On subadditive functions upper bounded on a 'large' set

Abstract

The notion of a shift-compact set in an abelian topological group X plays a significant role in functional equations and inequalities, especially so since each Borel set that is not Haar-meagre, alternatively not Haar-null, is necessarily shift-compact for X completely metrizable (see BJ and BinO8). Although in general boundedness of a subadditive function does not imply its continuity, here we prove that each subadditive function f:X→ R (i.e. with the function satisfying f(x+y)≤ f(x)+f(y) for x,y∈ X) bounded above on a~shift-compact (non-Haar-null, non-Haar-meagre) set is locally bounded at each point of the domain. Our results refer to [Chapter~XVI]Kuczma and papers by N.H.~Bingham and A.J.~Ostaszewski BO,BinO1,BinO2,BinO6,BinO7.