Chang Eon Shin scite author profile

Let p , 1 p ∞, be the space of all p-summable sequences and C a be the convolution operator associated with a summable sequence a. It is known that the p -stability of the convolution operator C a for different 1 p ∞ are equivalent to each other, i.e., if C a has p -stability for some 1 p ∞ then C a has q -stability for all 1 q ∞. In the study of spline approximation, wavelet analysis, time-frequency analysis, and sampling, there are many localized operators of non-convolution type whose stability is one of the basic assumptions. In this paper, we consider the stability of those localized operators including infinite matrices in the Sjöstrand class, synthesis operators with generating functions enveloped by shifts of a function in the Wiener amalgam space, and integral operators with kernels having certain regularity and decay at infinity. We show that the p -stability (or L p -stability) of those three classes of localized operators are equivalent to each other, and we also prove that the left inverse of those localized operators are well localized.

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Polynomial control on stability, inversion and powers of matrices on simple graphs

Shin

Sun

2019

Journal of Functional Analysis

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Stability of Localized Integral Operators on Normal Spaces of Homogeneous Type

Fang

Shin

2019

Numerical Functional Analysis and Optimization

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Stability of Localized Integral Operators on WeightedL^pSpaces

Rim

Shin

Sun

2012

Numerical Functional Analysis and Optimization

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Abstract. In this paper, we consider localized integral operators whose kernels have mild singularity near the diagonal and certain Hölder regularity and decay off the diagonal. Our model example is the Bessel potential operator J γ , γ > 0. We show that if such a localized integral operator has stability on a weighted function space L p w for some p ∈ [1, ∞) and Muckenhoupt A p -weight w, then it has stability on weighted function spaces L p ′ w ′ for all 1 ≤ p ′ < ∞ and Muckenhoupt A p ′ -weights w ′ .

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Wiener’s lemma: localization and various approaches

Shin

Sun

2013

Appl. Math. J. Chin. Univ.

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Chang Eon Shin

Stability of localized operators

Polynomial control on stability, inversion and powers of matrices on simple graphs

Stability of Localized Integral Operators on Normal Spaces of Homogeneous Type

Stability of Localized Integral Operators on WeightedL^pSpaces

Wiener’s lemma: localization and various approaches

Contact Info

Product

Resources

About

Chang Eon Shin

Stability of localized operators

Polynomial control on stability, inversion and powers of matrices on simple graphs

Stability of Localized Integral Operators on Normal Spaces of Homogeneous Type

Stability of Localized Integral Operators on WeightedLpSpaces

Wiener’s lemma: localization and various approaches

Contact Info

Product

Resources

About

Stability of Localized Integral Operators on WeightedL^pSpaces