This shows you the differences between two versions of the page.
Next revision | Previous revision | ||
world:max [2021/10/06 10:33] rdouc créée |
world:max [2022/03/16 07:40] (current) |
||
---|---|---|---|
Line 1: | Line 1: | ||
{{page>:defs}} | {{page>:defs}} | ||
- | \newcommand{\sgn}{\mathrm{sgn}} | + | $\newcommand{\sgn}{\mathrm{sgn}}$ |
+ | ====== Statement ====== | ||
Let $h (\beta)= (\beta -u)^2+c |\beta|$ where $u>0$. Show that the | Let $h (\beta)= (\beta -u)^2+c |\beta|$ where $u>0$. Show that the | ||
argmin of $h$ can be written as | argmin of $h$ can be written as | ||
Line 8: | Line 10: | ||
$$ | $$ | ||
- | The function $h$ is strictly convex and $\lim_{\beta \to \pm \infty} | + | ====== Proof ====== |
- | |h (x)|=\infty$. This implies that $h$ admits a unique minimizer | + | |
+ | The function $h$ is strictly convex and $\lim_{\beta \to \pm \infty}|h (x)|=\infty$. This implies that $h$ admits a unique minimizer | ||
$\beta^\star$. | $\beta^\star$. | ||
- | \begin{enumerate} | + | * **Case 1**: $\beta^\star\neq 0$, in which case $h' (\beta^\star)=0$. This implies $2 (\beta^\star-u)+c \sgn(\beta^\star)=0$. Therefore $2u=\sgn(\beta^\star)\lr{2|\beta^\star|+c}$, which implies $\sgn (u)=\sgn (\beta^\star)$. Therefore $2 (\beta^\star-u)+c \sgn(u)=0$ |
- | \item $\beta^\star\neq 0$, in which case $h' (\beta^\star)=0$. This | + | from which we deduce $\beta^\star=u \lr{1-\frac{c}{2|u|}}$. Using again $\sgn (u)=sgn (\beta^\star)$, we deduce $1-\frac{c}{2|u|}\geq 0$ and finally, |
- | implies $2 (\beta^\star-u)+c \sgn(\beta^\star)=0$. Therefore | + | $$ |
- | $2u=\sgn(\beta^\star)\lr{2|\beta^\star|+c}$, which implies $\sgn (u)= | + | |
- | \sgn (\beta^\star)$. Therefore $2 (\beta^\star-u)+c \sgn(u)=0$ | + | |
- | from which we deduce $\beta^\star=u \lr{1-\frac{c}{2|u|}}$. Using | + | |
- | again $\sgn (u)= | + | |
- | \sgn (\beta^\star)$, we deduce $1-\frac{c}{2|u|}\geq 0$ and finally, | + | |
- | $$ | + | |
\beta^\star=u \lr{1-\frac{c}{2|u|}}^+ | \beta^\star=u \lr{1-\frac{c}{2|u|}}^+ | ||
$$ | $$ | ||
- | \item $\beta^\star= 0$. In this case, for all $\beta \neq 0$, | + | * **Case 2**: $\beta^\star= 0$. In this case, for all $\beta \neq 0$, $h (\beta) \geq h (0)=u^2$, which is equivalent to $\beta^2-2 \beta u+c|\beta|\geq 0$. Dividing by $|\beta|$ and letting $\beta\to 0$, we get $-2 u\sgn(\beta)+c \geq 0$ which in turn implies $-2|u|+c\geq 0$. This shows $1-\frac{c}{2|u|}\leq 0$ and we therefore have again: |
- | $h (\beta) \geq h (0)=u^2$, which is equivalent to $\beta^2-2 \beta | + | $$ |
- | u+c|\beta|\geq 0$. Dividing by $|\beta|$ and letting $\beta\to 0$, we | + | |
- | get $-2 u\sgn(\beta)+c \geq 0$ which in turn implies | + | |
- | $-2|u|+c\geq 0$. This shows $1-\frac{c}{2|u|}\leq 0$ and we therefore have | + | |
- | again: | + | |
- | $$ | + | |
\beta^\star=0=u \lr{1-\frac{c}{2|u|}}^+ | \beta^\star=0=u \lr{1-\frac{c}{2|u|}}^+ | ||
- | $$ | + | $$ |
- | \end{enumerate} | + | |