Derivations for the even part of the Hamiltonian superalgebra in positive characteristic

Abstract

In this paper we consider the derivations for even part of the finite-dimensional Hamiltonian superalgebra H over a field of prime characteristic. We first introduce an ideal N of H0 and show that the derivation space from H0 into W0 can be obtained by the derivation space from N into W0, the even part of the generalized Witt superalgebra W. For further application we also give the generating set of the ideal N. Then we describe three series of exceptional derivations from H0 into W0. Finally, we determine all the derivations vanishing on the non-positive Z-graded part of H0, the odd Z-homogeneous derivations, and negative Z-homogeneous derivations from H0 into W0.

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