A New Proof of a Conjecture of Antoniadis

Let P(G, \*) denote the chromatic polynomial of a graph G. It is proved in this paper that for every connected graph G of order n and real number \* n, (\*&2) n&1 P(G, \*)&\*(\*&1) n&2 P(G, \*&1) 0. By this result, the following conjecture proposed by Bartels and Welsh is proved: P(G, n)(P(G, n&1))

Simion had a unimodality conjecture concerning the number of lattice paths in a rectangular grid with the Ferrers diagram of a partition removed. Hildebrand recently showed the stronger result that these numbers are log concave. Here we present a simple proof of Hildebrand's result.

A tree T is said to be bad, if it is the vertex-disjoint union of two stars plus an edge joining the center of the first star to an end-vertex of the second star. A tree T is good, if it is not bad. In this article, we prove a conjecture of Alan Hartman that, for any spanning tree T of K 2m , where

Let \(M_{n}\) be the Minkowski fundamental domain for the space of \(n \times n\) real, symmetric, and positive definite matrices under the action of the unimodular group \(S L_{n}(Z)\). C. L. Siegel conjectured that \(d(A, B)-f(A, B) \leqslant C(n)\), for \(A, B \in M_{n}\), where \(d\) and \(f\) a