Pixart-Sigma

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Pixart-Sigma / diffusion /sa_solver_diffusers.py

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	# Licensed under the Apache License, Version 2.0 (the "License");
	# you may not use this file except in compliance with the License.
	# You may obtain a copy of the License at
	#
	# http://www.apache.org/licenses/LICENSE-2.0
	#
	# Unless required by applicable law or agreed to in writing, software
	# distributed under the License is distributed on an "AS IS" BASIS,
	# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
	# See the License for the specific language governing permissions and
	# limitations under the License.

	# DISCLAIMER: check https://arxiv.org/abs/2309.05019
	# The codebase is modified based on https://github.com/huggingface/diffusers/blob/main/src/diffusers/schedulers/scheduling_dpmsolver_multistep.py

	import math
	from typing import List, Optional, Tuple, Union, Callable

	import numpy as np
	import torch

	from diffusers.configuration_utils import ConfigMixin, register_to_config
	from diffusers.utils.torch_utils import randn_tensor
	from diffusers.schedulers.scheduling_utils import KarrasDiffusionSchedulers, SchedulerMixin, SchedulerOutput


	# Copied from diffusers.schedulers.scheduling_ddpm.betas_for_alpha_bar
	def betas_for_alpha_bar(
	num_diffusion_timesteps,
	max_beta=0.999,
	alpha_transform_type="cosine",
	):
	"""
	Create a beta schedule that discretizes the given alpha_t_bar function, which defines the cumulative product of
	(1-beta) over time from t = [0,1].

	Contains a function alpha_bar that takes an argument t and transforms it to the cumulative product of (1-beta) up
	to that part of the diffusion process.


	Args:
	num_diffusion_timesteps (`int`): the number of betas to produce.
	max_beta (`float`): the maximum beta to use; use values lower than 1 to
	prevent singularities.
	alpha_transform_type (`str`, optional, default to `cosine`): the type of noise schedule for alpha_bar.
	Choose from `cosine` or `exp`

	Returns:
	betas (`np.ndarray`): the betas used by the scheduler to step the model outputs
	"""
	if alpha_transform_type == "cosine":

	def alpha_bar_fn(t):
	return math.cos((t + 0.008) / 1.008 * math.pi / 2) ** 2

	elif alpha_transform_type == "exp":

	def alpha_bar_fn(t):
	return math.exp(t * -12.0)

	else:
	raise ValueError(f"Unsupported alpha_tranform_type: {alpha_transform_type}")

	betas = []
	for i in range(num_diffusion_timesteps):
	t1 = i / num_diffusion_timesteps
	t2 = (i + 1) / num_diffusion_timesteps
	betas.append(min(1 - alpha_bar_fn(t2) / alpha_bar_fn(t1), max_beta))
	return torch.tensor(betas, dtype=torch.float32)


	class SASolverScheduler(SchedulerMixin, ConfigMixin):
	"""
	`SASolverScheduler` is a fast dedicated high-order solver for diffusion SDEs.

	This model inherits from [`SchedulerMixin`] and [`ConfigMixin`]. Check the superclass documentation for the generic
	methods the library implements for all schedulers such as loading and saving.

	Args:
	num_train_timesteps (`int`, defaults to 1000):
	The number of diffusion steps to train the model.
	beta_start (`float`, defaults to 0.0001):
	The starting `beta` value of inference.
	beta_end (`float`, defaults to 0.02):
	The final `beta` value.
	beta_schedule (`str`, defaults to `"linear"`):
	The beta schedule, a mapping from a beta range to a sequence of betas for stepping the model. Choose from
	`linear`, `scaled_linear`, or `squaredcos_cap_v2`.
	trained_betas (`np.ndarray`, optional):
	Pass an array of betas directly to the constructor to bypass `beta_start` and `beta_end`.
	predictor_order (`int`, defaults to 2):
	The predictor order which can be `1` or `2` or `3` or '4'. It is recommended to use `predictor_order=2` for guided
	sampling, and `predictor_order=3` for unconditional sampling.
	corrector_order (`int`, defaults to 2):
	The corrector order which can be `1` or `2` or `3` or '4'. It is recommended to use `corrector_order=2` for guided
	sampling, and `corrector_order=3` for unconditional sampling.
	predictor_corrector_mode (`str`, defaults to `PEC`):
	The predictor-corrector mode can be `PEC` or 'PECE'. It is recommended to use `PEC` mode for fast
	sampling, and `PECE` for high-quality sampling (PECE needs around twice model evaluations as PEC).
	prediction_type (`str`, defaults to `epsilon`, optional):
	Prediction type of the scheduler function; can be `epsilon` (predicts the noise of the diffusion process),
	`sample` (directly predicts the noisy sample`) or `v_prediction` (see section 2.4 of [Imagen
	Video](https://imagen.research.google/video/paper.pdf) paper).
	thresholding (`bool`, defaults to `False`):
	Whether to use the "dynamic thresholding" method. This is unsuitable for latent-space diffusion models such
	as Stable Diffusion.
	dynamic_thresholding_ratio (`float`, defaults to 0.995):
	The ratio for the dynamic thresholding method. Valid only when `thresholding=True`.
	sample_max_value (`float`, defaults to 1.0):
	The threshold value for dynamic thresholding. Valid only when `thresholding=True` and
	`algorithm_type="dpmsolver++"`.
	algorithm_type (`str`, defaults to `data_prediction`):
	Algorithm type for the solver; can be `data_prediction` or `noise_prediction`. It is recommended to use `data_prediction`
	with `solver_order=2` for guided sampling like in Stable Diffusion.
	lower_order_final (`bool`, defaults to `True`):
	Whether to use lower-order solvers in the final steps. Default = True.
	use_karras_sigmas (`bool`, optional, defaults to `False`):
	Whether to use Karras sigmas for step sizes in the noise schedule during the sampling process. If `True`,
	the sigmas are determined according to a sequence of noise levels {σi}.
	lambda_min_clipped (`float`, defaults to `-inf`):
	Clipping threshold for the minimum value of `lambda(t)` for numerical stability. This is critical for the
	cosine (`squaredcos_cap_v2`) noise schedule.
	variance_type (`str`, optional):
	Set to "learned" or "learned_range" for diffusion models that predict variance. If set, the model's output
	contains the predicted Gaussian variance.
	timestep_spacing (`str`, defaults to `"linspace"`):
	The way the timesteps should be scaled. Refer to Table 2 of the [Common Diffusion Noise Schedules and
	Sample Steps are Flawed](https://huggingface.co/papers/2305.08891) for more information.
	steps_offset (`int`, defaults to 0):
	An offset added to the inference steps. You can use a combination of `offset=1` and
	`set_alpha_to_one=False` to make the last step use step 0 for the previous alpha product like in Stable
	Diffusion.
	"""

	_compatibles = [e.name for e in KarrasDiffusionSchedulers]
	order = 1

	@register_to_config
	def __init__(
	self,
	num_train_timesteps: int = 1000,
	beta_start: float = 0.0001,
	beta_end: float = 0.02,
	beta_schedule: str = "linear",
	trained_betas: Optional[Union[np.ndarray, List[float]]] = None,
	predictor_order: int = 2,
	corrector_order: int = 2,
	predictor_corrector_mode: str = 'PEC',
	prediction_type: str = "epsilon",
	tau_func: Callable = lambda t: 1 if t >= 200 and t <= 800 else 0,
	thresholding: bool = False,
	dynamic_thresholding_ratio: float = 0.995,
	sample_max_value: float = 1.0,
	algorithm_type: str = "data_prediction",
	lower_order_final: bool = True,
	use_karras_sigmas: Optional[bool] = False,
	lambda_min_clipped: float = -float("inf"),
	variance_type: Optional[str] = None,
	timestep_spacing: str = "linspace",
	steps_offset: int = 0,
	):
	if trained_betas is not None:
	self.betas = torch.tensor(trained_betas, dtype=torch.float32)
	elif beta_schedule == "linear":
	self.betas = torch.linspace(beta_start, beta_end, num_train_timesteps, dtype=torch.float32)
	elif beta_schedule == "scaled_linear":
	# this schedule is very specific to the latent diffusion model.
	self.betas = (
	torch.linspace(beta_start 0.5, beta_end 0.5, num_train_timesteps, dtype=torch.float32) ** 2
	)
	elif beta_schedule == "squaredcos_cap_v2":
	# Glide cosine schedule
	self.betas = betas_for_alpha_bar(num_train_timesteps)
	else:
	raise NotImplementedError(f"{beta_schedule} does is not implemented for {self.__class__}")

	self.alphas = 1.0 - self.betas
	self.alphas_cumprod = torch.cumprod(self.alphas, dim=0)
	# Currently we only support VP-type noise schedule
	self.alpha_t = torch.sqrt(self.alphas_cumprod)
	self.sigma_t = torch.sqrt(1 - self.alphas_cumprod)
	self.lambda_t = torch.log(self.alpha_t) - torch.log(self.sigma_t)

	# standard deviation of the initial noise distribution
	self.init_noise_sigma = 1.0

	if algorithm_type not in ["data_prediction", "noise_prediction"]:
	raise NotImplementedError(f"{algorithm_type} does is not implemented for {self.__class__}")

	# setable values
	self.num_inference_steps = None
	timesteps = np.linspace(0, num_train_timesteps - 1, num_train_timesteps, dtype=np.float32)[::-1].copy()
	self.timesteps = torch.from_numpy(timesteps)
	self.timestep_list = [None] * max(predictor_order, corrector_order - 1)
	self.model_outputs = [None] * max(predictor_order, corrector_order - 1)

	self.tau_func = tau_func
	self.predict_x0 = algorithm_type == "data_prediction"
	self.lower_order_nums = 0
	self.last_sample = None

	def set_timesteps(self, num_inference_steps: int = None, device: Union[str, torch.device] = None):
	"""
	Sets the discrete timesteps used for the diffusion chain (to be run before inference).

	Args:
	num_inference_steps (`int`):
	The number of diffusion steps used when generating samples with a pre-trained model.
	device (`str` or `torch.device`, optional):
	The device to which the timesteps should be moved to. If `None`, the timesteps are not moved.
	"""
	# Clipping the minimum of all lambda(t) for numerical stability.
	# This is critical for cosine (squaredcos_cap_v2) noise schedule.
	clipped_idx = torch.searchsorted(torch.flip(self.lambda_t, [0]), self.config.lambda_min_clipped)
	last_timestep = ((self.config.num_train_timesteps - clipped_idx).numpy()).item()

	# "linspace", "leading", "trailing" corresponds to annotation of Table 2. of https://arxiv.org/abs/2305.08891
	if self.config.timestep_spacing == "linspace":
	timesteps = (
	np.linspace(0, last_timestep - 1, num_inference_steps + 1).round()[::-1][:-1].copy().astype(np.int64)
	)

	elif self.config.timestep_spacing == "leading":
	step_ratio = last_timestep // (num_inference_steps + 1)
	# creates integer timesteps by multiplying by ratio
	# casting to int to avoid issues when num_inference_step is power of 3
	timesteps = (np.arange(0, num_inference_steps + 1) * step_ratio).round()[::-1][:-1].copy().astype(np.int64)
	timesteps += self.config.steps_offset
	elif self.config.timestep_spacing == "trailing":
	step_ratio = self.config.num_train_timesteps / num_inference_steps
	# creates integer timesteps by multiplying by ratio
	# casting to int to avoid issues when num_inference_step is power of 3
	timesteps = np.arange(last_timestep, 0, -step_ratio).round().copy().astype(np.int64)
	timesteps -= 1
	else:
	raise ValueError(
	f"{self.config.timestep_spacing} is not supported. Please make sure to choose one of 'linspace', 'leading' or 'trailing'."
	)

	sigmas = np.array(((1 - self.alphas_cumprod) / self.alphas_cumprod) ** 0.5)
	if self.config.use_karras_sigmas:
	log_sigmas = np.log(sigmas)
	sigmas = self._convert_to_karras(in_sigmas=sigmas, num_inference_steps=num_inference_steps)
	timesteps = np.array([self._sigma_to_t(sigma, log_sigmas) for sigma in sigmas]).round()
	timesteps = np.flip(timesteps).copy().astype(np.int64)

	self.sigmas = torch.from_numpy(sigmas)

	# when num_inference_steps == num_train_timesteps, we can end up with
	# duplicates in timesteps.
	_, unique_indices = np.unique(timesteps, return_index=True)
	timesteps = timesteps[np.sort(unique_indices)]

	self.timesteps = torch.from_numpy(timesteps).to(device)

	self.num_inference_steps = len(timesteps)

	self.model_outputs = [
	None,
	] * max(self.config.predictor_order, self.config.corrector_order - 1)
	self.lower_order_nums = 0
	self.last_sample = None

	# Copied from diffusers.schedulers.scheduling_ddpm.DDPMScheduler._threshold_sample
	def _threshold_sample(self, sample: torch.FloatTensor) -> torch.FloatTensor:
	"""
	"Dynamic thresholding: At each sampling step we set s to a certain percentile absolute pixel value in xt0 (the
	prediction of x_0 at timestep t), and if s > 1, then we threshold xt0 to the range [-s, s] and then divide by
	s. Dynamic thresholding pushes saturated pixels (those near -1 and 1) inwards, thereby actively preventing
	pixels from saturation at each step. We find that dynamic thresholding results in significantly better
	photorealism as well as better image-text alignment, especially when using very large guidance weights."

	https://arxiv.org/abs/2205.11487
	"""
	dtype = sample.dtype
	batch_size, channels, height, width = sample.shape

	if dtype not in (torch.float32, torch.float64):
	sample = sample.float() # upcast for quantile calculation, and clamp not implemented for cpu half

	# Flatten sample for doing quantile calculation along each image
	sample = sample.reshape(batch_size, channels * height * width)

	abs_sample = sample.abs() # "a certain percentile absolute pixel value"

	s = torch.quantile(abs_sample, self.config.dynamic_thresholding_ratio, dim=1)
	s = torch.clamp(
	s, min=1, max=self.config.sample_max_value
	) # When clamped to min=1, equivalent to standard clipping to [-1, 1]

	s = s.unsqueeze(1) # (batch_size, 1) because clamp will broadcast along dim=0
	sample = torch.clamp(sample, -s, s) / s # "we threshold xt0 to the range [-s, s] and then divide by s"

	sample = sample.reshape(batch_size, channels, height, width)
	sample = sample.to(dtype)

	return sample

	# Copied from diffusers.schedulers.scheduling_euler_discrete.EulerDiscreteScheduler._sigma_to_t
	def _sigma_to_t(self, sigma, log_sigmas):
	# get log sigma
	log_sigma = np.log(sigma)

	# get distribution
	dists = log_sigma - log_sigmas[:, np.newaxis]

	# get sigmas range
	low_idx = np.cumsum((dists >= 0), axis=0).argmax(axis=0).clip(max=log_sigmas.shape[0] - 2)
	high_idx = low_idx + 1

	low = log_sigmas[low_idx]
	high = log_sigmas[high_idx]

	# interpolate sigmas
	w = (low - log_sigma) / (low - high)
	w = np.clip(w, 0, 1)

	# transform interpolation to time range
	t = (1 - w) * low_idx + w * high_idx
	t = t.reshape(sigma.shape)
	return t

	# Copied from diffusers.schedulers.scheduling_euler_discrete.EulerDiscreteScheduler._convert_to_karras
	def _convert_to_karras(self, in_sigmas: torch.FloatTensor, num_inference_steps) -> torch.FloatTensor:
	"""Constructs the noise schedule of Karras et al. (2022)."""

	sigma_min: float = in_sigmas[-1].item()
	sigma_max: float = in_sigmas[0].item()

	rho = 7.0 # 7.0 is the value used in the paper
	ramp = np.linspace(0, 1, num_inference_steps)
	min_inv_rho = sigma_min ** (1 / rho)
	max_inv_rho = sigma_max ** (1 / rho)
	sigmas = (max_inv_rho + ramp * (min_inv_rho - max_inv_rho)) ** rho
	return sigmas

	def convert_model_output(
	self, model_output: torch.FloatTensor, timestep: int, sample: torch.FloatTensor
	) -> torch.FloatTensor:
	"""
	Convert the model output to the corresponding type the DPMSolver/DPMSolver++ algorithm needs. DPM-Solver is
	designed to discretize an integral of the noise prediction model, and DPM-Solver++ is designed to discretize an
	integral of the data prediction model.

	<Tip>

	The algorithm and model type are decoupled. You can use either DPMSolver or DPMSolver++ for both noise
	prediction and data prediction models.

	</Tip>

	Args:
	model_output (`torch.FloatTensor`):
	The direct output from the learned diffusion model.
	timestep (`int`):
	The current discrete timestep in the diffusion chain.
	sample (`torch.FloatTensor`):
	A current instance of a sample created by the diffusion process.

	Returns:
	`torch.FloatTensor`:
	The converted model output.
	"""

	# SA-Solver_data_prediction needs to solve an integral of the data prediction model.
	if self.config.algorithm_type in ["data_prediction"]:
	if self.config.prediction_type == "epsilon":
	# SA-Solver only needs the "mean" output.
	if self.config.variance_type in ["learned", "learned_range"]:
	model_output = model_output[:, :3]
	alpha_t, sigma_t = self.alpha_t[timestep], self.sigma_t[timestep]
	x0_pred = (sample - sigma_t * model_output) / alpha_t
	elif self.config.prediction_type == "sample":
	x0_pred = model_output
	elif self.config.prediction_type == "v_prediction":
	alpha_t, sigma_t = self.alpha_t[timestep], self.sigma_t[timestep]
	x0_pred = alpha_t * sample - sigma_t * model_output
	else:
	raise ValueError(
	f"prediction_type given as {self.config.prediction_type} must be one of `epsilon`, `sample`, or"
	" `v_prediction` for the SASolverScheduler."
	)

	if self.config.thresholding:
	x0_pred = self._threshold_sample(x0_pred)

	return x0_pred

	# SA-Solver_noise_prediction needs to solve an integral of the noise prediction model.
	elif self.config.algorithm_type in ["noise_prediction"]:
	if self.config.prediction_type == "epsilon":
	# SA-Solver only needs the "mean" output.
	if self.config.variance_type in ["learned", "learned_range"]:
	epsilon = model_output[:, :3]
	else:
	epsilon = model_output
	elif self.config.prediction_type == "sample":
	alpha_t, sigma_t = self.alpha_t[timestep], self.sigma_t[timestep]
	epsilon = (sample - alpha_t * model_output) / sigma_t
	elif self.config.prediction_type == "v_prediction":
	alpha_t, sigma_t = self.alpha_t[timestep], self.sigma_t[timestep]
	epsilon = alpha_t * model_output + sigma_t * sample
	else:
	raise ValueError(
	f"prediction_type given as {self.config.prediction_type} must be one of `epsilon`, `sample`, or"
	" `v_prediction` for the SASolverScheduler."
	)

	if self.config.thresholding:
	alpha_t, sigma_t = self.alpha_t[timestep], self.sigma_t[timestep]
	x0_pred = (sample - sigma_t * epsilon) / alpha_t
	x0_pred = self._threshold_sample(x0_pred)
	epsilon = (sample - alpha_t * x0_pred) / sigma_t

	return epsilon

	def get_coefficients_exponential_negative(self, order, interval_start, interval_end):
	"""
	Calculate the integral of exp(-x) * x^order dx from interval_start to interval_end
	"""
	assert order in [0, 1, 2, 3], "order is only supported for 0, 1, 2 and 3"

	if order == 0:
	return torch.exp(-interval_end) * (torch.exp(interval_end - interval_start) - 1)
	elif order == 1:
	return torch.exp(-interval_end) * (
	(interval_start + 1) * torch.exp(interval_end - interval_start) - (interval_end + 1))
	elif order == 2:
	return torch.exp(-interval_end) * (
	(interval_start ** 2 + 2 * interval_start + 2) * torch.exp(interval_end - interval_start) - (
	interval_end ** 2 + 2 * interval_end + 2))
	elif order == 3:
	return torch.exp(-interval_end) * (
	(interval_start ** 3 + 3 * interval_start ** 2 + 6 * interval_start + 6) * torch.exp(
	interval_end - interval_start) - (interval_end ** 3 + 3 * interval_end ** 2 + 6 * interval_end + 6))

	def get_coefficients_exponential_positive(self, order, interval_start, interval_end, tau):
	"""
	Calculate the integral of exp(x(1+tau^2)) * x^order dx from interval_start to interval_end
	"""
	assert order in [0, 1, 2, 3], "order is only supported for 0, 1, 2 and 3"

	# after change of variable(cov)
	interval_end_cov = (1 + tau ** 2) * interval_end
	interval_start_cov = (1 + tau ** 2) * interval_start

	if order == 0:
	return torch.exp(interval_end_cov) * (1 - torch.exp(-(interval_end_cov - interval_start_cov))) / (
	(1 + tau ** 2))
	elif order == 1:
	return torch.exp(interval_end_cov) * ((interval_end_cov - 1) - (interval_start_cov - 1) * torch.exp(
	-(interval_end_cov - interval_start_cov))) / ((1 + tau 2) 2)
	elif order == 2:
	return torch.exp(interval_end_cov) * ((interval_end_cov ** 2 - 2 * interval_end_cov + 2) - (
	interval_start_cov ** 2 - 2 * interval_start_cov + 2) * torch.exp(
	-(interval_end_cov - interval_start_cov))) / ((1 + tau 2) 3)
	elif order == 3:
	return torch.exp(interval_end_cov) * (
	(interval_end_cov ** 3 - 3 * interval_end_cov ** 2 + 6 * interval_end_cov - 6) - (
	interval_start_cov ** 3 - 3 * interval_start_cov ** 2 + 6 * interval_start_cov - 6) * torch.exp(
	-(interval_end_cov - interval_start_cov))) / ((1 + tau 2) 4)

	def lagrange_polynomial_coefficient(self, order, lambda_list):
	"""
	Calculate the coefficient of lagrange polynomial
	"""

	assert order in [0, 1, 2, 3]
	assert order == len(lambda_list) - 1
	if order == 0:
	return [[1]]
	elif order == 1:
	return [[1 / (lambda_list[0] - lambda_list[1]), -lambda_list[1] / (lambda_list[0] - lambda_list[1])],
	[1 / (lambda_list[1] - lambda_list[0]), -lambda_list[0] / (lambda_list[1] - lambda_list[0])]]
	elif order == 2:
	denominator1 = (lambda_list[0] - lambda_list[1]) * (lambda_list[0] - lambda_list[2])
	denominator2 = (lambda_list[1] - lambda_list[0]) * (lambda_list[1] - lambda_list[2])
	denominator3 = (lambda_list[2] - lambda_list[0]) * (lambda_list[2] - lambda_list[1])
	return [[1 / denominator1,
	(-lambda_list[1] - lambda_list[2]) / denominator1,
	lambda_list[1] * lambda_list[2] / denominator1],

	[1 / denominator2,
	(-lambda_list[0] - lambda_list[2]) / denominator2,
	lambda_list[0] * lambda_list[2] / denominator2],

	[1 / denominator3,
	(-lambda_list[0] - lambda_list[1]) / denominator3,
	lambda_list[0] * lambda_list[1] / denominator3]
	]
	elif order == 3:
	denominator1 = (lambda_list[0] - lambda_list[1]) * (lambda_list[0] - lambda_list[2]) * (
	lambda_list[0] - lambda_list[3])
	denominator2 = (lambda_list[1] - lambda_list[0]) * (lambda_list[1] - lambda_list[2]) * (
	lambda_list[1] - lambda_list[3])
	denominator3 = (lambda_list[2] - lambda_list[0]) * (lambda_list[2] - lambda_list[1]) * (
	lambda_list[2] - lambda_list[3])
	denominator4 = (lambda_list[3] - lambda_list[0]) * (lambda_list[3] - lambda_list[1]) * (
	lambda_list[3] - lambda_list[2])
	return [[1 / denominator1,
	(-lambda_list[1] - lambda_list[2] - lambda_list[3]) / denominator1,
	(lambda_list[1] * lambda_list[2] + lambda_list[1] * lambda_list[3] + lambda_list[2] * lambda_list[
	3]) / denominator1,
	(-lambda_list[1] * lambda_list[2] * lambda_list[3]) / denominator1],

	[1 / denominator2,
	(-lambda_list[0] - lambda_list[2] - lambda_list[3]) / denominator2,
	(lambda_list[0] * lambda_list[2] + lambda_list[0] * lambda_list[3] + lambda_list[2] * lambda_list[
	3]) / denominator2,
	(-lambda_list[0] * lambda_list[2] * lambda_list[3]) / denominator2],

	[1 / denominator3,
	(-lambda_list[0] - lambda_list[1] - lambda_list[3]) / denominator3,
	(lambda_list[0] * lambda_list[1] + lambda_list[0] * lambda_list[3] + lambda_list[1] * lambda_list[
	3]) / denominator3,
	(-lambda_list[0] * lambda_list[1] * lambda_list[3]) / denominator3],

	[1 / denominator4,
	(-lambda_list[0] - lambda_list[1] - lambda_list[2]) / denominator4,
	(lambda_list[0] * lambda_list[1] + lambda_list[0] * lambda_list[2] + lambda_list[1] * lambda_list[
	2]) / denominator4,
	(-lambda_list[0] * lambda_list[1] * lambda_list[2]) / denominator4]

	]

	def get_coefficients_fn(self, order, interval_start, interval_end, lambda_list, tau):
	assert order in [1, 2, 3, 4]
	assert order == len(lambda_list), 'the length of lambda list must be equal to the order'
	coefficients = []
	lagrange_coefficient = self.lagrange_polynomial_coefficient(order - 1, lambda_list)
	for i in range(order):
	coefficient = 0
	for j in range(order):
	if self.predict_x0:

	coefficient += lagrange_coefficient[i][j] * self.get_coefficients_exponential_positive(
	order - 1 - j, interval_start, interval_end, tau)
	else:
	coefficient += lagrange_coefficient[i][j] * self.get_coefficients_exponential_negative(
	order - 1 - j, interval_start, interval_end)
	coefficients.append(coefficient)
	assert len(coefficients) == order, 'the length of coefficients does not match the order'
	return coefficients

	def stochastic_adams_bashforth_update(
	self,
	model_output: torch.FloatTensor,
	prev_timestep: int,
	sample: torch.FloatTensor,
	noise: torch.FloatTensor,
	order: int,
	tau: torch.FloatTensor,
	) -> torch.FloatTensor:
	"""
	One step for the SA-Predictor.

	Args:
	model_output (`torch.FloatTensor`):
	The direct output from the learned diffusion model at the current timestep.
	prev_timestep (`int`):
	The previous discrete timestep in the diffusion chain.
	sample (`torch.FloatTensor`):
	A current instance of a sample created by the diffusion process.
	order (`int`):
	The order of SA-Predictor at this timestep.

	Returns:
	`torch.FloatTensor`:
	The sample tensor at the previous timestep.
	"""

	assert noise is not None
	timestep_list = self.timestep_list
	model_output_list = self.model_outputs
	s0, t = self.timestep_list[-1], prev_timestep
	lambda_t, lambda_s0 = self.lambda_t[t], self.lambda_t[s0]
	alpha_t, alpha_s0 = self.alpha_t[t], self.alpha_t[s0]
	sigma_t, sigma_s0 = self.sigma_t[t], self.sigma_t[s0]
	gradient_part = torch.zeros_like(sample)
	h = lambda_t - lambda_s0
	lambda_list = []

	for i in range(order):
	lambda_list.append(self.lambda_t[timestep_list[-(i + 1)]])

	gradient_coefficients = self.get_coefficients_fn(order, lambda_s0, lambda_t, lambda_list, tau)

	x = sample

	if self.predict_x0:
	if order == 2: ## if order = 2 we do a modification that does not influence the convergence order similar to unipc. Note: This is used only for few steps sampling.
	# The added term is O(h^3). Empirically we find it will slightly improve the image quality.
	# ODE case
	# gradient_coefficients[0] += 1.0 * torch.exp(lambda_t) * (h ** 2 / 2 - (h - 1 + torch.exp(-h))) / (ns.marginal_lambda(t_prev_list[-1]) - ns.marginal_lambda(t_prev_list[-2]))
	# gradient_coefficients[1] -= 1.0 * torch.exp(lambda_t) * (h ** 2 / 2 - (h - 1 + torch.exp(-h))) / (ns.marginal_lambda(t_prev_list[-1]) - ns.marginal_lambda(t_prev_list[-2]))
	gradient_coefficients[0] += 1.0 * torch.exp((1 + tau ** 2) * lambda_t) * (
	h ** 2 / 2 - (h * (1 + tau 2) - 1 + torch.exp((1 + tau 2) * (-h))) / (
	(1 + tau 2) 2)) / (self.lambda_t[timestep_list[-1]] - self.lambda_t[
	timestep_list[-2]])
	gradient_coefficients[1] -= 1.0 * torch.exp((1 + tau ** 2) * lambda_t) * (
	h ** 2 / 2 - (h * (1 + tau 2) - 1 + torch.exp((1 + tau 2) * (-h))) / (
	(1 + tau 2) 2)) / (self.lambda_t[timestep_list[-1]] - self.lambda_t[
	timestep_list[-2]])

	for i in range(order):
	if self.predict_x0:

	gradient_part += (1 + tau ** 2) * sigma_t * torch.exp(- tau ** 2 * lambda_t) * gradient_coefficients[
	i] * model_output_list[-(i + 1)]
	else:
	gradient_part += -(1 + tau ** 2) * alpha_t * gradient_coefficients[i] * model_output_list[-(i + 1)]

	if self.predict_x0:
	noise_part = sigma_t * torch.sqrt(1 - torch.exp(-2 * tau ** 2 * h)) * noise
	else:
	noise_part = tau * sigma_t * torch.sqrt(torch.exp(2 * h) - 1) * noise

	if self.predict_x0:
	x_t = torch.exp(-tau ** 2 * h) * (sigma_t / sigma_s0) * x + gradient_part + noise_part
	else:
	x_t = (alpha_t / alpha_s0) * x + gradient_part + noise_part

	x_t = x_t.to(x.dtype)
	return x_t

	def stochastic_adams_moulton_update(
	self,
	this_model_output: torch.FloatTensor,
	this_timestep: int,
	last_sample: torch.FloatTensor,
	last_noise: torch.FloatTensor,
	this_sample: torch.FloatTensor,
	order: int,
	tau: torch.FloatTensor,
	) -> torch.FloatTensor:
	"""
	One step for the SA-Corrector.

	Args:
	this_model_output (`torch.FloatTensor`):
	The model outputs at `x_t`.
	this_timestep (`int`):
	The current timestep `t`.
	last_sample (`torch.FloatTensor`):
	The generated sample before the last predictor `x_{t-1}`.
	this_sample (`torch.FloatTensor`):
	The generated sample after the last predictor `x_{t}`.
	order (`int`):
	The order of SA-Corrector at this step.

	Returns:
	`torch.FloatTensor`:
	The corrected sample tensor at the current timestep.
	"""

	assert last_noise is not None
	timestep_list = self.timestep_list
	model_output_list = self.model_outputs
	s0, t = self.timestep_list[-1], this_timestep
	lambda_t, lambda_s0 = self.lambda_t[t], self.lambda_t[s0]
	alpha_t, alpha_s0 = self.alpha_t[t], self.alpha_t[s0]
	sigma_t, sigma_s0 = self.sigma_t[t], self.sigma_t[s0]
	gradient_part = torch.zeros_like(this_sample)
	h = lambda_t - lambda_s0
	t_list = timestep_list + [this_timestep]
	lambda_list = []
	for i in range(order):
	lambda_list.append(self.lambda_t[t_list[-(i + 1)]])

	model_prev_list = model_output_list + [this_model_output]

	gradient_coefficients = self.get_coefficients_fn(order, lambda_s0, lambda_t, lambda_list, tau)

	x = last_sample

	if self.predict_x0:
	if order == 2: ## if order = 2 we do a modification that does not influence the convergence order similar to UniPC. Note: This is used only for few steps sampling.
	# The added term is O(h^3). Empirically we find it will slightly improve the image quality.
	# ODE case
	# gradient_coefficients[0] += 1.0 * torch.exp(lambda_t) * (h / 2 - (h - 1 + torch.exp(-h)) / h)
	# gradient_coefficients[1] -= 1.0 * torch.exp(lambda_t) * (h / 2 - (h - 1 + torch.exp(-h)) / h)
	gradient_coefficients[0] += 1.0 * torch.exp((1 + tau ** 2) * lambda_t) * (
	h / 2 - (h * (1 + tau 2) - 1 + torch.exp((1 + tau 2) * (-h))) / (
	(1 + tau 2) 2 * h))
	gradient_coefficients[1] -= 1.0 * torch.exp((1 + tau ** 2) * lambda_t) * (
	h / 2 - (h * (1 + tau 2) - 1 + torch.exp((1 + tau 2) * (-h))) / (
	(1 + tau 2) 2 * h))

	for i in range(order):
	if self.predict_x0:
	gradient_part += (1 + tau ** 2) * sigma_t * torch.exp(- tau ** 2 * lambda_t) * gradient_coefficients[
	i] * model_prev_list[-(i + 1)]
	else:
	gradient_part += -(1 + tau ** 2) * alpha_t * gradient_coefficients[i] * model_prev_list[-(i + 1)]

	if self.predict_x0:
	noise_part = sigma_t * torch.sqrt(1 - torch.exp(-2 * tau ** 2 * h)) * last_noise
	else:
	noise_part = tau * sigma_t * torch.sqrt(torch.exp(2 * h) - 1) * last_noise

	if self.predict_x0:
	x_t = torch.exp(-tau ** 2 * h) * (sigma_t / sigma_s0) * x + gradient_part + noise_part
	else:
	x_t = (alpha_t / alpha_s0) * x + gradient_part + noise_part

	x_t = x_t.to(x.dtype)
	return x_t

	def step(
	self,
	model_output: torch.FloatTensor,
	timestep: int,
	sample: torch.FloatTensor,
	generator=None,
	return_dict: bool = True,
	) -> Union[SchedulerOutput, Tuple]:
	"""
	Predict the sample from the previous timestep by reversing the SDE. This function propagates the sample with
	the SA-Solver.

	Args:
	model_output (`torch.FloatTensor`):
	The direct output from learned diffusion model.
	timestep (`int`):
	The current discrete timestep in the diffusion chain.
	sample (`torch.FloatTensor`):
	A current instance of a sample created by the diffusion process.
	generator (`torch.Generator`, optional):
	A random number generator.
	return_dict (`bool`):
	Whether or not to return a [`~schedulers.scheduling_utils.SchedulerOutput`] or `tuple`.

	Returns:
	[`~schedulers.scheduling_utils.SchedulerOutput`] or `tuple`:
	If return_dict is `True`, [`~schedulers.scheduling_utils.SchedulerOutput`] is returned, otherwise a
	tuple is returned where the first element is the sample tensor.

	"""
	if self.num_inference_steps is None:
	raise ValueError(
	"Number of inference steps is 'None', you need to run 'set_timesteps' after creating the scheduler"
	)

	if isinstance(timestep, torch.Tensor):
	timestep = timestep.to(self.timesteps.device)
	step_index = (self.timesteps == timestep).nonzero()
	if len(step_index) == 0:
	step_index = len(self.timesteps) - 1
	else:
	step_index = step_index.item()

	use_corrector = (
	step_index > 0 and self.last_sample is not None
	)

	model_output_convert = self.convert_model_output(model_output, timestep, sample)

	if use_corrector:
	current_tau = self.tau_func(self.timestep_list[-1])
	sample = self.stochastic_adams_moulton_update(
	this_model_output=model_output_convert,
	this_timestep=timestep,
	last_sample=self.last_sample,
	last_noise=self.last_noise,
	this_sample=sample,
	order=self.this_corrector_order,
	tau=current_tau,
	)

	prev_timestep = 0 if step_index == len(self.timesteps) - 1 else self.timesteps[step_index + 1]

	for i in range(max(self.config.predictor_order, self.config.corrector_order - 1) - 1):
	self.model_outputs[i] = self.model_outputs[i + 1]
	self.timestep_list[i] = self.timestep_list[i + 1]

	self.model_outputs[-1] = model_output_convert
	self.timestep_list[-1] = timestep

	noise = randn_tensor(
	model_output.shape, generator=generator, device=model_output.device, dtype=model_output.dtype
	)

	if self.config.lower_order_final:
	this_predictor_order = min(self.config.predictor_order, len(self.timesteps) - step_index)
	this_corrector_order = min(self.config.corrector_order, len(self.timesteps) - step_index + 1)
	else:
	this_predictor_order = self.config.predictor_order
	this_corrector_order = self.config.corrector_order

	self.this_predictor_order = min(this_predictor_order, self.lower_order_nums + 1) # warmup for multistep
	self.this_corrector_order = min(this_corrector_order, self.lower_order_nums + 2) # warmup for multistep
	assert self.this_predictor_order > 0
	assert self.this_corrector_order > 0

	self.last_sample = sample
	self.last_noise = noise

	current_tau = self.tau_func(self.timestep_list[-1])
	prev_sample = self.stochastic_adams_bashforth_update(
	model_output=model_output_convert,
	prev_timestep=prev_timestep,
	sample=sample,
	noise=noise,
	order=self.this_predictor_order,
	tau=current_tau,
	)

	if self.lower_order_nums < max(self.config.predictor_order, self.config.corrector_order - 1):
	self.lower_order_nums += 1

	if not return_dict:
	return (prev_sample,)

	return SchedulerOutput(prev_sample=prev_sample)

	def scale_model_input(self, sample: torch.FloatTensor, args, *kwargs) -> torch.FloatTensor:
	"""
	Ensures interchangeability with schedulers that need to scale the denoising model input depending on the
	current timestep.

	Args:
	sample (`torch.FloatTensor`):
	The input sample.

	Returns:
	`torch.FloatTensor`:
	A scaled input sample.
	"""
	return sample

	# Copied from diffusers.schedulers.scheduling_ddpm.DDPMScheduler.add_noise
	def add_noise(
	self,
	original_samples: torch.FloatTensor,
	noise: torch.FloatTensor,
	timesteps: torch.IntTensor,
	) -> torch.FloatTensor:
	# Make sure alphas_cumprod and timestep have same device and dtype as original_samples
	alphas_cumprod = self.alphas_cumprod.to(device=original_samples.device, dtype=original_samples.dtype)
	timesteps = timesteps.to(original_samples.device)

	sqrt_alpha_prod = alphas_cumprod[timesteps] ** 0.5
	sqrt_alpha_prod = sqrt_alpha_prod.flatten()
	while len(sqrt_alpha_prod.shape) < len(original_samples.shape):
	sqrt_alpha_prod = sqrt_alpha_prod.unsqueeze(-1)

	sqrt_one_minus_alpha_prod = (1 - alphas_cumprod[timesteps]) ** 0.5
	sqrt_one_minus_alpha_prod = sqrt_one_minus_alpha_prod.flatten()
	while len(sqrt_one_minus_alpha_prod.shape) < len(original_samples.shape):
	sqrt_one_minus_alpha_prod = sqrt_one_minus_alpha_prod.unsqueeze(-1)

	noisy_samples = sqrt_alpha_prod * original_samples + sqrt_one_minus_alpha_prod * noise
	return noisy_samples

	def __len__(self):
	return self.config.num_train_timesteps