Proof of a conjecture on multisets of hook numbers

In [ I ]I, Gandhi has stated the following conjecture on Genocchi numbl:rs: ## . z;(t~-I)~ . The meaning of the odd notation on the 1e:ft of (1) is as follows: write . . . C(k+n-1)2 ; then ## K(n+l,k)=k2K(n,k+lj-(k-l)2~(~~,k~ K(1,k)=k2-(k-1;j2 =2k--1 alId, af course, (1) is restated as (1')

## Abstract Jacobson, Levin, and Scheinerman introduced the fractional Ramsey function __r__~__f__~ (__a__~1~, __a__~2~, …, __a__~__k__~) as an extension of the classical definition for Ramsey numbers. They determined an exact formula for the fractional Ramsey function for the case __k__=2. In this

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

The aim of this paper is to show that for any n ¥ N, n > 3, there exist a, b ¥ N\* such that n=a+b, the ''lengths'' of a and b having the same parity (see the text for the definition of the ''length'' of a natural number). Also we will show that for any n ¥ N, n > 2, n ] 5, 10, there exist a, b ¥ N\