This paper studies the universal first-order Massey product of a prefactorization algebra, which encodes higher algebraic operations on the cohomology. Explicit computations of these structures are carried out in the locally constant case, with applications to factorization envelopes on Rm and a compactification of linear Chern–Simons theory on R2×S1.
Universal First-Order Massey Product of a Prefactorization Algebra / Bruinsma, Simen; Schenkel, Alexander; Vicedo, Benoît. - In: COMMUNICATIONS IN MATHEMATICAL PHYSICS. - ISSN 0010-3616. - 405:9(2024). [10.1007/s00220-024-05084-6]
Universal First-Order Massey Product of a Prefactorization Algebra
Schenkel, Alexander;
2024-01-01
Abstract
This paper studies the universal first-order Massey product of a prefactorization algebra, which encodes higher algebraic operations on the cohomology. Explicit computations of these structures are carried out in the locally constant case, with applications to factorization envelopes on Rm and a compactification of linear Chern–Simons theory on R2×S1.File in questo prodotto:
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