神经网络学习笔记-03-循环神经网络-反向传播计算公式的证明

2024-04-12 22:04•Android•阅读 4963

本文是根据WildML的Recurrent Neural Networks Tutorial写的学习笔记。

原文的例子

原文中计划实现一个循环神经网络，用于发现自然语言句子中单词出现的模式，最终可以生成一些合理的句子。

数据来源
原文中，从网上下载了很多条句子（英文的）。
数据的前期处理
首先，统计了所有单词（包括标点符号）。
取出最常见的7997单词，并且编号，每个单词有一个token。
设置了3个特殊的token：
UNKNOWN_TOKEN：匹配没有在8000列表中的单词。
SENTENCE_START: 表示句子开始。
SENTENCE_END: 表示句子结束。
输入和输出
输入x的维度是8000，意味着可以接受的句子长度最大是8000。
输出y的维度是8000，和x一一对应。
下面是一个句子构造后的实际例子：

x:
SENTENCE_START what are n't you understanding about this ? !
[0, 51, 27, 16, 10, 856, 53, 25, 34, 69]
y:
what are n't you understanding about this ? ! SENTENCE_END
[51, 27, 16, 10, 856, 53, 25, 34, 69, 1]

理解：y的每n位是x前n位的期望输出。

每个输入\(X_t\)（尽管有8000维），只有一个维度有值且为1，代表第\(t\)的单词的token的维度。

比如：what的token是51。那么\(X_t\)只有第51位为1，其它都是0。

这个叫做one-hot vector。

输出：每个token的可能性。

state的维度是100。

预测公式和维度

\[s_t = tanh(x_tU + s_{t_1}W) \\ o_t = softmax(s_tV) \\ where \\ x_t.dimension = 8000 \\ o_t.dimension = 8000 \\ s_t.dimension = 100 \\ U.dimension = 100 * 8000 : x_tU \text{ is a 100 dimension vector} \\ W.dimension = 100 * 100 : s_{t-1}W \text{ is a 100 dimension vector} \\ V.dimension = 8000 * 100 : s_tV \text{ is a 8000 dimension vector} \]

初始化U,V,W
初始化很重要。跟激活函数（这里是tanh）有关。
U,V,W每个元素是一个位于区间\(\left [ -\sqrt{n}, \sqrt{n} \right ]\)的随机数。\(n\)是输入数的长度。

循环神经网络训练流程

反向传播(Back Propagation Through Time(BPTT))

训练的过程：

正向传播 - 根据设计的预测算法和初始\(V,U,W\)，得到计算结果\(\hat{y}\)。
计算损失 - 用计算结果\(\hat{y}\)和期望结果\(y\)，根据交叉熵方法(cross entropy loss) 可得到损失\(L\)。
反向传播 - 根据\(E\)和其它的已知值，计算出偏微分\({\partial{L} \over \partial{U}}, {\partial{L} \over \partial{V}}, {\partial{L} \over \partial{W}}\)。
梯度下降 - 根据偏微分结果，通过随机梯度下降算法(Stochastic Gradient Descent)，可以学习到新的\(V,U,W\)。

有上面可见，反向传播的算法是训练的关键。（因为其它步骤的计算方法都是已知的。）

反向传播的算法的目的是：计算预测算法权值的偏微分。

激活函数的微分

关于激活函数和损失函数微分的证明请看：

神经网络学习笔记 - 激活函数的作用、定义和微分证明

神经网络学习笔记 - 损失函数的定义和微分证明

sigmoid

sigmoid函数和其微分

\[\sigma(x) = \frac{1}{1 + e^{-x}} \\ \sigma'(x) = (1 - \sigma(x))\sigma(x) \]

tanh

tanh函数和其微分

\[\tanh(x) = \frac{e^{2x} - 1}{e^{2x} + 1} \\ tanh'(x) = 1 - tanh(x)^2 \]

softmax
激活函数softmax和损失函数会一起使用。
激活函数会根据输入的参数（一个矢量，表示每个分类的可能性），计算每个分类的概率(0, 1)。
损失函数根据softmax的计算结果\(\hat{y}\)和期望结果\(y\)，根据交叉熵方法(cross entropy loss) 可得到损失\(L\)。

softmax函数和其微分

\[\text{softmax:} \\ \hat{y_{t_i}} = softmax(o_{t_i}) = \frac{e^{o_{t_i}}}{\sum_{k}e^{o_{t_k}}} \\ \hat{y_t} = softmax(z_t) = \begin{bmatrix} \cdots & \frac{e^{o_{t_i}}}{\sum_{k}e^{o_{t_k}}} & \cdots \end{bmatrix} \\ \\ softmax'(z_t) = \frac{\partial{y_t}}{\partial{z_t}} = \begin{cases} \hat{y_{t_i}}(1 - \hat{y_{t_i}}), & \text{if } i = j \\ -\hat{y_{t_i}} \hat{y_{t_j}}, & \text{if } i \ne j \end{cases} \]

Loss function (cross entropy loss)

cross entropy loss函数

\[L_t(y_t, \hat{y_t}) = - y_t \log \hat{y_t} \\ L(y, \hat{y}) = - \sum_{t} y_t \log \hat{y_t} \\ \frac{ \partial L_t } { \partial z_t } = \hat{y_t} - y_t \\ \text{where} \\ z_t = s_tV \\ \hat{y_t} = softmax(z_t) \\ y_t \text{ : for training data x, the expected result y at time t. which are from training data} \]

训练数据过程中的公式

预测公式

预测公式和前面是一样的。为了方便反向传播的计算。我们写成这样：

\[s_t = tanh(x_tU + s_{t_1}W) \\ z_t = s_tV \\ \hat{y_t} = softmax(z_t) \\ where \\ s_{-1} = [0 \cdots 0] \]

损失函数

\[L_t(y_t, \hat{y_t}) = - y_t \log \hat{y_t} \\ L(y, \hat{y}) = - \sum_{t} y_t \log \hat{y_t} \\ \text{where} \\ y_t \text{ : for training data x, the expected result y at time t. which are from training data} \]

随机梯度下降函数(Stochastic Gradient Descent)

\[W_{new} = W - s * dW \\ where \\ s \text{ : step size, learning rate, a value between } (0, 1) \\ dW = \frac{\partial L}{\partial W} \text{ : W's descent, loss differentiation at W.} \\ \]

注：\(U,V,W\)的随机梯度下降是一样的。

关于learning rate, 有时会根据损失的变化情况，而改变。比如：如果损失变大了，说明上次的learning rate有点过了，因此，可将learning rate变成以前的十分之一。

计算V的偏微分

现在就只剩下求\(U,V,W\)的偏微分了。

计算公式

\[\frac{\partial L_t}{\partial V} = (\hat{y_t} - y_t) \otimes s_t \]

证明

\[\begin{align} \frac{\partial L_t}{\partial V} & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial V} \\ & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial z_t} \frac{\partial z_t}{\partial V} \\ & = \frac{\partial L_t}{\partial z_t} \frac{\partial z_t}{\partial V} \\ & \because \frac{\partial L_t}{\partial z_t} = (\hat{y_t} - y_t) \text{ : see cross entropy loss differential.} \\ & \because \frac{\partial z_t}{\partial V} = \frac{\partial (s_tV)}{\partial V} = s_t \\ & = (\hat{y_t} - y_t) \otimes s_t \end{align} \]

计算W的偏微分

计算公式

\[\frac{\partial L_t}{\partial W} = (\hat{y} - y) V (1 - s_t^2) \left ( s_{t-1} + W \frac{\partial (s_{t-1})}{\partial W} \right ) \\ \frac{\partial s_t}{\partial W} = (1 - s_t^2) \left ( s_{t-1} + W \frac{\partial (s_{t-1})}{\partial W} \right ) \]

证明

在计算\(L_t\)在\(W\)的偏微分前，我们需要先做一些辅助计算。

\[\begin{align} \frac{\partial s_t}{\partial W} & = \frac{\partial (tanh(x_tU + s_{t-1}W))}{\partial W} \\ & \because \text{tanh differentiation formula and the chain rule of differentiation} \\ & = (1 - s_t^2) \frac{\partial (x_tU + s_{t-1}W)}{\partial W} \\ & \because \text{sum rule of differentiation} \\ & = (1 - s_t^2) \frac{\partial (s_{t-1}W)}{\partial W} \\ & \because \text{product rule of differentiation} \\ & = (1 - s_t^2) \left ( \frac{\partial (s_{t-1})}{\partial W}W + s_{t-1}\frac{\partial W}{\partial W} \right ) \\ & = (1 - s_t^2) \left ( s_{t-1} + W \frac{\partial (s_{t-1})}{\partial W} \right ) \\ \end{align} \\ \because s_{t-1} \text{ is a function of W. we need to calculate the chain with the product rule of differentiation.} \]

\[\begin{align} \frac{\partial z_t}{\partial s_t} & = \frac{\partial (s_tV )}{\partial s_t} \\ & = V \end{align} \]

\[\begin{align} \frac{\partial L_t}{\partial W} & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial W} \\ & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial z_t} \frac{\partial z_t}{\partial W} \\ & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial z_t} \frac{\partial z_t}{\partial s_t} \frac{\partial s_t}{\partial W} \\ & = \frac{\partial L_t}{\partial z_t} \frac{\partial z_t}{\partial s_t} \frac{\partial s_t}{\partial W} \\ & = (\hat{y} - y) V \frac{\partial s_t}{\partial W} \\ & = (\hat{y} - y) V \prod_{k=0}^{t} ((1 - s_k^2) W) \\ \end{align} \]

计算U的偏微分

计算公式

\[\frac{\partial L_t}{\partial U} = (\hat{y} - y) V (1 - s_t^2) \left( x_t + W \frac{\partial s_{t-1}}{\partial U} \right ) \\ \frac{\partial s_t}{\partial U} = (1 - s_t^2) (x_t + W \frac{\partial s_{t-1}}{\partial U}) \]

证明

\[\begin{align} \frac{\partial s_t}{\partial U} & = \frac{\partial (tanh(x_tU + s_{t-1}W))}{\partial U} \\ & = (1 - s_t^2) (x_t + \frac{\partial (s_{t-1}W)}{\partial U}) \\ & = (1 - s_t^2) (x_t + W \frac{\partial s_{t-1}}{\partial U}) \\ \end{align} \\ \because s_{t-1} \text{ is a function of U. we need to calculate the chain.} \]

\[\begin{align} \frac{\partial L_t}{\partial U} & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial U} \\ & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial z_t} \frac{\partial z_t}{\partial U} \\ & = \frac{\partial L_t}{\partial \hat{y_t}} \frac{\partial \hat{y_t}}{\partial z_t} \frac{\partial z_t}{\partial s_t} \frac{\partial s_t}{\partial U} \\ & = \frac{\partial L_t}{\partial z_t} \frac{\partial z_t}{\partial s_t} \frac{\partial s_t}{\partial U} \\ & = (\hat{y} - y) V \frac{\partial s_t}{\partial U} \\ \end{align} \]