On the Leopoldt conjecture on the p-adic regulators

In this paper, we examine the Iwasawa theory of elliptic cuves E with additive reduction at an odd prime p. By extending Perrin-Riou's theory to certain nonsemistable representations, we are able to convert Kato's zeta-elements into p-adic L-functions. This allows us to deduce the cotorsion of the S

Paul Seymour conjectured that any graph G of order n and minimum degree at least k k+1 n contains the k th power of a Hamilton cycle. We prove the following approximate version. For any > 0 and positive integer k, there is an n 0 such that, if G has order n ≥ n 0 and minimum degree at least ( k k+1

## Absttrct. Wx t-cfet to the p-adic genwl~rtitn sf ttrw~ transformations propcwd by Everett and Uam [ 2) , dnd remark that the case at onedimcnsional posirson space rs not included there. We g+c a study of cuch a case, tInding out some peculiar features in this paper WC shall point out particular