Homology Operations in Symmetric Homology
Abstract
The symmetric homology of a unital associative algebra A over a commutative ground ring k, denoted HS*(A), is defined using derived functors and the symmetric bar construction of Fiedorowicz. In this paper we show that HS*(A) admits homology operations and a Pontryagin product structure making HS*(A) an associative commutative graded algebra. This is done by finding an explicit E∞ structure on the standard chain groups that compute symmetric homology.
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