Heisenberg order of differential operators on the superspaces R2l+1|n

Abstract

We study in this paper, the existence of tree types of filtrations of the space Dλμ(2l+1|n) of differential operators on the superspaces 2l+1|n endowed with the standard contact structure α. On this space Dλμ(2l+1|n), we have the first filtration called canonical and because of the existence of the contact structure on superspaces 2l+1|n we obtain the second filtration on the space Dλμ(2l+1|n) called filtration of Heisenberg and thus the space Dλμ(2l+1|n) is therefore denoted by Hλμ(2l+1|n). We have also a new filtration induced on Dλμ(2l+1|n) by the two filtrations and it calls bifiltration. Explicitly, the space Dλμ(2l+1|n) of differential operators is filtered canonically by the order of its differential operators and the order is k∈ . When it is filtered by order of Heisenberg, the order of any differential operator is equal to d∈12. This study is the generalization, in super case, of the model studied by C.H.Conley and V.Ovsienko in CoOv12. Finally, we show that the (2l+2|n)-module structure on the space Dλμ(2l+1|n) of differential operators is induced on the space Hλμ(2l+1|n) and therefore on the associated space Sδ(2l+1|n) of normal symbols, on the space Pδ(2l+1|n) of symbols of Heisenberg and on the space of fine symbol δ(2l+1|n).