Subject: from darush.aghababayeedehkordi( my mail address changed From: "darush aghababayeedehkordi" Date: Mon, 9 Jul 2007 02:03:37 -0700 we designed a question how to compute homology of finit product of topological spaces enclosed above my attached file in above file we compute integral homology of meta abelian groups every homology funtor effects on a finite generated free group and every abelian group is a meta abelian group so that this is an answer to this question. ............................. 2. how to classify of meta abelian groups my relation with kiga break because my mail address changed. my comment based on classify variouse type of limit points every limmit point is a semi limmit or prelimmit or semi prelimmit ,...) so that this a way of classify of prime topological spaces ----------------------------------------------- hyperhomotopy and generalized homotopy theory my comment is every generalized homotopy is a hyperhomotopy but every hyper homotopy is not a hyper homotopy because every generalized homotopy is a generalized formulation of a formulas and every hyper homotopy is a hyper formulation of a formula ..................................................... 4.open problem from mark hovey finite generation of picard group on p-adics ring we consider to picard group as a super manifold. in this case strucutre of this group is obviousely ---------------------------------------------------------------------- mark hovey designed an open problem is it possible to extend classify idea in algebraic topology to variouse branch of mathematices if we classify of variouse type weaker form of open subsets this question has a negative answer for example every sg compact and semi compact are compact space homoogy of both are same in this case the homology fails. ----------------------------------------------------- please send me your comment about above questions and answer thank you. Integral homology of meta abelian groups.pdf Content-Type: application/pdf Content-Encoding: base64