The embedding theorem is established for Z-graded transitive modular Lie superalgebras g = circle plus-1 <= i <= rg(i) satisfying the conditions:
(i) g(0) similar or equal to p(g-1) and g(0)-module g(-1) is isornorphic to the natural p(g(-1))-module;
(ii) dim g(1) = 2/3n(2n(2) + 1), where n = 1/2 dim g(-1).
In particular, it is proved that the finite-dimensional simple modular Lie superalgebras satisfying the conditions above are isornorphic to the odd Hamiltonian superalgebras. The restricted Lie superalgebras are also considered.

• 出版日期2007-10
• 单位哈尔滨师范大学; 东北师范大学