例句與造句

1. This is simply not true for general operators on Hilbert spaces.
2. There is also an analogous spectral theorem for bounded normal operators on Hilbert spaces.
3. Given an operator on Hilbert space, consider the orbit of a point in under the iterates of.
4. Hilbert spaces are Banach spaces, so the above discussion applies to bounded operators on Hilbert spaces as well.
5. A bounded self adjoint operator on Hilbert space is, a fortiori, a bounded operator on a Banach space.
6. It's difficult to find operators on hilbert spaces in a sentence. 用operators on hilbert spaces造句挺難的
7. the Fredholm operators on Hilbert space \ mathcal H, is a classifying space for ordinary, untwisted K-theory.
8. A corresponding result holds for normal compact operators on Hilbert spaces . ( More generally, the compactness assumption can be dropped.
9. The minimax principle also generalizes to eigenvalues of positive self-adjoint operators on Hilbert spaces, where it is commonly used to study the Sturm Liouville problem.
10. During the same period, Hungarian polymath John von Neumann formulated the rigorous mathematical basis for quantum mechanics as the theory of linear operators on Hilbert spaces, as described in his likewise famous 1932 textbook.
11. This follows from the fact that if the sum is finite the spectrum will be finite or countable with the origin as limit point, and hence a compact operator ( see compact operator on Hilbert space ).
12. This article presents both cases concentrates on the general case of nuclear operators on Banach spaces; for more details about the important special case of nuclear ( = trace class ) operators on Hilbert space see the article on trace class operators.
13. In linear algebra and functional analysis, the "'min-max theorem "', or "'variational theorem "', or "'Courant & ndash; Fischer & ndash; Weyl min-max principle "', is a result that gives a variational characterization of compact Hermitian operators on Hilbert spaces.