English

Eigenfunctions and minimum 1-perfect bitrades in the Hamming graph

Combinatorics 2020-03-04 v1

Abstract

The Hamming graph H(n,q)H(n,q) is the graph whose vertices are the words of length nn over the alphabet {0,1,,q1}\{0,1,\ldots,q-1\}, where two vertices are adjacent if they differ in exactly one coordinate. The adjacency matrix of H(n,q)H(n,q) has n+1n+1 distinct eigenvalues n(q1)qin(q-1)-q\cdot i with corresponding eigenspaces Ui(n,q)U_{i}(n,q) for 0in0\leq i\leq n. In this work we study functions belonging to a direct sum Ui(n,q)Ui+1(n,q)Uj(n,q)U_i(n,q)\oplus U_{i+1}(n,q)\oplus\ldots\oplus U_j(n,q) for 0ijn0\leq i\leq j\leq n. We find the minimum cardinality of the support of such functions for q=2q=2 and for q=3q=3, i+j>ni+j>n. In particular, we find the minimum cardinality of the support of eigenfunctions from the eigenspace Ui(n,3)U_{i}(n,3) for i>n2i>\frac{n}{2}. Using the correspondence between 11-perfect bitrades and eigenfunctions with eigenvalue 1-1, we find the minimum size of a 11-perfect bitrade in the Hamming graph H(n,3)H(n,3).

Cite

@article{arxiv.2003.01571,
  title  = {Eigenfunctions and minimum 1-perfect bitrades in the Hamming graph},
  author = {Alexandr Valyuzhenich},
  journal= {arXiv preprint arXiv:2003.01571},
  year   = {2020}
}

Comments

14 pages, 4 figures

R2 v1 2026-06-23T14:02:10.408Z