Abstract
We develop a homology theory for directed spaces, based on the semi-abelian category of (non-unital) associative algebras, which we show encodes essentially natural homology (Dubut et al. in Appl Categ Struct 25(5):775–807, 2017. https://doi.org/10.1007/s10485-016-9438-y) and some of the composition pairing that refines it (Calk et al. in Homol Homotopy Appl, 2021). The major ingredient is a simplicial algebra constructed from convolution algebras of certain trace categories of a directed space. We show that this directed homology HA is invariant under directed homeomorphisms, and is computable as a simple algebra quotient for HA1. We also show that the algebra structure for HAn, n≥2 is degenerate, through an Eckmann–Hilton argument. Finally we pave the way towards some interesting long exact sequences.
| Original language | English |
|---|---|
| Pages (from-to) | 271-299 |
| Number of pages | 29 |
| Journal | Journal of Applied and Computational Topology |
| Volume | 8 |
| Issue number | 2 |
| DOIs | |
| Publication status | Published - 1 Jun 2024 |
Keywords
- 55N35
- Associative algebras
- Directed topology
- Natural homology
- Semi-abelian categories