The Monoid Structure on Homotopy Obstructions
Abstract
Let be a commutative noetherian ring, containing a field , with , , and let be a projective -module or . In continuation of \cite{MM}, we study Homotopy obstructions for to split off a free direct summand. Let be the set of all pairs , where is an ideal of and is a surjective map. The homotopy relations on , induced by , leads to a set of equivalence classes in . There are two distinguished elements , respectively, the images of and . Define the obstruction class . The following results are under suitable smoothness or regularity hypotheses. When , we prove . We prove, if , then has a natural structure of a monoid, which is a group if . Further, we give a definition of a Euler class group . Under suitable smoothness hypotheses, we prove, if and , then there is natural isomorphism of groups.
Cite
@article{arxiv.1612.00749,
title = {The Monoid Structure on Homotopy Obstructions},
author = {Satya Mandal and Bibekananda Mishra},
journal= {arXiv preprint arXiv:1612.00749},
year = {2019}
}
Comments
Simplified and naturalized the proof of additive structure in section 6. In fact, in the earlier version, the proof went to an unintended track