Sciweavers

EJC
2000

Further Investigations Involving Rook Polynomials With Only Real Zeros

14 years 7 days ago
Further Investigations Involving Rook Polynomials With Only Real Zeros
We study the zeros of two families of polynomials related to rook theory and matchings in graphs. One of these families is based on the cover polynomial of a digraph introduced by Chung and Graham ChGr . Another involves a version of the hit polynomial" of rook theory, but which applies to weighted matchings in non-bipartite graphs. For both of these families we prove a result which is analogous to a theorem of of the author, K. Ono, and D. G. Wagner, namely that for Ferrers boards the hit polynomial has only real zeros. We also show that for each of these families there is a general conjecture involving arrays of numbers satisfying inequalities which contains these theorems as special cases. We provide evidence for the truth of these conjectures by proving other special cases and discussing computational experiments.
James Haglund
Added 18 Dec 2010
Updated 18 Dec 2010
Type Journal
Year 2000
Where EJC
Authors James Haglund
Comments (0)