Theorema bipolare

Theorema bipolare in mathematica est theorema in explicatione convexa quod condiciones necessarias et satis adhibet ut conus aequet suum bipolare. Theorema bipolare videri potest proprius theorematis Fenchel-Moreauani casus.^[1]

In quaque copia non vacua, ${\displaystyle C\subset X}$ in nonnullo spatio lineari ${\displaystyle X}$, tum conus bipolaris ${\displaystyle C^{oo}=(C^o{)}^o}$ datur a

${\displaystyle C^{oo}=\mathrm{cl}(\mathrm{co}\{\lambda c:\lambda \ge 0,c\in C\})}$

ubi ${\displaystyle \mathrm{co}}$ corticem convexum denotat.^[1][2]

${\displaystyle C\subset X}$ est non vacuus conus convexus clausus si et solum si ${\displaystyle C^{++}=C^{oo}=C}$ cum ${\displaystyle C^{++}=(C^{+}{)}^{+}}$, ubi ${\displaystyle (\cdot {)}^{+}}$ denotat conum dualem positivum.^[2][3]

Generatim, si ${\displaystyle C}$ sit conus convexus, tum conus bipolaris datur a

${\displaystyle C^{oo}=\mathrm{cl}C.}$

Si ${\displaystyle f(x)=\delta (x|C)=\{\begin{array}{cc}0& \text{if }x\in C\\ +\mathrm{\infty }& \text{else}\end{array}}$ sit functio propria coni ${\displaystyle C}$, tum coniugatum convexum ${\displaystyle f^{*}(x^{*})=\delta (x^{*}|C^o)={\delta }^{*}(x^{*}|C)=\underset{x\in C}{\sup }⟨x^{*},x⟩}$ est functio firmamenti pro ${\displaystyle C}$, et ${\displaystyle f^{**}(x)=\delta (x|C^{oo})}$. Ergo, ${\displaystyle C=C^{oo}}$ si et solum si ${\displaystyle f=f^{**}}$.^[1][3]

Formula:Math-stipula