English

Algebra of dimension theory

Algebraic Topology 2008-02-27 v1 General Topology Geometric Topology

Abstract

The dimension algebra of graded groups is introduced. With the help of known geometric results of extension theory that algebra induces all known results of the cohomological dimension theory. Elements of the algebra are equivalence classes dim(A)\dim(A) of graded groups AA. There are two geometric interpretations of those equivalence classes: \linebreak 1. For pointed CW complexes KK and LL, dim(H(K))=dim(H(L))\dim(H_\ast(K))=\dim(H_\ast(L)) if and only if the infinite symmetric products SP(K)SP(K) and SP(L)SP(L) are of the same extension type (i.e., SP(K)AE(X)SP(K)\in AE(X) iff SP(L)AE(X)SP(L)\in AE(X) for all compact XX). \linebreak 2. For pointed compact spaces XX and YY, dim(H(X))=dim(H(Y))\dim(\cal H^{-\ast}(X))=\dim(\cal H^{-\ast}(Y)) if and only if XX and YY are of the same dimension type (i.e., dimG(X)=dimG(Y)\dim_G(X)=\dim_G(Y) for all Abelian groups GG). Dranishnikov's version of Hurewicz Theorem in extension theory becomes dim(π(K))=dim(H(K))\dim(\pi_\ast(K))=\dim(H_\ast(K)) for all simply connected KK. The concept of cohomological dimension dimA(X)\dim_A(X) of a pointed compact space XX with respect to a graded group AA is introduced. It turns out dimA(X)0\dim_A(X)\leq 0 iff dimA(n)(X)n\dim_{A(n)}(X)\leq n for all nZn\in\Z. If AA and BB are two positive graded groups, then dim(A)=dim(B)\dim(A)=\dim(B) if and only if dimA(X)=dimB(X)\dim_A(X)=\dim_B(X) for all compact XX.

Keywords

Cite

@article{arxiv.math/0404331,
  title  = {Algebra of dimension theory},
  author = {Jerzy Dydak},
  journal= {arXiv preprint arXiv:math/0404331},
  year   = {2008}
}

Comments

To appear in TAMS