Derived Representation Schemes and Cyclic Homology
Yuri Berest, George Khachatryan, Ajay Ramadoss
TL;DR
This paper introduces the derived functor DRep_V(A) for affine representation schemes of associative algebras, extending classical trace maps to higher cyclic homology and exploring related derived representation functors.
Contribution
It constructs the derived functor DRep_V(A), extends trace maps to higher cyclic homology, and relates these to Van den Bergh's derived representation functor.
Findings
Construction of the derived functor DRep_V(A)
Extension of trace maps to higher cyclic homology
Analysis of operations on the homology of DRep_V(A)
Abstract
We describe the derived functor DRep_V(A) of the affine representation scheme Rep_V(A), parametrizing the representations of an associative k-algebra A on a finite-dimensional vector space V. We construct the characteristic maps Tr_V(A)_n: HC_n(A) \to H_n[DRep_V(A)], extending the canonical trace Tr_V(A): HC_0(A) \to k[Rep_V(A)] to the higher cyclic homology of the algebra A, and describe a related derived version of the representation functor introduced recently by M. Van den Bergh. We study various operations on the homology of DRep_V(A) induced by known operations on cyclic and Hochschild homology of A.
Peer Reviews
No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.
Videos
No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.
Taxonomy
TopicsHomotopy and Cohomology in Algebraic Topology · Algebraic structures and combinatorial models · Advanced Topics in Algebra