Summand minimality and asymptotic convergence of generalized Zeckendorf decompositions

Abstract

Given a recurrence sequence H, with Hn = c1 Hn-1 + … + ct Hn-t where ci ∈ N0 for all i and c1, ct ≥ 1, the generalized Zeckendorf decomposition (gzd) of m ∈ N0 is the unique representation of m using H composed of blocks lexicographically less than σ = (c1, …, ct). We prove that the gzd of m uses the fewest number of summands among all representations of m using H, for all m, if and only if σ is weakly decreasing. We develop an algorithm for moving from any representation of m to the gzd, the analysis of which proves that σ weakly decreasing implies summand minimality. We prove that the gzds of numbers of the form v0 Hn + … + v Hn- converge in a suitable sense as n ∞, furthermore we classify three distinct behaviors for this convergence. We use this result, together with the irreducibility of certain families of polynomials, to exhibit a representation with fewer summands than the gzd if σ is not weakly decreasing.