Inequalities of Hermite-Hadamard-Fejér type for convex functions and convex functions on the co-ordinates in a rectangle from the plane (Q946836)

A function \(f:[a,b]\times[c,d]\to{\mathbb R}\) is called \textit{convex on the coordinates} if for any \(y\in[c,d]\) the function \(F(\cdot,y):[a,b]\to]R\) is convex and for any \(x\in[a,b]\) the function \(F(x,\cdot):[c,d]\to]R\) is convex. It is shown that the weighted version of the Hermite-Hadamard inequality (Féjer inequality), i.e. \[ F\biggl(\frac{a+b}{2},\frac{c+d}{2}\biggr) \int_a^b\int_c^dg(x,y)\,dydx \leq\int_a^b\int_c^dF(x,y)g(x,y)\,dydx \] holds for \(F\) convex on the coordinates under some assumptions on the weight function~\(g\). The refinements of this inequality are given involving among others some mappings associated to convexity on the coordinates. The main results generalize known earlier results of this type.