The fine (2|n)-equivariant quantizations on the super circles S1|n

Abstract

In this paper, we generalize the known results on the super circles S1|1 and S1|2. We construct the fine equivariant quantization on the super circle S1|n for n≥slant 3. The equivariant Lie superalgebra is (2|n) which is constituted of the contact projective vector fields on S1|n. In order to construct the fine equivariant quantization on S1|n, we use the model developed, in the purely even case, by Charles H. Conley and Valentin Ovsienko in [Linear Differential Operators on Contact manifolds, http://www.arxiv:math-Ph/1205.6562v1,24p, 2012]. We also use the technical of Casimir operators to prove the uniqueness of the fine quantization on S1|n. The technical of Casimir operators used here is the same as the one used by P. Mathonet and F. Radoux in [Lett. Math. Phys. 98 (2011),311-331] to prove the existence of a (p+1|q)-equivariant quantization on p|q.