Numbers and the Heights of their Happiness

Abstract

A generalized happy function, Se,b maps a positive integer to the sum of its base b digits raised to the eth power. We say that x is a base b, e power, height h, u attracted number if h is the smallest positive integer so that She,b(x)=u. Happy numbers are then base 10, 2 power, 1 attracted numbers of any height. Let σh,e,b(u) denote the smallest height h, u attracted number for a fixed base b and exponent e and let g(e) denote the smallest number so that every integer can be written as x1e+x2e+...+xg(e)e for some nonnegative integers x1,x2,...,xg(e). In this paper we prove that if pe,b is the smallest nonnegative integer such that bpe,b>g(e), d= g(e)+11-(b-2b-1)e+e+pe,b, and σh,e,b(u)≥ bd, then Se,b(σh+1,e,b(u))=σh,e,b(u).