English

Idempotent functors that preserve cofiber sequences and split suspensions

Algebraic Topology 2014-10-01 v2

Abstract

We show that an ff-localization functor LfL_f commutes with cofiber sequences of (N1)(N-1)-connected finite complexes if and only if its restriction to the collection of (N1)(N-1)-connected finite complexes is RR-localization for some unital subring R\sseqQR\sseq\mathbb{Q}. This leads to a homotopy-theoretical characterization of the rationalization functor: the restriction of LfL_f to simply-connected spaces (not just the finite complexes) is rationalization if and only if Lf(S2)L_f(S^2) is nontrivial and simply-connected, LfL_f preserves cofiber sequences of simply-connected finite complexes, and for each simply-connected finite complex KK, \skLf(K)\s^k L_f(K) splits as a wedge of copies of Lf(Sn)L_f(S^n) for large enough kk and various values of nn.

Cite

@article{arxiv.1205.2140,
  title  = {Idempotent functors that preserve cofiber sequences and split suspensions},
  author = {Jeffrey Strom},
  journal= {arXiv preprint arXiv:1205.2140},
  year   = {2014}
}

Comments

10 pages

R2 v1 2026-06-21T21:01:13.559Z