Weak E2-Morita equivalences via quantization of the 1-shifted cotangent bundle

Abstract

In this paper, we investigate the structure of the convergent quantization of the 1-shifted cotangent bundle S of a smooth scheme X over a perfect field of positive characteristic. The quantization is an E2-algebra over the Frobenius twist S' of the 1-shifted cotangent bundle which restricted to the zero section X'→ S' is weakly E2-Morita equivalent to the structure sheaf OX' of the Frobenius twist X' of X. Explicitly, we show that the (∞,2)-category of coherent (left-)modules over OX' is equivalent to the full subcategory of the (∞,2)-category of coherent (left-)modules over the quantization restricted to the zero section generated by OX are equivalent.