bias 和 variance 的推导

最新推荐文章于 2022-03-20 22:12:34 发布

杲昃

最新推荐文章于 2022-03-20 22:12:34 发布

阅读量1.2k

点赞数

分类专栏： ESL 文章标签： bias

ESL 专栏收录该内容

8 篇文章

订阅专栏

本文详细解析了预测误差的偏差与方差分解原理，并通过k近邻算法为例具体说明了偏差与方差如何随参数变化。

摘要生成于 C知道，由 DeepSeek-R1 满血版支持，前往体验 >

参考博客ooon

假设 $X和Y 满足Y=X+\varepsilon$ ， $\varepsilon$ 是噪声， $\varepsilon \thicksim N(0,\delta_{\varepsilon}^2)$ 。
$f(X)是准确的预测函数，\hat{f}(X)是通过训练集训练的预测函数。$

E r r (x 0) = E [(y 0 - f^(x 0)) 2] = E [y 20 - 2 y 0 f^(x 0) + f^2 (x 0)] = E [y 20] - 2 E [y 0 f^(x 0)] + E [f^2 (x 0)] = E [y 20] - E 2 (y 0) + E 2 (y 0) - 2 E [y 0 f^(x 0)] + E [f^2 (x 0)] - E 2 (f^(x 0)) + E 2 (f^(x 0))

$\begin{align} Err(x_0)&=E[(y_0-\hat{f}(x_0))^2] \\ &=E[y_0^2-2y_0\hat{f}(x_0)+\hat{f}^2(x_0)] \\ &=E[y_0^2]-2E[y_0\hat{f}(x_0)]+E[\hat{f}^2(x_0)] \\ &=E[y_0^2]-E^2(y_0)+E^2(y_0)-2E[y_0\hat{f}(x_0)]+E[\hat{f}^2(x_0)] -E^2(\hat{f}(x_0))+E^2(\hat{f}(x_0))\\ \end{align}$

∵ E [y 0] = E [f (x 0 + ε)] = E (f (x 0)) V a r [y 0] = E [(y 0 - E [y 0]) 2] = E [(y 0 + ε - y 0) 2] = E [ε 2] V a r [X] = E [X 2] - E 2 [X]

$\begin{align} \because \ &E[y_0]=E[f(x_0+\varepsilon)]=E(f(x_0))\\ &Var[y_0]=E[(y_0-E[y_0])^2]=E[(y_0+\varepsilon-y_0)^2]=E[\varepsilon^2]\\ &Var[X]=E[X^2]-E^2[X] \end{align}$

∴ E r r (x 0) = [E [y 0] - E [f^(x 0)]] 2 + E [f^2 (x 0)] - E 2 (f^(x 0)) + V a r [ε] = [E [y 0] - E [f^(x 0)]] 2 + V a r [f^(x 0)] + V a r [ε] = B i a s 2 (f^(x 0)) + V a r [f^(x 0)] + δ 2 ε

$\begin{align} \therefore \ Err(x_0)&=[E[y_0]-E[\hat{f}(x_0)]]^2+E[\hat{f}^2(x_0)]-E^2(\hat{f}(x_0))+Var[\varepsilon]\\ &=[E[y_0]-E[\hat{f}(x_0)]]^2+Var[\hat{f}(x_0)]+Var[\varepsilon] \\ &=Bias^2(\hat{f}(x_0))+Var[\hat{f}(x_0)]+\delta_\varepsilon^2 \end{align}$

对于k近邻，其预测误差为:

E r r (x 0) = E [(Y - f^(x 0)) | X = x 0] = δ 2 ε + [f (x 0) - 1 k \sum i = 1 K f (x i)] 2 + δ 2 ϵ k

$\begin{align} Err(x_0)&=E[(Y-\hat{f}(x_0))|X=x_0] \\ &=\delta_\varepsilon^2+[f(x_0)-\frac{1}{k}\sum^K_{i=1}f(x_i)]^2+\frac{\delta_\epsilon^2}{k} \end{align}$

随着 $k$ 增大， $var$ 会减小，而 $bias$ 会增大。