since an m-host comes into contact with j-hosts at a rate proportional to
	their density in the host population, and pjrrepresents the probability of a
	j-host transferring rparasites to the infected host during the contact. The
	probability distributions pj·can be expected to be stochastically increasing
	inj. Deaths of parasites also give rise to transitions of the form (5.1),
	but now with l < m, the simplest form of rate being just dmXmforl=
	m−1, though d=dmcould also be chosen to increase with parasite burden.
	Treatment of a host would lead to values of lmuch smaller than m, and
	a rate of the form κXmfor the transition with l= 0 would represent fully
	successful treatment of randomly chosen individuals. Births and d eaths of
	hosts and immigration all lead to transitions of the form
	Jl=±1;Jj= 0, j/ne}ationslash=l. (5.2)
	Fordeaths, Jl=−1, anda typical ratewould be d′Xl. Forbirths, Jl= 1, and
	a possible rate would be/summationtext
	j≥0Xjb′
	jl(withl= 0 only, if new-born individuals
	are free of parasites). For immigration, constant rates λlcould be supposed.
	Finally, for migration of individual parasites between hosts, transit ions are
	of the form
	Jl=Jm=−1;Jl+1= 1;Jm−1= 1;Jj= 0, j/ne}ationslash=l,m,l+1,m−1,
	(5.3)
	a possible rate being γmXmN−1Xl.
	For all the above transitions, we can take J∗= 2 in (1.2), and (1.3) is
	satisﬁed in biologically sensible models. (3.1) and (3.2) depend on the wa y in
	which the matrix Acan be deﬁned, which is more model speciﬁc; in practice,
	(3.1) is very simple to check. The choice of µin (3.2) is inﬂuenced by the
	need to have (4.1) satisﬁed. For Assumptions 2.1, a possible choice o fνis to
	takeν(j) = (j+1) for each j≥0, withS1(X) then representing the num-
	ber of hosts plus the number of parasites. Satisfying (2.5) is then e asy for
	29transitions only involving the movement of a single parasite, but in gen eral
	requires assumptions as to the existence of the r-th moments of the distri-
	butions of the numbers of parasites introduced at birth, immigratio n and
	infection events. For (2.6), in which transitions involving a net reduc tion
	in the total number of parasites and hosts can be disregarded, th e parasite
	birth events are those in which the rates typically have a factor mXmfor
	transitions with Jm=−1, withmin principle unbounded. However, at such
	events, an m-individual changes to an m+sindividual, with the number s
	of oﬀspring of the parasite being typically small, so that the value of JTνr
	associated with this rate has magnitude mr−1; the product mXmmr−1, when
	summed over m, then yields a contribution of magnitude Sr(X), which is al-
	lowable in(2.6). Similar considerations showthat theterms N−1S0(X)Sr(X)
	accommodate the migration rates suggested above. Finally, in orde r to have
	Assumptions 4.2 satisﬁed, it is in practice necessary that Assumptio ns 2.1
	are satisﬁed for large values of r, thereby imposing restrictions on the dis-
	tributions of the numbers of parasites introduced at birth, immigra tion and
	infection events, as above.
	5.1 Kretzschmar’s model
	Kretzschmar (1993) introduced a model of a parasitic infection, in which the
	transitions from state Xare as follows:
	J=e(i−1)−e(i)at rate Niµxi, i ≥1;
	J=−e(i)at rate N(κ+iα)xi, i≥0;
	J=e(0)at rate Nβ/summationtext
	i≥0xiθi;
	J=e(i+1)−e(i)at rate Nλxiϕ(x), i ≥0,
	wherex:=N−1X,ϕ(x) :=/⌊ard⌊lx/⌊ard⌊l11{c+/⌊ard⌊lx/⌊ard⌊l1}−1withc >0, and/⌊ard⌊lx/⌊ard⌊l11:=/summationtext
	j≥1j\|x\|j; here, 0≤θ≤1, andθidenotes its i-th power (our θcorresponds
	to the constant ξin [7]). Both (1.2) and (1.3) are obviously satisﬁed. For
	Assumptions (3.1), (3.2) and (4.1), we note that equation corresp onding
	to (1.5) has
	Aii=−{κ+i(α+µ)};AT
	i,i−1=iµandAT
	i0=βθi, i≥2;
	A11=−{κ+α+µ};AT
	10=µ+βθ;
	A00=−κ+β, i≥1,
	30with all other elements of the matrix equal to zero, and
	Fi(x) =λ(xi−1−xi)ϕ(x), i≥1;F0(x) =−λx0ϕ(x).
	Hence Assumption (3.1) isimmediate, andAssumption (3.2)holds for µ(j) =
	(j+1)s, for any s≥0, withw= (β−κ)+. For the choice µ(j) =j+1,F
	maps elements of RµtoRµ, and is also locally Lipschitz in the µ-norm, with
	K(µ,F;Ξ) =c−2λΞ(2c+Ξ).
	For Assumptions 2.1, choose ν=µ; then (2.5) is a ﬁnite sum for each
	r≥0. Turning to (2.6), it is immediate that U0(x)≤βS0(x). Then, for
	r≥1,
	/summationdisplay
	i≥0λϕ(N−1X)Xi{(i+2)r−(i+1)r} ≤λS1(X)
	S0(X)/summationdisplay
	i≥0rXi(i+2)r−1
	≤r2r−1λSr(X),
	since, by Jensen’s inequality, S1(X)Sr−1(X)≤S0(X)Sr(X). Hence we can
	takekr2=kr4= 0 and kr1=β+r2r−1λin (2.6), for any r≥1, so that
	r(1)
	max=∞. Finally, for (2.7),
	V0(x)≤(κ+β)S0(x)+αS1(x),
	so thatk03=κ+β+αandk05= 0, and
	Vr(x)≤r2(κS2r(x)+αS2r+1(x)+µS2r−1(x)+22(r−1)λS2r−1(x))+βS0(x),
	so that we can take p(r) = 2r+1,kr3=β+r2{κ+α+µ+22(r−1)λ}, and
	kr5= 0 for any r≥1, and so r(2)
	max=∞. In Assumptions 4.2, we can clearly
	takerµ= 1 and ζ(k) = (k+1)7, givingr(ζ) = 8,b(ζ) = 1 and ρ(ζ,µ) = 17.
	5.2 Arrigoni’s model
	Inthemetapopulation model ofArrigoni (2003), thetransitions f romstate X
	are as follows:
	J=e(i−1)−e(i)at rateNixi(di+γ(1−ρ)), i ≥2;
	J=e(0)−e(1)at rateNx1(d1+γ(1−ρ)+κ);
	J=e(i+1)−e(i)at rateNibixi, i ≥1;
	J=e(0)−e(i)at rateNxiκ, i ≥2;
	J=e(k+1)−e(k)+e(i−1)−e(i)at rateNixixkργ, k ≥0, i≥1;
	31as before, x:=N−1X. Here, the total number N=/summationtext
	j≥0Xj=S0(X) of
	patches remains constant throughout, and the number of animals in any one
	patch changes by at most one at each transition; in the ﬁnal (migra tion)
	transition, however, the numbers in two patches change simultane ously. In
	the above transitions, γ,ρ,κare non-negative, and ( di),(bi) are sequences of
	non-negative numbers.
	Once again, both (1.2) and (1.3) are obviously satisﬁed. The equatio n
	corresponding to (1.4) can now be expressed by taking
	Aii=−{κ+i(bi+di+γ)};AT
	i,i−1=i(di+γ);AT
	i,i+1=ibi, i≥1;
	A00=−κ,
	with all other elements of Aequal to zero, and
	Fi(x) =ργ/⌊ard⌊lx/⌊ard⌊l11(xi−1−xi), i≥1;F0(x) =−ργx0/⌊ard⌊lx/⌊ard⌊l11+κ,
	where we have used the fact that N−1/summationtext
	j≥0Xj= 1. Hence Assumption (3.1)
	is again immediate, and Assumption (3.2) holds for µ(j) = 1 with w= 0,
	forµ(j) =j+ 1 with w= max i(bi−di−γ−κ)+(assuming ( bi) and (di)
	to be such that this is ﬁnite), or indeed for µ(j) = (j+1)swith any s≥2,
	with appropriate choice of w. With the choice µ(j) =j+1,Fagain maps
	elements of RµtoRµ, and is also locally Lipschitz in the µ-norm, with
	K(µ,F;Ξ) = 3ργΞ.
	To check Assumptions 2.1, take ν=µ; once again, (2.5) is a ﬁnite sum
	for each r. Then, for (2.6), it is immediate that U0(x) = 0. For any r≥1,
	using arguments from the previous example,
	Ur(x)≤r2r−1/braceleftBigg/summationdisplay
	i≥1ibixi(i+1)r−1+/summationdisplay
	i≥1/summationdisplay
	k≥0iργxixk(k+1)r−1/bracerightBigg
	≤r2r−1{max
	ibiSr(x)+ργS1(x)Sr−1(x)}
	≤r2r−1{max
	ibiSr(x)+ργS0(x)Sr(x)},
	so that, since S0(x) = 1, we can take kr1=r2r−1(maxibi+ργ) andkr2=
	kr4= 0 in (2.6), and r(1)
	max=∞. Finally, for (2.7), V0(x) = 0 and, for r≥1,
	Vr(x)
	≤r2/braceleftBig
	22(r−1)max
	ibiS2r−1(x)+max
	i(i−1di)S2r(x)+γ(1−ρ)S2r−1(x)
	+ργ(22(r−1)S1(x)S2r−2(x)+S0(x)S2r−1(x))/bracerightBig
	+κS2r(x),
	32so that we can take p(r) = 2r, and (assuming i−1dito be ﬁnite)
	kr3=κ+r2{22(r−1)(max
	ibi+ργ)+max
	i(i−1di)+γ},
	andkr5= 0 for any r≥1, andr(2)
	max=∞. In Assumptions 4.2, we can again
	takerµ= 1 and ζ(k) = (k+1)7, givingr(ζ) = 8,b(ζ) = 1 and ρ(ζ,µ) = 16.
	Acknowledgement
	We wish to thank a referee for recommendations that have substa ntially
	streamlined our arguments. ADB wishes to thank both the Institut e for
	MathematicalSciencesoftheNationalUniversityofSingaporeand theMittag–
	Leﬄer Institute for providing a welcoming environment while part of t his
	work was accomplished. MJL thanks the University of Z¨ urich for th eir hos-
	pitality on a number of visits.
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	34