On the edge reconstruction of the characteristic and permanental polynomials of a simple graph

Abstract

As a variant of the Ulam's vertex reconstruction conjecture and the Harary's edge reconstruction conjecture, Cvetkovi\'c and Schwenk posed independently the following problem: Can the characteristic polynomial of a simple graph G with vertex set V be reconstructed from the characteristic polynomials of all subgraphs in \G-v|v∈ V\ for |V|≥ 3? This problem is still open. A natural problem is: Can the characteristic polynomial of a simple graph G with edge set E be reconstructed from the characteristic polynomials of all subgraphs in \G-e|e∈ E\? In this paper, we prove that if |V|≠ |E|, then the characteristic polynomial of G can be reconstructed from the characteristic polynomials of all subgraphs in \G-uv, G-u-v|uv∈ E\, and the similar result holds for the permanental polynomial of G. We also prove that the Laplacian (resp. signless Laplacian) characteristic polynomial of G can be reconstructed from the Laplacian (resp. signless Laplacian) characteristic polynomials of all subgraphs in \G-e|e∈ E\ (resp. if |V|≠ |E|).

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