English

Isoperimetric Sequences for Infinite Complete Binary Trees, Meta-Fibonacci Sequences and Signed Almost Binary Partitions

Combinatorics 2012-10-02 v1

Abstract

In this paper we demonstrate connections between three seemingly unrelated concepts. (1) The discrete isoperimetric problem in the infinite binary tree with all the leaves at the same level, T {\mathcal T}_{\infty}: The nn-th edge isoperimetric number δ(n)\delta(n) is defined to be minS=n,SV(T)(S,Sˉ)\min_{|S|=n, S \subset V({\mathcal T}_{\infty})} |(S,\bar{S})|, where (S,Sˉ)(S,\bar{S}) is the set of edges in the cut defined by SS. (2) Signed almost binary partitions: This is the special case of the coin-changing problem where the coins are drawn from the set {\pm (2^d - 1): d is a positive integer}. The quantity of interest is τ(n)\tau(n), the minimum number of coins necessary to make change for nn cents. (3) Certain Meta-Fibonacci sequences: The Tanny sequence is defined by T(n)=T(n1T(n1))+T(n2T(n2))T(n)=T(n{-}1{-}T(n{-}1))+T(n{-}2{-}T(n{-}2)) and the Conolly sequence is defined by C(n)=C(nC(n1))+C(n1C(n2))C(n)=C(n{-}C(n{-}1))+C(n{-}1{-}C(n{-}2)), where the initial conditions are T(1)=C(1)=T(2)=C(2)=1T(1) = C(1) = T(2) = C(2) = 1. These are well-known "meta-Fibonacci" sequences. The main result that ties these three together is the following: δ(n)=τ(n)=n+2+2min1kn(C(k)T(nk)k). \delta(n) = \tau(n) = n+ 2 + 2 \min_{1 \le k \le n} (C(k) - T(n-k) - k). Apart from this, we prove several other results which bring out the interconnections between the above three concepts.

Keywords

Cite

@article{arxiv.1210.0405,
  title  = {Isoperimetric Sequences for Infinite Complete Binary Trees, Meta-Fibonacci Sequences and Signed Almost Binary Partitions},
  author = {L. Sunil Chandran and Anita Das and Frank Ruskey},
  journal= {arXiv preprint arXiv:1210.0405},
  year   = {2012}
}

Comments

22 pages, 4 figures

R2 v1 2026-06-21T22:13:55.137Z