On the equality problem of generalized Bajraktarevi\'c means

Abstract

The purpose of this paper is to investigate the equality problem of generalized Bajraktarevi\'c means, i.e., to solve the functional equation equationE0* f(-1)(p1(x1)f(x1)+…+pn(xn)f(xn)p1(x1)+…+pn(xn))=g(-1)(q1(x1)g(x1)+…+qn(xn)g(xn)q1(x1)+…+qn(xn)), equation which holds for all x=(x1,…,xn)∈ In, where n≥ 2, I is a nonempty open real interval, the unknown functions f,g:I are strictly monotone, f(-1) and g(-1) denote their generalized left inverses, respectively, and p=(p1,…,pn):I+n and q=(q1,…,qn):I+n are also unknown functions. This equality problem in the symmetric two-variable (i.e., when n=2) case was already investigated and solved under sixth-order regularity assumptions by Losonczi in 1999. In the nonsymmetric two-variable case, assuming three times differentiability of f, g and the existence of i∈\1,2\ such that either pi is twice continuously differentiable and p3-i is continuous on I, or pi is twice differentiable and p3-i is once differentiable on I, we prove that E0 holds if and only if there exist four constants a,b,c,d∈R with ad≠ bc such that equation* cf+d>0, g=af+bcf+d,and q=(cf+d)p (∈\1,…,n\). equation* In the case n≥ 3, we obtain the same conclusion with weaker regularity assumptions. Namely, we suppose that f and g are three times differentiable, p is continuous and there exist i,j,k∈\1,…,n\ with i≠ j≠ k≠ i such that pi,pj,pk are differentiable.