Added elementary facts about conve functions.
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src/fa/convex/def.tex
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src/fa/convex/def.tex
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\section{Convexity}
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\label{section:convex-functions}
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\begin{definition}[Epigraph]
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\label{definition:epigraph}
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Let $E$ be a vector space over $\real$, $A \subset E$ be convex, and $f: A \to (-\infty, \infty]$, then the \textbf{epigraph} of $f$ is the set
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\[
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\text{epi}(f) = \bracs{(x, y) \in A \times \real| y \ge f(x)}
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\]
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\end{definition}
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\begin{definition}[Convex Function]
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\label{definition:convex-function}
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Let $E$ be a vector space over $\real$, $A \subset E$ be convex, and $f: A \to (-\infty, \infty]$, then the following are equivalent:
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\begin{enumerate}
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\item For every $x, y \in E$ and $t \in [0, 1]$,
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\[
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f((1 - t)x + ty) \le (1 - t)f(x) + tf(y)
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\]
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\item $\text{epi}(f)$ is convex.
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\end{enumerate}
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If the above holds, then $f$ is \textbf{convex}.
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\end{definition}
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\begin{proof}
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(1) $\Rightarrow$ (2): Let $(x, \alpha), (y, \beta) \in \text{epi}(f)$ and $t \in [0, 1]$, then
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\begin{align*}
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(1 - t)\alpha + t\beta &\ge (1 - t)f(x) + tf(y) \\
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&\ge f((1 - t)x + ty)
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\end{align*}
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so $((1 - t)x + ty, (1 - t)\alpha + t\beta) \in \text{epi}(f)$.
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(2) $\Rightarrow$ (1): Let $x, y \in A$ and $t \in [0, 1]$, then
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\[
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((1 - t)x + ty, (1 - t)f(x) + tf(y)) \in \text{epi}(f)
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\]
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so $f((1 - t)x + ty) \le (1 - t)f(x) + tf(y)$.
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\end{proof}
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\begin{lemma}
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\label{lemma:convex-reverse}
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Let $E$ be a vector space over $\real$, $A \subset E$ be convex, and $f: A \to (-\infty, \infty]$ be convex, then for any $x, y \in E$ and $t \in \real \setminus [0, 1]$ such that $(1 - t)x + ty \in A$,
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\[
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f((1 - t)x + ty) \ge (1 - t)f(x) + tf(y)
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\]
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\end{lemma}
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\begin{proof}
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Via an affine transformation, assume without loss of generality that $x = 0$ and $f(x) = 0$. By exchanging $x$ and $y$, assume without loss of generality that $t > 1$. In which case, since $f$ is convex and $y = t^{-1}ty$, $f(y) \le t^{-1}f(ty)$ and $tf(y) \le f(ty)$.
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\end{proof}
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\begin{proposition}
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\label{proposition:convex-extension}
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Let $E$ be a vector space over $\real$ and $A \subset E$ be convex, then:
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\begin{enumerate}
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\item For any $f, g: A \to (-\infty, \infty]$ convex and $\lambda \ge 0$, $\lambda f + g$ is convex.
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\item For any convex functions $\cf \subset (-\infty, \infty]^A$, $\sup_{f \in \cf}f$ is convex.
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\end{enumerate}
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\end{proposition}
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4
src/fa/convex/index.tex
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src/fa/convex/index.tex
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\chapter{Convex Functions}
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\label{chap:convex-functions}
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\input{./def.tex}
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@@ -4,6 +4,7 @@
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\input{./tvs/index.tex}
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\input{./lc/index.tex}
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\input{./convex/index.tex}
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\input{./norm/index.tex}
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\input{./rs/index.tex}
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\input{./lp/index.tex}
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@@ -8,6 +8,7 @@
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$\sigma(\mathcal{E})$ & $\sigma$-algebra generated by $\mathcal{E}$. & \autoref{definition:generated-sigma-algebra} \\
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$\lambda(\mathcal{E})$ & $\lambda$-system generated by $\mathcal{E}$. & \autoref{definition:generated-lambda-system} \\
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$\sigma \otimes \tau$ & Product of ideals. & \autoref{definition:product-ideal} \\
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$\text{epi}(f)$ & Epigraph of $f$. & \autoref{definition:epigraph} \\
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% ---- Measure Theory ----
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$\mathcal{B}_X$ & Borel $\sigma$-algebra on $X$. & \autoref{definition:borel-sigma-algebra} \\
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$\sigma(\{f_i \mid i \in I\})$ & $\sigma$-algebra generated by the maps $\{f_i\}$. & \autoref{definition:generated-sigma-algebra-function} \\
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Let $X$ be a topological space, $f: X \to (-\infty, \infty]$, and $g: X \to [-\infty, \infty)$, then $f$ is \textbf{lower semicontinuous} if for each $a \in \real$, $\bracs{f > \alpha}$ is open, and $g$ is \textbf{upper semicontinuous} if for each $a \in \real$, $\bracs{f < \alpha}$ is open.
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\end{definition}
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\begin{proposition}
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\label{proposition:lsc-epigraph}
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Let $X$ be a topological space, $f: X \to (-\infty, \infty]$, then $f$ is lower semicontinuous if and only if $\text{epi}(f)$ is closed.
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\end{proposition}
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\begin{proof}
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Suppose that $f$ is lower semicontinuous. Let $x \in X$ and $y \in (-\infty, \infty)$ with $y < f(x)$, and $\alpha \in (y, f(x))$, then $\bracs{f > \alpha} \in \cn^o_A(x)$, and hence $\bracs{f > \alpha} \times (-\infty, \alpha)$ is a neighbourhood of $(x, y)$ contained in the complement of $\text{epi}(f)$. Therefore $\text{epi}(f)$ is closed.
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Now suppose that $\text{epi}(f)$ is closed, then for each $\alpha \in (-\infty, \infty)$,
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\[
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\bracs{f \le \alpha} = \pi_1[\text{epi}(f) \cap A \times \bracs{\alpha}]
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\]
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which is closed. Therefore $f$ is lower semicontinuous.
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\end{proof}
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\begin{proposition}[{{\cite[Proposition 7.11]{Folland}}}]
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\label{proposition:semicontinuous-properties}
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Let $X$ be a topological space, then
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