Approximation of convex functions.

J. J. Koliha

doi:rae/1149860218

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Home > Journals > Real Anal. Exchange > Volume 29 > Issue 1 > Article

2003-2004 Approximation of convex functions.

J. J. Koliha

Author Affiliations +

J. J. Koliha¹
¹Department of Mathematics and Statistics, University of Melbourne

Real Anal. Exchange 29(1): 465-472 (2003-2004).

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Abstract

In this note we give an elementary proof that an arbitrary convex function can be uniformly approximated by a convex \cinf-function on any closed bounded subinterval of the domain. An interesting byproduct of our proof is a global equation for a polygonal (piecewise affine) function.