On Kaplansky's Fifth Conjecture

Radford constructed two families of finite-dimensional pointed Hopf w x algebras over a field k R1, 5.1, and 5.2 . The first one, denoted by H , is a family of pointed Hopf algebras which contains a subfamily n, q, N, of self dual pointed Hopf algebras, denoted by H . This subfamily Ž N, , . w x gen

Kummer conjectured the asymptotic behavior of the first factor of the class number of a cyclotomic field. If we only ask for upper and lower bounds of the order of growth predicted by Kummer, then this modified Kummer conjecture is true for almost all primes.

This paper gives an improved lower bound on the degrees d such that for general points p 1 p n ∈ P 2 and m > 0 there is a plane curve of degree d vanishing at each p i with multiplicity at least m.

Ž . Ä < Let G be a finite group and N G s n g N G has a conjugacy class C, such < < 4 that C s n . Professor J. G. Thompson has conjectured that ''If G be a finite Ž . Ž . group with Z G s 1 and M a nonabelian simple group satisfying that N G s Ž . N M , then G ( M.'' We have proved that if M is a s

## Abstract C. Thomassen proposed a conjecture: Let __G__ be a __k__‐connected graph with the stability number α ≥ __k__, then __G__ has a cycle __C__ containing __k__ independent vertices and all their neighbors. In this paper, we will obtain the following result: Let __G__ be a __k__‐connected gr