orthogonal direct sum造句
例句與造句
- where ?" is the orthogonal direct sum.
- Then " H " splits into an orthogonal direct sum of irreducible finite-dimensional unitary representations of " G ".
- Any projection-valued measure ? taking values in the projections of a separable Hilbert space is an orthogonal direct sum of homogeneous projection-valued measures:
- By Witt's decomposition theorem, every inner product space over a field is an orthogonal direct sum of a split space and an anisotropic space.
- Note that the definition does not depend on any choice of specific eigenvectors . is the orthogonal direct sum of the spaces where the index ranges over eigenvalues.
- It's difficult to find orthogonal direct sum in a sentence. 用orthogonal direct sum造句挺難的
- A similar result hold for finite orthogonal direct sums and extends to infinite orthogonal direct sums, using von Neumman's definition of the contraction operator between Hilbert spaces induces a contraction operator between the corresponding symmetric Fock spaces in a functorial way.
- A similar result hold for finite orthogonal direct sums and extends to infinite orthogonal direct sums, using von Neumman's definition of the contraction operator between Hilbert spaces induces a contraction operator between the corresponding symmetric Fock spaces in a functorial way.
- The "'Witt group of k "'is the abelian group " W " ( " k " ) of equivalence classes of non-degenerate symmetric bilinear forms, with the group operation corresponding to the orthogonal direct sum of forms.
- In particular, " L " 2 ( " G " ) decomposes into an orthogonal direct sum of all the irreducible unitary representations, in which the multiplicity of each irreducible representation is equal to its degree ( that is, the dimension of the underlying space of the representation ).
- For example, the space " H " can be decomposed as orthogonal direct sum of two " T " & ndash; invariant closed linear subspaces : the kernel of " T ", and the orthogonal complement of the kernel ( which is equal to the closure of the range of " T ", for any bounded self-adjoint operator ).