例句與造句

1. In particular, every linear semisimple Lie algebra is a subalgebra of \ mathfrak { sl }, the special linear Lie algebra.
2. Answers to these questions were first provided by Hermann Weyl and Richard Brauer as consequences of special linear Lie algebra \ mathfrak { sl } " n ":
3. *The subspace of the general linear Lie algebra \ mathfrak { gl } _ n ( F ) consisting of matrices of trace zero is a subalgebra, the special linear Lie algebra, denoted \ mathfrak { sl } _ n ( F ).
4. *The subspace of the general linear Lie algebra \ mathfrak { gl } _ n ( F ) consisting of matrices of trace zero is a subalgebra, the special linear Lie algebra, denoted \ mathfrak { sl } _ n ( F ).
5. Any Lie algebra is a linear Lie algebra in the sense that there is always a faithful representation of \ mathfrak { g } ( in fact, on a finite-dimensional vector space by Ado's theorem if \ mathfrak { g } is itself finite-dimensional .)
6. It's difficult to find linear lie algebra in a sentence. 用linear lie algebra造句挺難的
7. In four papers from the 1880s by Alfredo Capelli proved, in different terminology, what is now known as the Poincar? Birkhoff Witt theorem in the case of L = \ mathfrak { gl } _ n,, the General linear Lie algebra; while Poincar?later stated it more generally in 1900.
8. If \ mathfrak { g } is a linear Lie algebra ( a Lie subalgebra of the Lie algebra of endomorphisms of a finite-dimensional vector space " V " ) over an algebraically closed field, then any Cartan subalgebra of \ mathfrak { g } is the centralizer of a maximal nilpotent ( Engel's theorem ), but then its Killing form is identically zero, contradicting semisimplicity.