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dpm_solver_pytorch.py
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dpm_solver_pytorch.py
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import torch
import torch.nn.functional as F
import math
class NoiseScheduleVP:
def __init__(self, schedule='linear'):
"""Create a wrapper class for the forward SDE (VP type).
The forward SDE ensures that the condition distribution q_{t|0}(x_t | x_0) = N ( alpha_t * x_0, sigma_t^2 * I ).
We further define lambda_t = log(alpha_t) - log(sigma_t), which is the half-logSNR (described in the DPM-Solver paper).
Therefore, we implement the functions for computing alpha_t, sigma_t and lambda_t. For t in [0, T], we have:
log_alpha_t = self.marginal_log_mean_coeff(t)
sigma_t = self.marginal_std(t)
lambda_t = self.marginal_lambda(t)
Moreover, as lambda(t) is an invertible function, we also support its inverse function:
t = self.inverse_lambda(lambda_t)
===============================================================
We support two types of VPSDEs: linear (DDPM) and cosine (improved-DDPM). The hyperparameters for the noise
schedule are the default settings in DDPM and improved-DDPM:
beta_min: A `float` number. The smallest beta for the linear schedule.
beta_max: A `float` number. The largest beta for the linear schedule.
cosine_s: A `float` number. The hyperparameter in the cosine schedule.
cosine_beta_max: A `float` number. The hyperparameter in the cosine schedule.
T: A `float` number. The ending time of the forward process.
Note that the original DDPM (linear schedule) used the discrete-time label (0 to 999). We convert the discrete-time
label to the continuous-time time (followed Song et al., 2021), so the beta here is 1000x larger than those in DDPM.
===============================================================
Args:
schedule: A `str`. The noise schedule of the forward SDE ('linear' or 'cosine').
Returns:
A wrapper object of the forward SDE (VP type).
"""
if schedule not in ['linear', 'cosine']:
raise ValueError(
"Unsupported noise schedule {}. The schedule needs to be 'linear' or 'cosine'".format(schedule))
self.beta_0 = 0.1
self.beta_1 = 20
self.cosine_s = 0.008
self.cosine_beta_max = 999.
self.cosine_t_max = math.atan(self.cosine_beta_max * (1. + self.cosine_s) / math.pi) * 2. * (
1. + self.cosine_s) / math.pi - self.cosine_s
self.cosine_log_alpha_0 = math.log(math.cos(self.cosine_s / (1. + self.cosine_s) * math.pi / 2.))
self.schedule = schedule
if schedule == 'cosine':
# For the cosine schedule, T = 1 will have numerical issues. So we manually set the ending time T.
# Note that T = 0.9946 may be not the optimal setting. However, we find it works well.
self.T = 0.9946
else:
self.T = 1.
def marginal_log_mean_coeff(self, t):
"""
Compute log(alpha_t) of a given continuous-time label t in [0, T].
"""
if self.schedule == 'linear':
return -0.25 * t ** 2 * (self.beta_1 - self.beta_0) - 0.5 * t * self.beta_0
elif self.schedule == 'cosine':
log_alpha_fn = lambda s: torch.log(torch.cos((s + self.cosine_s) / (1. + self.cosine_s) * math.pi / 2.))
log_alpha_t = log_alpha_fn(t) - self.cosine_log_alpha_0
return log_alpha_t
else:
raise ValueError("Unsupported ")
def marginal_std(self, t):
"""
Compute sigma_t of a given continuous-time label t in [0, T].
"""
return torch.sqrt(1. - torch.exp(2. * self.marginal_log_mean_coeff(t)))
def marginal_lambda(self, t):
"""
Compute lambda_t = log(alpha_t) - log(sigma_t) of a given continuous-time label t in [0, T].
"""
log_mean_coeff = self.marginal_log_mean_coeff(t)
log_std = 0.5 * torch.log(1. - torch.exp(2. * log_mean_coeff))
return log_mean_coeff - log_std
def inverse_lambda(self, lamb):
"""
Compute the continuous-time label t in [0, T] of a given half-logSNR lambda_t.
"""
if self.schedule == 'linear':
tmp = 2. * (self.beta_1 - self.beta_0) * torch.logaddexp(-2. * lamb, torch.zeros((1,)).to(lamb))
Delta = self.beta_0 ** 2 + tmp
return tmp / (torch.sqrt(Delta) + self.beta_0) / (self.beta_1 - self.beta_0)
else:
log_alpha = -0.5 * torch.logaddexp(-2. * lamb, torch.zeros((1,)).to(lamb))
t_fn = lambda log_alpha_t: torch.arccos(torch.exp(log_alpha_t + self.cosine_log_alpha_0)) * 2. * (
1. + self.cosine_s) / math.pi - self.cosine_s
t = t_fn(log_alpha)
return t
def model_wrapper(model, noise_schedule=None, is_cond_classifier=False, classifier_fn=None, classifier_scale=1.,
time_input_type='1', total_N=1000, model_kwargs={}):
"""Create a wrapper function for the noise prediction model.
DPM-Solver needs to solve the continuous-time diffusion ODEs. For DPMs trained on discrete-time labels, we need to
firstly wrap the model function to a function that accepts the continuous time as the input.
The input `model` has the following format:
``
model(x, t_input, **model_kwargs) -> noise
``
where `x` and `noise` have the same shape, and `t_input` is the time label of the model.
(may be discrete-time labels (i.e. 0 to 999) or continuous-time labels (i.e. epsilon to T).)
We wrap the model function to the following format:
``
def model_fn(x, t_continuous) -> noise:
t_input = get_model_input_time(t_continuous)
return model(x, t_input, **model_kwargs)
``
where `t_continuous` is the continuous time labels (i.e. epsilon to T). And we use `model_fn` for DPM-Solver.
For DPMs with classifier guidance, we also combine the model output with the classifier gradient as used in [1].
[1] P. Dhariwal and A. Q. Nichol, "Diffusion models beat GANs on image synthesis," in Advances in Neural
Information Processing Systems, vol. 34, 2021, pp. 8780-8794.
===============================================================
Args:
model: A noise prediction model with the following format:
``
def model(x, t_input, **model_kwargs):
return noise
``
noise_schedule: A noise schedule object, such as NoiseScheduleVP. Only used for the classifier guidance.
is_cond_classifier: A `bool`. Whether to use the classifier guidance.
classifier_fn: A classifier function. Only used for the classifier guidance. The format is:
``
def classifier_fn(x, t_input):
return logits
``
classifier_scale: A `float`. The scale for the classifier guidance.
time_input_type: A `str`. The type for the time input of the model. We support three types:
- '0': The continuous-time type. In this case, the model is trained on the continuous time,
so `t_input` = `t_continuous`.
- '1': The Type-1 discrete type described in the Appendix of DPM-Solver paper.
**For discrete-time DPMs, we recommend to use this type for DPM-Solver**.
- '2': The Type-2 discrete type described in the Appendix of DPM-Solver paper.
total_N: A `int`. The total number of the discrete-time DPMs (default is 1000), used when `time_input_type`
is '1' or '2'.
model_kwargs: A `dict`. A dict for the other inputs of the model function.
Returns:
A function that accepts the continuous time as the input, with the following format:
``
def model_fn(x, t_continuous):
t_input = get_model_input_time(t_continuous)
return model(x, t_input, **model_kwargs)
``
"""
def get_model_input_time(t_continuous):
"""
Convert the continuous-time `t_continuous` (in [epsilon, T]) to the model input time.
"""
if time_input_type == '0':
# discrete_type == '0' means that the model is continuous-time model.
# For continuous-time DPMs, the continuous time equals to the discrete time.
return t_continuous
elif time_input_type == '1':
# Type-1 discrete label, as detailed in the Appendix of DPM-Solver.
return 1000. * torch.max(t_continuous - 1. / total_N, torch.zeros_like(t_continuous).to(t_continuous))
elif time_input_type == '2':
# Type-2 discrete label, as detailed in the Appendix of DPM-Solver.
max_N = (total_N - 1) / total_N * 1000.
return max_N * t_continuous
else:
raise ValueError("Unsupported time input type {}, must be '0' or '1' or '2'".format(time_input_type))
def cond_fn(x, t_discrete, y):
"""
Compute the gradient of the classifier, multiplied with the sclae of the classifier guidance.
"""
assert y is not None
with torch.enable_grad():
x_in = x.detach().requires_grad_(True)
logits = classifier_fn(x_in, t_discrete)
log_probs = F.log_softmax(logits, dim=-1)
selected = log_probs[range(len(logits)), y.view(-1)]
return classifier_scale * torch.autograd.grad(selected.sum(), x_in)[0]
def model_fn(x, t_continuous):
"""
The noise predicition model function that is used for DPM-Solver.
"""
if is_cond_classifier:
y = model_kwargs.get("y", None)
if y is None:
raise ValueError("For classifier guidance, the label y has to be in the input.")
t_discrete = get_model_input_time(t_continuous)
noise_uncond = model(x, t_discrete, **model_kwargs)
cond_grad = cond_fn(x, t_discrete, y)
sigma_t = noise_schedule.marginal_std(t_continuous)
dims = len(cond_grad.shape) - 1
return noise_uncond - sigma_t[(...,) + (None,) * dims] * cond_grad
else:
t_discrete = get_model_input_time(t_continuous)
return model(x, t_discrete, **model_kwargs)
return model_fn
class DPM_Solver:
def __init__(self, model_fn, noise_schedule):
"""Construct a DPM-Solver.
Args:
model_fn: A noise prediction model function which accepts the continuous-time input
(t in [epsilon, T]):
``
def model_fn(x, t_continuous):
return noise
``
noise_schedule: A noise schedule object, such as NoiseScheduleVP.
"""
self.model_fn = model_fn
self.noise_schedule = noise_schedule
def get_time_steps(self, skip_type, t_T, t_0, N, device):
"""Compute the intermediate time steps for sampling.
Args:
skip_type: A `str`. The type for the spacing of the time steps. We support three types:
- 'logSNR': uniform logSNR for the time steps, **recommended for DPM-Solver**.
- 'time_uniform': uniform time for the time steps. (Used in DDIM and DDPM.)
- 'time_quadratic': quadratic time for the time steps. (Used in DDIM for low-resolutional data.)
t_T: A `float`. The starting time of the sampling (default is T).
t_0: A `float`. The ending time of the sampling (default is epsilon).
N: A `int`. The total number of the spacing of the time steps.
device: A torch device.
Returns:
A pytorch tensor of the time steps, with the shape (N + 1,).
"""
if skip_type == 'logSNR':
lambda_T = self.noise_schedule.marginal_lambda(torch.tensor(t_T).to(device))
lambda_0 = self.noise_schedule.marginal_lambda(torch.tensor(t_0).to(device))
logSNR_steps = torch.linspace(lambda_T, lambda_0, N + 1).to(device)
return self.noise_schedule.inverse_lambda(logSNR_steps)
elif skip_type == 'time_uniform':
return torch.linspace(t_T, t_0, N + 1).to(device)
elif skip_type == 'time_quadratic':
t = torch.linspace(t_0, t_T, 10000000).to(device)
quadratic_t = torch.sqrt(t)
quadratic_steps = torch.linspace(quadratic_t[0], quadratic_t[-1], N + 1).to(device)
return torch.flip(
torch.cat([t[torch.searchsorted(quadratic_t, quadratic_steps)[:-1]], t_T * torch.ones((1,)).to(device)],
dim=0), dims=[0])
else:
raise ValueError(
"Unsupported skip_type {}, need to be 'logSNR' or 'time_uniform' or 'time_quadratic'".format(skip_type))
def get_time_steps_for_dpm_solver_fast(self, t_T, t_0, steps, device):
"""
Compute the intermediate time steps and the order of each step for sampling by DPM-Solver-fast.
We recommend DPM-Solver-fast for fast sampling of DPMs. Given a fixed number of function evaluations by `steps`,
the sampling procedure by DPM-Solver-fast is:
- Denote K = (steps // 3 + 1). We take K intermediate time steps for sampling.
- If steps % 3 == 0, we use (K - 2) steps of DPM-Solver-3, and 1 step of DPM-Solver-2 and 1 step of DPM-Solver-1.
- If steps % 3 == 1, we use (K - 1) steps of DPM-Solver-3 and 1 step of DPM-Solver-1.
- If steps % 3 == 2, we use (K - 1) steps of DPM-Solver-3 and 1 step of DPM-Solver-2.
============================================
Args:
t_T: A `float`. The starting time of the sampling (default is T).
t_0: A `float`. The ending time of the sampling (default is epsilon).
steps: A `int`. The total number of function evaluations (NFE).
device: A torch device.
Returns:
orders: A list of the solver order of each step.
timesteps: A pytorch tensor of the time steps, with the shape of (K + 1,).
"""
K = steps // 3 + 1
if steps % 3 == 0:
orders = [3, ] * (K - 2) + [2, 1]
elif steps % 3 == 1:
orders = [3, ] * (K - 1) + [1]
else:
orders = [3, ] * (K - 1) + [2]
timesteps = self.get_time_steps('logSNR', t_T, t_0, K, device)
return orders, timesteps
def dpm_solver_first_update(self, x, s, t, return_noise=False):
"""
A single step for DPM-Solver-1.
Args:
x: A pytorch tensor. The initial value at time `s`.
s: A pytorch tensor. The starting time, with the shape (x.shape[0],).
t: A pytorch tensor. The ending time, with the shape (x.shape[0],).
return_noise: A `bool`. If true, also return the predicted noise at time `s`.
Returns:
x_t: A pytorch tensor. The approximated solution at time `t`.
"""
ns = self.noise_schedule
dims = len(x.shape) - 1
lambda_s, lambda_t = ns.marginal_lambda(s), ns.marginal_lambda(t)
h = lambda_t - lambda_s
log_alpha_s, log_alpha_t = ns.marginal_log_mean_coeff(s), ns.marginal_log_mean_coeff(t)
sigma_t = ns.marginal_std(t)
phi_1 = torch.expm1(h)
noise_s = self.model_fn(x, s)
x_t = (
torch.exp(log_alpha_t - log_alpha_s)[(...,) + (None,) * dims] * x
- (sigma_t * phi_1)[(...,) + (None,) * dims] * noise_s
)
if return_noise:
return x_t, {'noise_s': noise_s}
else:
return x_t
def dpm_solver_second_update(self, x, s, t, r1=0.5, noise_s=None, return_noise=False):
"""
A single step for DPM-Solver-2.
Args:
x: A pytorch tensor. The initial value at time `s`.
s: A pytorch tensor. The starting time, with the shape (x.shape[0],).
t: A pytorch tensor. The ending time, with the shape (x.shape[0],).
r1: A `float`. The hyperparameter of the second-order solver. We recommend the default setting `0.5`.
noise_s: A pytorch tensor. The predicted noise at time `s`.
If `noise_s` is None, we compute the predicted noise by `x` and `s`; otherwise we directly use it.
return_noise: A `bool`. If true, also return the predicted noise at time `s` and `s1` (the intermediate time).
Returns:
x_t: A pytorch tensor. The approximated solution at time `t`.
"""
ns = self.noise_schedule
dims = len(x.shape) - 1
lambda_s, lambda_t = ns.marginal_lambda(s), ns.marginal_lambda(t)
h = lambda_t - lambda_s
lambda_s1 = lambda_s + r1 * h
s1 = ns.inverse_lambda(lambda_s1)
log_alpha_s, log_alpha_s1, log_alpha_t = ns.marginal_log_mean_coeff(s), ns.marginal_log_mean_coeff(
s1), ns.marginal_log_mean_coeff(t)
sigma_s1, sigma_t = ns.marginal_std(s1), ns.marginal_std(t)
phi_11 = torch.expm1(r1 * h)
phi_1 = torch.expm1(h)
if noise_s is None:
noise_s = self.model_fn(x, s)
x_s1 = (
torch.exp(log_alpha_s1 - log_alpha_s)[(...,) + (None,) * dims] * x
- (sigma_s1 * phi_11)[(...,) + (None,) * dims] * noise_s
)
noise_s1 = self.model_fn(x_s1, s1)
x_t = (
torch.exp(log_alpha_t - log_alpha_s)[(...,) + (None,) * dims] * x
- (sigma_t * phi_1)[(...,) + (None,) * dims] * noise_s
- (0.5 / r1) * (sigma_t * phi_1)[(...,) + (None,) * dims] * (noise_s1 - noise_s)
)
if return_noise:
return x_t, {'noise_s': noise_s, 'noise_s1': noise_s1}
else:
return x_t
def dpm_solver_third_update(self, x, s, t, r1=1. / 3., r2=2. / 3., noise_s=None, noise_s1=None, noise_s2=None):
"""
A single step for DPM-Solver-3.
Args:
x: A pytorch tensor. The initial value at time `s`.
s: A pytorch tensor. The starting time, with the shape (x.shape[0],).
t: A pytorch tensor. The ending time, with the shape (x.shape[0],).
r1: A `float`. The hyperparameter of the third-order solver. We recommend the default setting `1 / 3`.
r2: A `float`. The hyperparameter of the third-order solver. We recommend the default setting `2 / 3`.
noise_s: A pytorch tensor. The predicted noise at time `s`.
If `noise_s` is None, we compute the predicted noise by `x` and `s`; otherwise we directly use it.
noise_s1: A pytorch tensor. The predicted noise at time `s1` (the intermediate time given by `r1`).
If `noise_s1` is None, we compute the predicted noise by `s1`; otherwise we directly use it.
Returns:
x_t: A pytorch tensor. The approximated solution at time `t`.
"""
ns = self.noise_schedule
dims = len(x.shape) - 1
lambda_s, lambda_t = ns.marginal_lambda(s), ns.marginal_lambda(t)
h = lambda_t - lambda_s
lambda_s1 = lambda_s + r1 * h
lambda_s2 = lambda_s + r2 * h
s1 = ns.inverse_lambda(lambda_s1)
s2 = ns.inverse_lambda(lambda_s2)
log_alpha_s, log_alpha_s1, log_alpha_s2, log_alpha_t = ns.marginal_log_mean_coeff(
s), ns.marginal_log_mean_coeff(s1), ns.marginal_log_mean_coeff(s2), ns.marginal_log_mean_coeff(t)
sigma_s1, sigma_s2, sigma_t = ns.marginal_std(s1), ns.marginal_std(s2), ns.marginal_std(t)
phi_11 = torch.expm1(r1 * h)
phi_12 = torch.expm1(r2 * h)
phi_1 = torch.expm1(h)
phi_22 = torch.expm1(r2 * h) / (r2 * h) - 1.
phi_2 = torch.expm1(h) / h - 1.
if noise_s is None:
noise_s = self.model_fn(x, s)
if noise_s1 is None:
x_s1 = (
torch.exp(log_alpha_s1 - log_alpha_s)[(...,) + (None,) * dims] * x
- (sigma_s1 * phi_11)[(...,) + (None,) * dims] * noise_s
)
noise_s1 = self.model_fn(x_s1, s1)
if noise_s2 is None:
x_s2 = (
torch.exp(log_alpha_s2 - log_alpha_s)[(...,) + (None,) * dims] * x
- (sigma_s2 * phi_12)[(...,) + (None,) * dims] * noise_s
- r2 / r1 * (sigma_s2 * phi_22)[(...,) + (None,) * dims] * (noise_s1 - noise_s)
)
noise_s2 = self.model_fn(x_s2, s2)
x_t = (
torch.exp(log_alpha_t - log_alpha_s)[(...,) + (None,) * dims] * x
- (sigma_t * phi_1)[(...,) + (None,) * dims] * noise_s
- (1. / r2) * (sigma_t * phi_2)[(...,) + (None,) * dims] * (noise_s2 - noise_s)
)
return x_t
def dpm_solver_update(self, x, s, t, order):
"""
A single step for DPM-Solver of the given order `order`.
Args:
x: A pytorch tensor. The initial value at time `s`.
s: A pytorch tensor. The starting time, with the shape (x.shape[0],).
t: A pytorch tensor. The ending time, with the shape (x.shape[0],).
order: A `int`. The order of DPM-Solver. We only support order == 1 or 2 or 3.
Returns:
x_t: A pytorch tensor. The approximated solution at time `t`.
"""
if order == 1:
return self.dpm_solver_first_update(x, s, t)
elif order == 2:
return self.dpm_solver_second_update(x, s, t)
elif order == 3:
return self.dpm_solver_third_update(x, s, t)
else:
raise ValueError("Solver order must be 1 or 2 or 3, got {}".format(order))
def dpm_solver_adaptive(self, x, order, t_T, t_0, h_init=0.05, atol=0.0078, rtol=0.05, theta=0.9, t_err=1e-5):
"""
The adaptive step size solver based on DPM-Solver.
Args:
x: A pytorch tensor. The initial value at time `t_T`.
order: A `int`. The (higher) order of the solver. We only support order == 2 or 3.
t_T: A `float`. The starting time of the sampling (default is T).
t_0: A `float`. The ending time of the sampling (default is epsilon).
h_init: A `float`. The initial step size (for logSNR).
atol: A `float`. The absolute tolerance of the solver. For image data, the default setting is 0.0078, followed [1].
rtol: A `float`. The relative tolerance of the solver. The default setting is 0.05.
theta: A `float`. The safety hyperparameter for adapting the step size. The default setting is 0.9, followed [1].
t_err: A `float`. The tolerance for the time. We solve the diffusion ODE until the absolute error between the
current time and `t_0` is less than `t_err`. The default setting is 1e-5.
Returns:
x_0: A pytorch tensor. The approximated solution at time `t_0`.
[1] A. Jolicoeur-Martineau, K. Li, R. Piché-Taillefer, T. Kachman, and I. Mitliagkas, "Gotta go fast when generating data with score-based models," arXiv preprint arXiv:2105.14080, 2021.
"""
ns = self.noise_schedule
s = t_T * torch.ones((x.shape[0],)).to(x)
lambda_s = ns.marginal_lambda(s)
lambda_0 = ns.marginal_lambda(t_0 * torch.ones_like(s).to(x))
h = h_init * torch.ones_like(s).to(x)
x_prev = x
nfe = 0
if order == 2:
r1 = 0.5
lower_update = lambda x, s, t: self.dpm_solver_first_update(x, s, t, return_noise=True)
higher_update = lambda x, s, t, **kwargs: self.dpm_solver_second_update(x, s, t, r1=r1, **kwargs)
elif order == 3:
r1, r2 = 1. / 3., 2. / 3.
lower_update = lambda x, s, t: self.dpm_solver_second_update(x, s, t, r1=r1, return_noise=True)
higher_update = lambda x, s, t, **kwargs: self.dpm_solver_third_update(x, s, t, r1=r1, r2=r2, **kwargs)
else:
raise ValueError("For adaptive step size solver, order must be 2 or 3, got {}".format(order))
while torch.abs((s - t_0)).mean() > t_err:
t = ns.inverse_lambda(lambda_s + h)
x_lower, lower_noise_kwargs = lower_update(x, s, t)
x_higher = higher_update(x, s, t, **lower_noise_kwargs)
delta = torch.max(torch.ones_like(x).to(x) * atol, rtol * torch.max(torch.abs(x_lower), torch.abs(x_prev)))
norm_fn = lambda v: torch.sqrt(torch.square(v.reshape((v.shape[0], -1))).mean(dim=-1, keepdim=True))
E = norm_fn((x_higher - x_lower) / delta).max()
if torch.all(E <= 1.):
x = x_higher
s = t
x_prev = x_lower
lambda_s = ns.marginal_lambda(s)
h = torch.min(theta * h * torch.float_power(E, -1. / order).float(), lambda_0 - lambda_s)
nfe += order
print('adaptive solver nfe', nfe)
return x
def sample(self, x, steps=10, eps=1e-4, T=None, order=3, skip_type='logSNR',
adaptive_step_size=False, fast_version=True, atol=0.0078, rtol=0.05,
):
"""
Compute the sample at time `eps` by DPM-Solver, given the initial `x` at time `T`.
We support the following algorithms:
- Adaptive step size DPM-Solver (i.e. DPM-Solver-12 and DPM-Solver-23)
- Fixed order DPM-Solver (i.e. DPM-Solver-1, DPM-Solver-2 and DPM-Solver-3).
- Fast version of DPM-Solver (i.e. DPM-Solver-fast), which uses uniform logSNR steps and combine
different orders of DPM-Solver.
**We recommend DPM-Solver-fast for both fast sampling in few steps (<=20) and fast convergence in many steps (50 to 100).**
Choosing the algorithms:
- If `adaptive_step_size` is True:
We ignore `steps` and use adaptive step size DPM-Solver with a higher order of `order`.
If `order`=2, we use DPM-Solver-12 which combines DPM-Solver-1 and DPM-Solver-2.
If `order`=3, we use DPM-Solver-23 which combines DPM-Solver-2 and DPM-Solver-3.
You can adjust the absolute tolerance `atol` and the relative tolerance `rtol` to balance the computatation costs
(NFE) and the sample quality.
- If `adaptive_step_size` is False and `fast_version` is True:
We ignore `order` and use DPM-Solver-fast with number of function evaluations (NFE) = `steps`.
We ignore `skip_type` and use uniform logSNR steps for DPM-Solver-fast.
Given a fixed NFE=`steps`, the sampling procedure by DPM-Solver-fast is:
- Denote K = (steps // 3 + 1). We take K intermediate time steps for sampling.
- If steps % 3 == 0, we use (K - 2) steps of DPM-Solver-3, and 1 step of DPM-Solver-2 and 1 step of DPM-Solver-1.
- If steps % 3 == 1, we use (K - 1) steps of DPM-Solver-3 and 1 step of DPM-Solver-1.
- If steps % 3 == 2, we use (K - 1) steps of DPM-Solver-3 and 1 step of DPM-Solver-2.
- If `adaptive_step_size` is False and `fast_version` is False:
We use DPM-Solver-`order` for `order`=1 or 2 or 3, with total [`steps` // `order`] * `order` NFE.
We support three types of `skip_type`:
- 'logSNR': uniform logSNR for the time steps, **recommended for DPM-Solver**.
- 'time_uniform': uniform time for the time steps. (Used in DDIM and DDPM.)
- 'time_quadratic': quadratic time for the time steps. (Used in DDIM.)
=====================================================
Args:
x: A pytorch tensor. The initial value at time `T` (a sample from the normal distribution).
steps: A `int`. The total number of function evaluations (NFE).
eps: A `float`. The ending time of the sampling.
We recommend `eps`=1e-3 when `steps` <= 15; and `eps`=1e-4 when `steps` > 15.
T: A `float`. The starting time of the sampling. Default is `None`.
If `T` is None, we use self.noise_schedule.T.
order: A `int`. The order of DPM-Solver.
skip_type: A `str`. The type for the spacing of the time steps. Default is 'logSNR'.
adaptive_step_size: A `bool`. If true, use the adaptive step size DPM-Solver.
fast_version: A `bool`. If true, use DPM-Solver-fast (recommended).
atol: A `float`. The absolute tolerance of the adaptive step size solver.
rtol: A `float`. The relative tolerance of the adaptive step size solver.
Returns:
x_0: A pytorch tensor. The approximated solution at time `t_0`.
[1] A. Jolicoeur-Martineau, K. Li, R. Piché-Taillefer, T. Kachman, and I. Mitliagkas, "Gotta go fast when generating data with score-based models," arXiv preprint arXiv:2105.14080, 2021.
"""
t_0 = eps
t_T = self.noise_schedule.T if T is None else T
device = x.device
if adaptive_step_size:
with torch.no_grad():
x = self.dpm_solver_adaptive(x, order=order, t_T=t_T, t_0=t_0, atol=atol, rtol=rtol)
else:
if fast_version:
orders, timesteps = self.get_time_steps_for_dpm_solver_fast(t_T=t_T, t_0=t_0, steps=steps,
device=device)
else:
N_steps = steps // order
orders = [order, ] * N_steps
timesteps = self.get_time_steps(skip_type=skip_type, t_T=t_T, t_0=t_0, N=N_steps, device=device)
with torch.no_grad():
for i, order in enumerate(orders):
vec_s, vec_t = torch.ones((x.shape[0],)).to(device) * timesteps[i], torch.ones((x.shape[0],)).to(
device) * timesteps[i + 1]
x = self.dpm_solver_update(x, vec_s, vec_t, order)
return x