Characterizations of spectra with <IMG ALIGN=BOTTOM HEIGHT=15 WIDTH=14>-injective cohomology which satisfy the Brown-Gitler property期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

Characterizations of spectra with -injective cohomology which satisfy the Brown-Gitler property

Authors:	David J Hunter Nicholas J Kuhn

Institution:	Department of Mathematics, University of Virginia, Charlottesville, Virginia 22903 ; Department of Mathematics, University of Virginia, Charlottesville, Virginia 22903

Abstract:	We work in the stable homotopy category of -complete connective spectra having mod homology of finite type. means cohomology with $\mathbf{Z}/p$ coefficients, and is a left module over the Steenrod algebra $\mathcal{A}$ . A spectrum is called spacelike if it is a wedge summand of a suspension spectrum, and a spectrum satisfies the Brown-Gitler property if the natural map $X,Z] \rightarrow \operatorname{Hom}_{\mathcal{A}}(H^(Z),H^(X))$ is onto, for all spacelike . It is known that there exist spectra satisfying the Brown-Gitler property, and with isomorphic to the injective envelope of in the category $\mathcal{U}$ of unstable $\mathcal{A}$ -modules. Call a spectrum standard if it is a wedge of spectra of the form $L \wedge T(n)$ , where is a stable wedge summand of the classifying space of some elementary abelian -group. Such spectra have $\mathcal{U}$ -injective cohomology, and all $\mathcal{U}$ -injectives appear in this way. Working directly with the two properties of stated above, we clarify and extend earlier work by many people on Brown-Gitler spectra. Our main theorem is that, if is a spectrum with $\mathcal{U}$ -injective cohomology, the following conditions are equivalent: (A) there exist a spectrum whose cohomology is a reduced $\mathcal{U}$ -injective and a map $X \rightarrow Y$ that is epic in cohomology, (B) there exist a spacelike spectrum and a map $X \rightarrow Z$ that is epic in cohomology, (C) $\epsilon:\Sigma^{\infty}\Omega^{\infty}X \rightarrow X$ is monic in cohomology, (D) satisfies the Brown-Gitler property, (E) is spacelike, (F) is standard. ( $M \in \mathcal{U}$ is reduced if it has no nontrivial submodule which is a suspension.) As an application, we prove that the Snaith summands of $\Omega^2S^3$ are Brown-Gitler spectra-a new result for the most interesting summands at odd primes. Another application combines the theorem with the second author's work on the Whitehead conjecture. Of independent interest, enroute to proving that (B) implies (C), we prove that the homology suspension has the following property: if an -connected space admits a map to an -fold suspension that is monic in mod homology, then $\epsilon: \Sigma^n\Omega^n X \rightarrow X$ is onto in mod homology.

Keywords:

	点击此处可从《Transactions of the American Mathematical Society》浏览原始摘要信息
	点击此处可从《Transactions of the American Mathematical Society》下载免费的PDF全文

设为首页 | 免责声明 | 关于勤云 | 加入收藏