Proof of a conjecture of Klve on permutation codes under the Chebychev distance

Abstract

Let d be a positive integer and x a real number. Let Ad, x be a d× 2d matrix with its entries ai,j=\ arrayll x\ \ & for \ 1≤slant j≤slant d+1-i, 1\ \ & for \ d+2-i≤slant j≤slant d+i, 0\ \ & for \ d+1+i≤slant j≤slant 2d. array . Further, let Rd be a set of sequences of integers as follows: Rd=\(1, 2,…, d)|1≤slant i≤slant d+i, 1≤slant i ≤slant d,\ and\ r≠ s\ for\ r≠ s\. and define d(x)=Σ∈ Rda1,1a2, 2… ad,d. In order to give a better bound on the size of spheres of permutation codes under the Chebychev distance, Klve introduced the above function and conjectured that d(x)=Σm=0dd m(m+1)d(x-1)d-m. In this paper, we settle down this conjecture positively.