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@@ -1,9 +1,7 @@
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## 12.4
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-
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$$
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-Jensen不等式:对任意凸函数f(x), 有 f(E(x)) \leq E(f(x))
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+f(E(x)) \leq E(f(x))
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$$
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-
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[推导]:显然,对于任意凸函数,必然有:
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$$
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f\left(\alpha x_{1}+(1-\alpha) x_{2}\right) \leq \alpha f\left(x_{1}\right)+(1-\alpha) f\left(x_{2}\right)
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@@ -27,12 +25,9 @@ f(E(x)) \leq \frac{1}{m} f\left(x_{1}\right)+\frac{1}{m} f\left(x_{2}\right)+\ld
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$$
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## 12.17
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-
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-若训练集$D$包含$m$个从分布$D$独立同分布采样而得的样例,$0<\varepsilon<1$,则对任意$h \in H$,有:
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$$
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P(|\hat{E}(h)-E(h)| \geq \varepsilon) \leq 2 e^{-2 m \varepsilon^{2}}
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$$
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-
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[推导]:已知Hoeffding不等式:若$x_{1}, x_{2} \ldots . . . x_{m}$为$m$个独立变量,且满足$0 \leq x_{i} \leq 1$ ,则对任意$\varepsilon>0$,有:
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$$
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P\left(\left|\frac{1}{m} \sum_{i}^{m} x_{i}-\frac{1}{m} \sum_{i}^{m} E\left(x_{i}\right)\right| \geq \varepsilon\right) \leq 2 e^{-2 m \varepsilon^{2}}
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@@ -56,8 +51,6 @@ P(|\hat{E}(h)-E(h)| \geq \varepsilon) \leq 2 e^{-2 m \varepsilon^{2}}
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$$
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## 12.18
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-
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-若训练集$D$包含$m$个从分布$D$上独立同分布采样而得的样例,$0<\varepsilon<1$,则对任意$h \in H$,式(12.18)以至少$1-\delta$的概率成立:
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$$
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\hat{E}(h)-\sqrt{\frac{\ln (2 / \delta)}{2 m}} \leq E(h) \leq \hat{E}(h)+\sqrt{\frac{\ln (2 / \delta)}{2 m}}
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$$
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@@ -82,8 +75,6 @@ $$
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以至少$1-\delta$的概率成立
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## 12.59
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-
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-给定从分布$D$上独立同分布采样得到的大小为$m$的示例集$D$,若学习算法$Ƹ$满足关于损失函数$l$的$\beta$-均匀稳定性,且损失函数$l$的上届为$M$,$0<\varepsilon<1$,则对任意$m\geq1$,以至少$1-\delta$的概率有:
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$$
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l(\varepsilon, D) \leq l_{l o o}(\overline{\varepsilon}, D)+\beta+(4 m \beta+M) \sqrt{ \frac{\ln (1 / \delta)}{2 m}}
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$$
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Sm1les