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| import math |
|
|
| import numpy as np |
| import paddle |
| from paddle import nn |
|
|
|
|
| def get_timestep_embedding( |
| timesteps: paddle.Tensor, |
| embedding_dim: int, |
| flip_sin_to_cos: bool = False, |
| downscale_freq_shift: float = 1, |
| scale: float = 1, |
| max_period: int = 10000, |
| ): |
| """ |
| This matches the implementation in Denoising Diffusion Probabilistic Models: Create sinusoidal timestep embeddings. |
| |
| :param timesteps: a 1-D Tensor of N indices, one per batch element. |
| These may be fractional. |
| :param embedding_dim: the dimension of the output. :param max_period: controls the minimum frequency of the |
| embeddings. :return: an [N x dim] Tensor of positional embeddings. |
| """ |
| assert len(timesteps.shape) == 1, "Timesteps should be a 1d-array" |
|
|
| half_dim = embedding_dim // 2 |
| exponent = -math.log(max_period) * paddle.arange(start=0, end=half_dim, dtype="float32") |
| exponent = exponent / (half_dim - downscale_freq_shift) |
|
|
| emb = paddle.exp(exponent) |
| emb = timesteps[:, None].cast("float32") * emb[None, :] |
|
|
| |
| emb = scale * emb |
|
|
| |
| emb = paddle.concat([paddle.sin(emb), paddle.cos(emb)], axis=-1) |
|
|
| |
| if flip_sin_to_cos: |
| emb = paddle.concat([emb[:, half_dim:], emb[:, :half_dim]], axis=-1) |
|
|
| |
| if embedding_dim % 2 == 1: |
| emb = paddle.concat(emb, paddle.zeros([emb.shape[0], 1]), axis=-1) |
| return emb |
|
|
|
|
| class TimestepEmbedding(nn.Layer): |
| def __init__(self, in_channels: int, time_embed_dim: int, act_fn: str = "silu", out_dim: int = None): |
| super().__init__() |
|
|
| self.linear_1 = nn.Linear(in_channels, time_embed_dim) |
| self.act = None |
| if act_fn == "silu": |
| self.act = nn.Silu() |
| elif act_fn == "mish": |
| self.act = nn.Mish() |
|
|
| if out_dim is not None: |
| time_embed_dim_out = out_dim |
| else: |
| time_embed_dim_out = time_embed_dim |
| self.linear_2 = nn.Linear(time_embed_dim, time_embed_dim_out) |
|
|
| def forward(self, sample): |
| sample = self.linear_1(sample) |
|
|
| if self.act is not None: |
| sample = self.act(sample) |
|
|
| sample = self.linear_2(sample) |
| return sample |
|
|
|
|
| class Timesteps(nn.Layer): |
| def __init__(self, num_channels: int, flip_sin_to_cos: bool, downscale_freq_shift: float): |
| super().__init__() |
| self.num_channels = num_channels |
| self.flip_sin_to_cos = flip_sin_to_cos |
| self.downscale_freq_shift = downscale_freq_shift |
|
|
| def forward(self, timesteps): |
| t_emb = get_timestep_embedding( |
| timesteps, |
| self.num_channels, |
| flip_sin_to_cos=self.flip_sin_to_cos, |
| downscale_freq_shift=self.downscale_freq_shift, |
| ) |
| return t_emb |
|
|
|
|
| class GaussianFourierProjection(nn.Layer): |
| """Gaussian Fourier embeddings for noise levels.""" |
|
|
| def __init__( |
| self, embedding_size: int = 256, scale: float = 1.0, set_W_to_weight=True, log=True, flip_sin_to_cos=False |
| ): |
| super().__init__() |
| self.register_buffer("weight", paddle.randn((embedding_size,)) * scale) |
| self.log = log |
| self.flip_sin_to_cos = flip_sin_to_cos |
|
|
| if set_W_to_weight: |
| |
| self.register_buffer("W", paddle.randn((embedding_size,)) * scale) |
|
|
| self.weight = self.W |
|
|
| def forward(self, x): |
| if self.log: |
| x = paddle.log(x.cast(self.weight.dtype)) |
|
|
| x_proj = x[:, None] * self.weight[None, :] * 2 * np.pi |
|
|
| if self.flip_sin_to_cos: |
| out = paddle.concat([paddle.cos(x_proj), paddle.sin(x_proj)], axis=-1) |
| else: |
| out = paddle.concat([paddle.sin(x_proj), paddle.cos(x_proj)], axis=-1) |
| return out |
|
|
|
|
| class ImagePositionalEmbeddings(nn.Layer): |
| """ |
| Converts latent image classes into vector embeddings. Sums the vector embeddings with positional embeddings for the |
| height and width of the latent space. |
| |
| For more details, see figure 10 of the dall-e paper: https://arxiv.org/abs/2102.12092 |
| |
| For VQ-diffusion: |
| |
| Output vector embeddings are used as input for the transformer. |
| |
| Note that the vector embeddings for the transformer are different than the vector embeddings from the VQVAE. |
| |
| Args: |
| num_embed (`int`): |
| Number of embeddings for the latent pixels embeddings. |
| height (`int`): |
| Height of the latent image i.e. the number of height embeddings. |
| width (`int`): |
| Width of the latent image i.e. the number of width embeddings. |
| embed_dim (`int`): |
| Dimension of the produced vector embeddings. Used for the latent pixel, height, and width embeddings. |
| """ |
|
|
| def __init__( |
| self, |
| num_embed: int, |
| height: int, |
| width: int, |
| embed_dim: int, |
| ): |
| super().__init__() |
|
|
| self.height = height |
| self.width = width |
| self.num_embed = num_embed |
| self.embed_dim = embed_dim |
|
|
| self.emb = nn.Embedding(self.num_embed, embed_dim) |
| self.height_emb = nn.Embedding(self.height, embed_dim) |
| self.width_emb = nn.Embedding(self.width, embed_dim) |
|
|
| def forward(self, index): |
| emb = self.emb(index) |
|
|
| height_emb = self.height_emb(paddle.arange(self.height).reshape([1, self.height])) |
|
|
| |
| height_emb = height_emb.unsqueeze(2) |
|
|
| width_emb = self.width_emb(paddle.arange(self.width).reshape([1, self.width])) |
|
|
| |
| width_emb = width_emb.unsqueeze(1) |
|
|
| pos_emb = height_emb + width_emb |
|
|
| |
| pos_emb = pos_emb.reshape([1, self.height * self.width, -1]) |
|
|
| emb = emb + pos_emb[:, : emb.shape[1], :] |
|
|
| return emb |
|
|
