On the edge reconstruction of six digraph polynomials

Abstract

Let G=(V,E) be a digraph having no loops and no multiple arcs, with vertex set V=\v1,v2,…,vn\ and arc set E=\e1,e2,…,em\. Denote the adjacency matrix and the vertex in-degree diagonal matrix of G by A=(aij)n× n and D=diag(d+(v1),d+(v2),·s,d+(vn)), where aij=1 if (vi,vj)∈ E(G) and aij=0 otherwise, and d+(vi) is the number of arcs with head vi. Set f1(G;x)=(xI-A), f2(G;x)=(xI-D+A),f3(G;x)=(xI-D-A),f4(G;x)= per(xI-A), f5(G;x)= per(xI-D+A),f6(G;x)= per(xI-D-A), where (X) and per(X) denote the determinant and the permanent of a square matrix X, respectively. In this paper, we consider a variant of the Ulam's vertex reconstruction conjecture and the Harary's edge reconstruction conjecture, and prove that, for any 1≤ i≤ 6, equation* (m-n)fi(G;x)+xfi'(G;x)=Σe∈ Efi(G-e;x), equation* which implies that if m≠ n, then fi(G;x) can be reconstructed from \fi(G-e;x)|e∈ E\.