English

Straight homotopy invariants

Algebraic Topology 2014-05-30 v2

Abstract

Let XX and YY be spaces and MM be an abelian group. A homotopy invariant f ⁣:[X,Y]Mf\colon [X,Y]\to M is called straight if there exists a homomorphism F ⁣:L(X,Y)MF\colon L(X,Y)\to M such that f([a])=F(a)f([a])=F(\langle a\rangle) for all aC(X,Y)a\in C(X,Y). Here a ⁣:XY\langle a\rangle\colon\langle X\rangle\to\langle Y\rangle is the homomorphism induced by aa between the abelian groups freely generated by XX and YY and L(X,Y)L(X,Y) is a certain group of `admissible' homomorphisms. We show that all straight invariants can be expressed through a `universal' straight invariant of homological nature.

Keywords

Cite

@article{arxiv.1405.0396,
  title  = {Straight homotopy invariants},
  author = {S. S. Podkorytov},
  journal= {arXiv preprint arXiv:1405.0396},
  year   = {2014}
}

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Minor changes

R2 v1 2026-06-22T04:04:41.212Z