岩 瀬 則 夫 (いわせ のりお)
郵便宛て先:〒819-0395 福岡市 西区 元岡744 九州大学 数理学研究院
電子メール:iwase_AT_math.kyushu-u.ac.jp
Authors.
Cristina Costoya and myself
Journal.
Proc. Edinb. Math. Soc., 58 (2015), 323-332.
Abstract.
Apart from simply-connected spaces, a non simply-connected co-H-space is a typical example of a space X with a co-action of Bπ1(X) along rX : X → Bπ1(X) the classifying map of the universal covering. If such a space X is actually a co-H-space, then the fibrewise p-localization of rX (or the `almost' p-localization of X) is a fibrewise co-H-space (or an `almost' co-H-space, resp.) for every prime p. In this paper, we show that the converse statement is true, i.e., for a non simply-connected space X with a co-action of Bπ1(X) along rX, X is a co-H-space if, for every prime p, the almost p-localization of X is an almost co-H-space.
- Co-H-spaces and almost localization (adobe-pdf file, 385KB)