q-derivative operator proof for a conjecture of Melham

C. Reutenauer (Adv. in Math. 110 (1995), 234 246) has defined a new class of symmetric functions q \* indexed by partitions \*. He conjectures that for n 2, &q (n) is the sum of Schur symmetric functions. This paper provides a proof of his conjecture.

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 Q be a quiver with dimension vector α. We show that if the space of isomorphism classes of semisimple representations iss(Q, α) of Q of dimension vector α is not smooth, then the quotient map π : rep(Q, α) iss(Q, α) is not equidimensional. In other words, we prove the Popov Conjecture for the na

In [4], Garsia and Haiman [Electronic J. of Combinatorics 3, No. 2 (1996)] pose a conjecture central to their study of the Macdonald polynomials H + (x; q, t). For each + | &n one defines a certain determinant 2 + (X n , Y n ) in two sets of variables. The n! conjecture asserts that the vector space