Let g be any finite-dimensional odd Contact superalgebra over a field of prime characteristic.By means of determining the minimal dimensions of image spaces of certain inner superderivations, it is proved that the principal filtration of g is invariant under the automorphisms of g.Then, the parameters by which g is defined are proved to be intrinsic and thereby the odd Contact superalgebras are classified up to isomorphisms.Furthermore, the restrictedness of g is determined and the automorphism group of g in restrictedness case is proved to be isomorphic to the admissible automorphism group of the underlying superalgebra of g under a concrete isomorphism .Further properties of are given and as an application, the results above are used to discuss the p -characters of the irreducible representations for g.
Chen et al. (Sat,) studied this question.