LOWER CONVEX ENVELOPE - Encyclopedia Information

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In mathematics, the lower convex envelope ${\breve {f}}$ of a function $f$ defined on an interval $[a,b]$ is defined at each point of the interval as the supremum of all convex functions that lie under that function, i.e.

{\breve {f}}(x)=\sup\{g(x)\mid g{\text{ is convex and }}g\leq f{\text{ over }}[a,b]\}.

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From Wikipedia, the free encyclopedia

In mathematics, the lower convex envelope ${\breve {f}}$ of a function $f$ defined on an interval $[a,b]$ is defined at each point of the interval as the supremum of all convex functions that lie under that function, i.e.

{\breve {f}}(x)=\sup\{g(x)\mid g{\text{ is convex and }}g\leq f{\text{ over }}[a,b]\}.

See also

This mathematical analysis–related article is a stub. You can help Wikipedia by expanding it.

Retrieved from " https://en.wikipedia.org/?title=Lower_convex_envelope&oldid=1024815506"

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All stub articles

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