highest weight vector造句
例句与造句
- Given an irreducible finite-dimensional representation with highest weight vector of weight, the stabilizer of in is a closed subgroup.
- where is a highest weight vector and J ^ a _ k the conserved current associated with the affine generator t ^ a.
- The vector is also a highest weight vector for the copy of corresponding to, so it is annihilated by the lowering operator generating if 0 } }.
- The Weyl group " W " acts on the weights of " V ", and the conjugates " w " ? of the highest weight vector ? under this action are the extremal weights, whose weight spaces are all 1-dimensional.
- In terms of representation theory, modular forms correspond roughly to highest weight vectors of certain discrete series representations of SL 2 ( "'R "'), while almost holomorphic or quasimodular forms correspond roughly to other ( not necessarily highest weight ) vectors of these representations.
- It's difficult to find highest weight vector in a sentence. 用highest weight vector造句挺难的
- GVM's are highest weight modules and their highest weight ? is the highest weight of the representation V . If v _ \ lambda is the highest weight vector in V, then 1 \ otimes v _ \ lambda is the highest weight vector in M _ { \ mathfrak { p } } ( \ lambda ).
- GVM's are highest weight modules and their highest weight ? is the highest weight of the representation V . If v _ \ lambda is the highest weight vector in V, then 1 \ otimes v _ \ lambda is the highest weight vector in M _ { \ mathfrak { p } } ( \ lambda ).
- Verma modules have a very important property : If V is any representation generated by a highest weight vector of weight \ lambda, there is a surjective \ mathfrak { g }-homomorphism M _ \ lambda \ to V . That is, all representations with highest weight \ lambda that are generated by the highest weight vector ( so called highest weight modules ) are quotients of M _ \ lambda.
- Verma modules have a very important property : If V is any representation generated by a highest weight vector of weight \ lambda, there is a surjective \ mathfrak { g }-homomorphism M _ \ lambda \ to V . That is, all representations with highest weight \ lambda that are generated by the highest weight vector ( so called highest weight modules ) are quotients of M _ \ lambda.