hilbert space การใช้

• Qutrits require a Hilbert space of higher dimension, namely H _ 3.
• The Hilbert space of physical states is a unitary Hamiltonian be nonnegative.
• Other interpretations may instead define the state by the corresponding Hilbert space.
• Separable Hilbert space represent quantum propositions and behave as an orthocomplemented lattice.
• Even more generally, can be a vector in a complex Hilbert space.
• An isometry exists between the Hilbert spaces associated with these two kernels:
• The construction may also be extended to Banach spaces and Hilbert spaces.
• On a Hilbert space of analytic functions and an associated integral transform.
• Every orthonormal basis in a separable Hilbert space is a Schauder basis.
• Not all functions of interest are elements of some Hilbert space, say.
• His specialty is functional analysis, particularly bounded operators on a Hilbert space.
• Usually that refers to which is a Hilbert space, or to and.
• Quotiening out degeneracy and taking the completion gives a Hilbert space
• A Banach space finitely representable in  ! 2 is a Hilbert space.
• In a Hilbert space can be extended to subspaces of any finite dimensions.
• Let the resulting Hilbert space be denoted by " V ".
• The construction may also be extended to cover Banach spaces and Hilbert spaces.
• Another area where this formulation is used is in Hilbert spaces.
• These POVMs can be created by extending the two-dimensional Hilbert space.
• Positive definite kernels provide a framework that encompasses some basic Hilbert space constructions.