A functional inequality related to Domar's uniform boundedness theorem
Abstract
We study the functional inequality \[ f(r+s) g(r)+αf(s) (r,s>0). \] Here g:(0,∞)[0,∞) is a given decreasing function, α is a constant such that 0<α<1, and the problem is to determine whether the family of decreasing functions f:(0,∞)[0,∞) that satisfy this inequality is bounded above by some finite function on (0,∞) and, if so, to find bounds for this function. We present a solution to this problem, and use it to give a new proof of a theorem of Domar on the uniform boundedness of certain families of subharmonic functions, in addition obtaining explicit bounds.
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