Quantum Harmonic Analysis on Lattices and Gabor Multipliers

Abstract: We develop a theory of quantum harmonic analysis on lattices in R 2d . Convolutions of a sequence with an operator and of two operators are defined over a lattice, and using corresponding Fourier transforms of sequences and operators we develop a version of harmonic analysis for these objects. We prove analogues of results from classical harmonic analysis and the quantum harmonic analysis of Werner, including Tauberian theorems and a Wiener division lemma. Gabor multipliers from time-frequency analysis are des… Show more

“…Consequently, as it was pointed out in Refs. [6,24], for fixed S ∈ HS(R d ) with Weyl symbol a S ∈ L 2 (R 2d ) and lattice Λ in R 2d , the sequence {α λ (S)} λ∈Λ is a Riesz sequence in HS(R d ), i.e., a Riesz basis for V 2 S := span HS α λ (S) λ∈Λ , if and only if the sequence {T λ (a S )} λ∈Λ is a Riesz sequence in L 2 (R 2d ), i.e., a Riesz basis for the shift-invariant subspace V 2 a S in L 2 (R 2d ) generated by a S .…”

“…A necessary and sufficient condition for {α λ (S)} λ∈Λ to be a Riesz sequence in HS(R d ) is given in Ref. [24]. There, it is assumed that S ∈ B, a Banach space of continuous operators with Weyl symbol a S in the Feichtinger's algebra S 0 (R 2d ); in essence, B consists of trace class operators on L 2 (R d ) with a norm-continuous inclusion ι : B → T 1 (see the details in Refs.…”

“…With this norm, S 0 (R d ) is a Banach space of continuous functions and an algebra under multiplication and convolution; see the details in Refs. [16,19,24].…”

“…More information and details about these transforms, also valid in more general settings, can be found in Refs. [7,9,16,24,26].…”

“…4) the corresponding dualities S(R d ), S ′ (R d ) and S(R 2d ), S ′ (R 2d ) ; see, for instance, Refs. [16,24].…”

Sampling in $ \Lambda $-shift-invariant subspaces of Hilbert-Schmidt operators on $ L^2(\mathbb{R}^d) $

“…Consequently, as it was pointed out in Refs. [6,24], for fixed S ∈ HS(R d ) with Weyl symbol a S ∈ L 2 (R 2d ) and lattice Λ in R 2d , the sequence {α λ (S)} λ∈Λ is a Riesz sequence in HS(R d ), i.e., a Riesz basis for V 2 S := span HS α λ (S) λ∈Λ , if and only if the sequence {T λ (a S )} λ∈Λ is a Riesz sequence in L 2 (R 2d ), i.e., a Riesz basis for the shift-invariant subspace V 2 a S in L 2 (R 2d ) generated by a S .…”

“…A necessary and sufficient condition for {α λ (S)} λ∈Λ to be a Riesz sequence in HS(R d ) is given in Ref. [24]. There, it is assumed that S ∈ B, a Banach space of continuous operators with Weyl symbol a S in the Feichtinger's algebra S 0 (R 2d ); in essence, B consists of trace class operators on L 2 (R d ) with a norm-continuous inclusion ι : B → T 1 (see the details in Refs.…”

“…With this norm, S 0 (R d ) is a Banach space of continuous functions and an algebra under multiplication and convolution; see the details in Refs. [16,19,24].…”

“…More information and details about these transforms, also valid in more general settings, can be found in Refs. [7,9,16,24,26].…”

“…4) the corresponding dualities S(R d ), S ′ (R d ) and S(R 2d ), S ′ (R 2d ) ; see, for instance, Refs. [16,24].…”

Sampling in $ \Lambda $-shift-invariant subspaces of Hilbert-Schmidt operators on $ L^2(\mathbb{R}^d) $

Sampling in the Range of the Analysis Operator of a Continuous Frame Having Unitary Structure

What Does Sampling Theory Mean?