Torus equivariant algebraic models and compact realization
Abstract
Let be a compact torus. We prove that, up to equivariant rational equivalence, the category of -simply connected, -finite type -spaces with finitely many isotropy types is completely described by certain finite systems of commutative differential graded algebras with consistent choices of degree cohomology classes. We show that the algebraic systems corresponding to finite -CW-complexes are exactly those which satisfy the necessary condition imposed by the Borel localization theorem along with certain finiteness conditions. We derive an algebraic characterization of when an algebra over a polyonmial ring is realized as the rational equivariant cohomology of a finite -CW-complex. As further applications we prove that any GKM graph cohomology is realized by a finite -CW-complex and classify equivariant cohomology algebras of finite -CW-complexes with discrete fixed points.
Cite
@article{arxiv.2106.00363,
title = {Torus equivariant algebraic models and compact realization},
author = {Leopold Zoller},
journal= {arXiv preprint arXiv:2106.00363},
year = {2021}
}
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