Augmented generalized happy functions

Abstract

An augmented happy function, S[c,b] maps a positive integer to the sum of the squares of its base-b digits and a non-negative integer c. A positive integer u is in a cycle of S[c,b] if, for some positive integer k, S[c,b]k(u) = u and for positive integers v and w, v is w-attracted for S[c,b] if, for some non-negative integer , S[c,b](v) = w. In this paper, we prove that for each c≥ 0 and b ≥ 2, and for any u in a cycle of S[c,b], (1) if b is even, then there exist arbitrarily long sequences of consecutive u-attracted integers and (2) if b is odd, then there exist arbitrarily long sequences of 2-consecutive u-attracted integers.