Deformation Theory of En-Monoidal Categories

Abstract

In this paper, we prove that the naive deformation problem of an En-monoidal stable k-linear ∞-category C is a 2-proximate formal En+2-moduli problem, whose corresponding formal moduli problem is controlled by the non-unital En+2-algebra fib(EndZEn(C)(1)→ EndC(1)), where ZEn(C) is the En-center of C. If C is rigid monoidal and tamely compactly generated by unobstructible objects, then this naive deformation problem is equivalent to the formal moduli problem. We also prove a uniqueness theorem for formal deformations of certain formal moduli problems, which can be applied to the E1 and E2-monoidal deformation problems of Rep(G) for a reductive algebraic group G with a simple Lie algebra g=Te G. Finally, we show factorization homology is compatible with deformations.