The Hermite-Hadamard inequality on hypercuboid
Abstract
Given any a: = ( a1 ,a2 , … ,an ) and b: = ( b1 ,b2 , … ,bn ) in Rn. The n-fold convex function defined on [ a,b ], a,b ∈ Rn with a<b is a convex function in each variable separately. In this work we prove an inequality of Hermite-Hadamard type for n-fold convex functions. Namely, we establish the inequality align* f( a + b2 ) 1b - a∫ab f( x )dx 12n Σc f( c ), align* where Σc f( c ) : = Σ ci ∈ \ ai ,bi \1 i n f( c1, c2, … ,cn ). Some other related result are given.
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