matrix lie group造句
例句與造句
- As presented in this article, any Lie groups mentioned are matrix Lie groups.
- For a matrix Lie group, smooth vector fields can be locally represented in the corresponding Lie algebra.
- For every finite-dimensional matrix Lie algebra, there is a linear group ( matrix Lie group ) with this algebra as its Lie algebra.
- Since the Lie algebra associated with a Lie group is isomorphic to the group's tangent space at the identity, elements of the Lie algebra of a matrix Lie group are also matrices.
- In particular, in the case of matrix Lie groups, it follows, since is invertible, by the inverse function theorem that is a bi-analytic bijection in a neighborhood of in matrix space.
- It's difficult to find matrix lie group in a sentence. 用matrix lie group造句挺難的
- To put it another way, f ( A ) \, converges absolutely for every square matrix whose spectral radius is less than the radius of convergence of f around 0 and is uniformly convergent on any compact subsets of \ mathbb { M } _ n ( \ mathbb { C } ) satisfying this property in the matrix Lie group topology.