A proof of Przytycki's conjecture on n-relator 3-manifolds

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.

## Abstract Mader conjectured that every __k__‐critical __n__‐connected noncomplete graph __G__ has __2k__ + 2 pairwise disjoint fragments. The author in 9 proved that the conjecture holds if the order of __G__ is greater than (__k__ + 2)__n__. Now we settle this conjecture completely. © 2004 Wiley

For any positive integer k, a minimum degree condition is obtained which forces a graph to have k edge-disjoint cycles C 1 , C 2 , ..., C k such that V(C 1

Pawale, R.M. and S.S. Sane, A short p,oof of a conjecture on quasi-symmetric 2-designs, Discrete Mathematics 96 (1991) 71-74. It was conjettured by Sane and M.S. Shrikhande that the only nontrivial quasi-symmetric 3-design with the smaller block intersection number one is either the Witt 4-(23, 7,