T. Kotek
Published 2009-05-12, updated 2010-06-20Version 4
The reconstruction conjecture has remained open for simple undirected graphs since it was suggested in 1941 by Kelly and Ulam. In an attempt to prove the conjecture, many graph invariants have been shown to be reconstructible from the vertex-deleted deck, and in particular, some prominent graph polynomials. Among these are the Tutte polynomial, the chromatic polynomial and the characteristic polynomial. We show that the interlace polynomial, the U -polynomial, the universal edge elimination polynomial xi and the colored versions of the latter two are reconstructible.
Journal: Electronic Notes in Discrete Mathematics, Volume 34 (2009), pp. 375-379
Graph polynomials and their applications I: The Tutte polynomial
The $\barĪ³$-frame for Tutte polynomials of matroids
Generalized Bijective Maps between $G$-Parking Functions, Spanning Trees, and the Tutte Polynomial
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