Your search keyword '"Dym, H."' showing total 826 results

101. Finiteness of Eigenvalues of the Perturbed Dirac Operator.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Finiteness criteria are established for the point spectrum of the perturbed Dirac operator. The results are obtained by applying the direct methods of the perturbation theory of linear operators. The particular case of the Hamiltonian of a Dirac particle in an electromagnetic field is also considered. [ABSTRACT FROM AUTHOR]

Published

2007

102. Microlocalization within Some Classes of Fourier Hyperfunctions.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

New presheaves of hyperfunction spaces with the growth estimates with respect to x → ∞ and y → 0 in a cone Γ are introduced. Then it is shown that the Laplace transform is a bijective mapping of the space of tempered ultradistributions on Rn of non-quasianalytic class onto the corresponding hyperfunction space of sections over Dn, the compactification of Rn. Microlocalization of tempered ultradistributions at (x0∞, ξ0) is introduced as well as a new microlocalization within some classes of hyperfunctions. [ABSTRACT FROM AUTHOR]

Published

2007

103. Continuity and Schatten Properties for Toeplitz Operators on Modulation Spaces.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Let M(ω)p,q be the modulation space with parameters p, q and weight function ω. We prove that if p, q, p1, p2, q1, q2 ∈ [1,∞], ω1, ω2, ω and h1, h2 are appropriate, and a ∈ M(ω)p,q, then the Toeplitz operator $$ Tp_{h_1 ,h_2 } (a):M_{(\omega _1 )}^{p_1 ,q_1 } \to M_{(\omega _2 )}^{p_2 ,q_2 } $$ is continuous. If in addition p1 = p2 = q1 = q2 = 2, then we present sufficient conditions on p, q, h1 and h2 in order for $$ Tp_{h_1 ,h_2 } (a) $$ should be a Schatten-von Neumann operator of certain degree. [ABSTRACT FROM AUTHOR]

Published

2007

104. Gelfand-Shilov Spaces, Pseudo-differential Operators and Localization Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We present new results concerning pseudo-differential operators in the function spaces Sμμ(ℝn) of Gelfand and Shilov. In particular we discuss Sνμ(ℝn)-regularity of solutions to SG-elliptic pseudo-differential equations, allowing lower order semilinear perturbations. The results apply to SG-elliptic partial differential equations with polynomial coefficients. We also study the action of Weyl operators and localization operators on Sνμ(ℝn). [ABSTRACT FROM AUTHOR]

Published

2007

105. On the Product of Localization Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We provide examples of the product of two localization operators. As a special case, we study the composition of Gabor multipliers. The results highlight the instability of this product and underline the necessity of expressing it in terms of asymptotic expansions. [ABSTRACT FROM AUTHOR]

Published

2007

106. Exact and Numerical Inversion of Pseudo-differential Operators and Applications to Signal Processing.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

A large class of time-varying filters can be described via pseudo-differential operators belonging to the Hörmander class OPS00, 0. The questions whether and how an input signal can be reconstructed from a known output lead to the problems of invertibility of pseudo-differential operators in that class and of (at least, numerical) solution of pseudo-differential equations. We are going to derive effective conditions for the invertibility for pseudo-differential operators with globally slowly varying symbols as well as for causal pseudo-differential operators, and we study the stability of the finite sections method with respect to time and frequency for these operators. [ABSTRACT FROM AUTHOR]

Published

2007

107. A Characterization of Stockwell Spectra.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Signals in real applications are typically finite in duration, dynamic and non-stationary processes with frequency characteristics varying over time. This often requires techniques capable of locally analyzing and processing signals. An integral transform known as the Stockwell transform is a combination of the classic Gabor transform and the current and versatile wavelet transform. It allows more accurate detection of subtle changes and easy interpretation in the time-frequency domain. In this paper, we study the mathematical underpinnings of the Stockwell transform. We look at the Stockwell transform as a stack of simple pseudo-differential operators parameterized by frequencies and give a complete description of the Stockwell spectra. [ABSTRACT FROM AUTHOR]

Published

2007

108. A Class of Quadratic Time-frequency Representations Based on the Short-time Fourier Transform.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Motivated by problems in signal analysis, we define a class of time-frequency representations which is based on the short-time Fourier transform and depends on two fixed windows. We show that this class can be viewed as a link between the classical Rihaczek representation and the spectrogram. Correspondingly we formulate for this class a suitable general form of the uncertainty principle which have, as limit case, the uncertainty principles for the Rihaczek representation and for the spectrogram. We finally consider the questions of marginal distributions. We compute them in terms of convolutions with the windows and prove simple conditions for which average and standard deviation of the distributions in our class coincide with that of their marginals. [ABSTRACT FROM AUTHOR]

Published

2007

109. Algebras of Pseudo-differential Operators with Discontinuous Symbols.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Using the boundedness of the maximal singular integral operator related to the Carleson-Hunt theorem we prove the boundedness and study the compactness of pseudo-differential operators a(x,D) with bounded measurable V (ℝR)-valued symbols a(x, ·) on the Lebesgue spaces Lp(ℝ) with 1 < p < δ, where V (ℝ) is the Banach algebra of all functions of bounded total variation on R. Replacement of absolutely continuous functions of bounded total variation by arbitrary functions of bounded total variation allows us to study pseudo-differential operators with symbols admitting discontinuities of the first kind with respect to the spatial and dual variables. Appearance of discontinuous symbols leads to non-commutative algebras of Fredholm symbols. Three different Banach algebras of pseudo-differential operators with discontinuous symbols acting on the spaces Lp(ℝ) are studied. We construct Fredholm symbol calculi for these algebras and establish Fredholm criteria for the operators in these algebras in terms of their Fredholm symbols. For the operators in the first algebra we also obtain an index formula. An application to the Haseman boundary value problem is given. [ABSTRACT FROM AUTHOR]

Published

2007

110. Continuity and Schatten Properties for Pseudo-differential Operators on Modulation Spaces.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Let M(ω)p,q be the modulation space with parameters p, q and weight function ω. We prove that if t ∈ R, p, pj, q, qj ∈ [1, ∞], ω1, ω2 and ω are appropriate, and a ∈ M(ω)p,q, then the pseudo-differential operator at(x,D) is continuous from M(ω)p1,q1 to M(ω)p2,q2. If in addition pj = qj = 2, then we establish necessary and sufficient conditions on p and q in order to at(x,D) should be a Schatten-von Neumann operator of certain order. [ABSTRACT FROM AUTHOR]

Published

2007

111. Continuity in Quasi-homogeneous Sobolev Spaces for Pseudo-differential Operators with Besov Symbols.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this paper a result of continuity for pseudo-differential operators with non-regular symbols on spaces of quasi-homogeneous type is given. More precisely, the symbols a(x, ξ) take their values in a quasi-homogeneous Besov space with respect to the x variable; moreover a finite number of derivatives with respect to the second variable satisfies, in Besov norm, decay estimates of quasi-homogeneous type. [ABSTRACT FROM AUTHOR]

Published

2007

112. A New Aspect of the Lp-extension Problem for Inhomogeneous Differential Equations.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

For the differential operator P of order m and the inhomogeneous data f ∈ S′ on Rn, we say that the Lp-extension of the solution holds if u ∈ Lp, m ≤ n(1 − 1/p), and Pu = f on Rn / 0 imply Pu = f on Rn. In this article, we discuss which kind of inhomogeneous terms f ∈ S′ admit the Lp-extension of the solution. In previous works, this problem was studied by using classical Bochner's method ([1]) or a new method developed by the author and Uchida ([5], [4]). We consider inhomogeneous terms which are not covered by these results. [ABSTRACT FROM AUTHOR]

Published

2007

113. Gevrey Local Solvability for Degenerate Parabolic Operators of Higher Order.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this paper we study the local solvability in Gevrey classes for degenerate parabolic operators of order ≥ 2. We assume that the lower order term vanishes at a suitably smaller rate with respect to the principal part; we then analyze its influence on the behavior of the operator, proving local solvability in Gevrey spaces Gs for small s, and local nonsolvability in Gs for large s. [ABSTRACT FROM AUTHOR]

Published

2007

114. Super-exponential Decay of Solutions to Differential Equations in ℝd.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We study the exponential decay of solutions to differential equations of hypoelliptic type (see Definition 2.1). In particular we find sufficient conditions on the differential operator A in order for estimates of the kind $$ e^{\varepsilon \left\langle x \right\rangle ^r } Au \in V \Rightarrow e^{\varepsilon \left\langle x \right\rangle ^r } u \in V $$ to hold, for several types of functions and distribution spaces V. For example, V may be . [ABSTRACT FROM AUTHOR]

Published

2007

115. Wave Kernels of the Twisted Laplacian.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We construct the wave kernels of the non-isotropic twisted Laplacian by means of its heat kernel. We then express the wave kernels at the origin in terms of complex Fourier integrals and we exploit the connections of the phase functions with the complex integrals. [ABSTRACT FROM AUTHOR]

Published

2007

116. On the Fourier Analysis of Operators on the Torus.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Basic properties of Fourier integral operators on the torus $$ \mathbb{T}^n = (\mathbb{R}/2\pi \mathbb{Z})^n $$ are studied by using the global representations by Fourier series instead of local representations. The results can be applied in studying hyperbolic partial differential equations. [ABSTRACT FROM AUTHOR]

Published

2007

117. Weyl Transforms, Heat Kernels, Green Functions and Riemann Zeta Functions on Compact Lie Groups.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The Plancherel formula and the inversion formula for Weyl transforms on compact and Hausdorff groups are given. A formula expressing the relationships of the wavelet constant, the degree of the irreducible and unitary representation and the volume of an arbitrary compact and Hausdorff group is derived. The role of the Weyl transforms in the derivation of the formulas for the heat kernels of Laplacians on compact Lie groups is explicated. The Green functions and the Riemann zeta functions of Laplacians on compact Lie groups are constructed using the corresponding heat kernels. [ABSTRACT FROM AUTHOR]

Published

2007

118. Symbolic Calculus of Pseudo-differential Operators and Curvature of Manifolds.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The method of construction of the fundamental solution for heat equations using pseudo-differential operators with parameter time variable is discussed, which is applicable to calculate traces of operators. This gives extensions of both the Gauss-Bonnet-Chern Theorem and the Riemann-Roch Theorem. [ABSTRACT FROM AUTHOR]

Published

2007

119. On Rays of Minimal Growth for Elliptic Cone Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We present an overview of some of our recent results on the existence of rays of minimal growth for elliptic cone operators and two new results concerning the necessity of certain conditions for the existence of such rays. [ABSTRACT FROM AUTHOR]

Published

2007

120. The Quantization of Edge Symbols.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We investigate operators on manifolds with edges from the point of view of the symbolic calculus induced by the singularities. We discuss new aspects of the quantization of edge-degenerate symbols which lead to continuous operators in weighted edge spaces. [ABSTRACT FROM AUTHOR]

Published

2007

121. The Continuous Analogue of the Resultant and Related Convolution Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

For a class of pairs of entire matrix functions the null space of the natural analogue of the classical resultant matrix is described in terms of the common Jordan chains of the defining entire matrix functions. The main theorem is applied to two inverse problems. The first concerns convolution integral operators on a finite interval with matrix valued kernel functions and complements earlier results of [6]. The second is the inverse problem for matrix-valued continuous analogues of Szegő orthogonal polynomials. [ABSTRACT FROM AUTHOR]

Published

2007

122. The Method of Minimal Vectors Applied to Weighted Composition Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We study the behavior of the sequence of minimal vectors corresponding to certain classes of operators on L2 spaces, including weighted composition operators such as those induced by Möbius transformations. In conjunction with criteria for quasinilpotence, the convergence of sequences associated with the minimal vectors leads to the construction of hyperinvariant subspaces. [ABSTRACT FROM AUTHOR]

Published

2007

123. From Toeplitz Eigenvalues through Green's Kernels to Higher-order Wirtinger-Sobolev Inequalities.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The paper is concerned with a sequence of constants which appear in several problems. These problems include the minimal eigenvalue of certain positive definite Toeplitz matrices, the minimal eigenvalue of some higher-order ordinary differential operators, the norm of the Green kernels of these operators, the best constant in a Wirtinger-Sobolev inequality, and the conditioning of a special least squares problem. The main result of the paper gives the asymptotics of this sequence. [ABSTRACT FROM AUTHOR]

Published

2007

124. Positivity and the Existence of Unitary Dilations of Commuting Contractions.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The central result of this paper is a method of characterizing those commuting tuples of operators that have a unitary dilation, in terms of the existence of a positive map with certain properties. Although this positivity condition is not necessarily easy to check given a concrete example, it can be used to find practical tests in some circumstances. As an application, we extend a dilation theorem of Sz.-Nagy and Foiaş concerning regular dilations to a more general setting [ABSTRACT FROM AUTHOR]

Published

2007

125. Weak Mixing Properties of Vector Sequences.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Notions of weak and uniformly weak mixing (to zero) are defined for bounded sequences in arbitrary Banach spaces. Uniformly weak mixing for vector sequences is characterized by mean ergodic convergence properties. This characterization turns out to be useful in the study of multiple recurrence, where mixing properties of vector sequences, which are not orbits of linear operators, are investigated. For bounded sequences, which satisfy a certain domination condition, it is shown that weak mixing to zero is equivalent with uniformly weak mixing to zero. [ABSTRACT FROM AUTHOR]

Published

2007

126. Poly-Bergman Spaces and Two-dimensional Singular Integral Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We describe a direct and transparent connection between the poly-Bergman type spaces on the upper half-plane and certain two-dimensional singular integral operators. [ABSTRACT FROM AUTHOR]

Published

2007

127. Singular Integral Operators in Weighted Spaces of Continuous Functions with Oscillating Continuity Moduli and Oscillating Weights.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We present a survey of some results on the theory of singular integral operators with piece-wise continuous coefficients in the weighted spaces of continuous functions with a prescribed continuity modulus (generalized Hölder spaces Hω(Γ, ρ)) together with some new results related to oscillating (non-equilibrated) characteristics and oscillating weights. [ABSTRACT FROM AUTHOR]

Published

2007

128. On Indefinite Cases of Operator Identities Which Arise in Interpolation Theory.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Operator identities involving nonnegative selfadjoint operators play a fundamental role in interpolation theory and its applications. The theory is generalized here to selfadjoint operators whose negative spectra consist of a finite number of eigenvalues of finite total multiplicity. It is shown that such identities are closely associated with generalized Nevanlinna functions by means of the Kreĭn-Langer integral representation. The Potapov fundamental matrix inequality is generalized to this situation, and it is used to formulate and solve an operator interpolation problem analogous to the definite case. [ABSTRACT FROM AUTHOR]

Published

2007

129. The Fredholm Property of Pseudodifferential Operators with Non-smooth Symbols on Modulation Spaces.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The aim of the paper is to study the Fredholm property of pseudodifferential operators in the Sjöstrand class OPSw where we consider these operators as acting on the modulation spaces M2, p(ℝN). These spaces are introduced by means of a time-frequency partition of unity. The symbol class Sw does not involve any assumptions on the smoothness of its elements. In terms of their limit operators, we will derive necessary and sufficient conditions for operators in OPSw to be Fredholm. In particular, it will be shown that the Fredholm property and, thus, the essential spectra of operators in this class are independent of the modulation space parameter p ∈ (1, ∞). [ABSTRACT FROM AUTHOR]

Published

2007

130. On the Kernel of Some One-dimensional Singular Integral Operators with Shift.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

An estimate for the dimension of the kernel of the singular integral operator with shift $$ \left( {I + \sum\limits_{j = 1}^n {a_j (t)U^j } } \right)P_ + + P_ - :L_2 (\mathbb{R}) \to L_2 (\mathbb{R}) $$ is obtained, where P± are the Cauchy projectors, (U ψ)(t) = ψ(t+h), h ∈ ℝ+, is the shift operator and aj(t) are continuous functions on the one point compactification of ℝ. The roots of the polynomial $$ 1 + \sum\limits_{j = 1}^n {a_j (\infty )\eta ^j } $$ are assumed to belong all simultaneously either to the interior of the unit circle or to its exterior. [ABSTRACT FROM AUTHOR]

Published

2007

131. Extension of Operator Lipschitz and Commutator Bounded Functions.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Let (B(H) ‖·‖) be the algebra of all bounded operators on an infinite-dimensional Hilbert space H. Let B(H)sa be the set of all selfadjoint operators in B(H). Throughout the paper we denote by α a compact subset of ℝ and by B(H)sa(α) the set of all operators in B(H)sa with spectrum in α: $$ B(H)_{sa} (\alpha ) = \{ A = A^* \in B(H): Sp(A) \subseteq \alpha \} . $$ We will use similar notations Asa, Asa(α) for a Banach *-algebra A. Each bounded Borel function g on α defines, via the spectral theorem, a map A → g(A) from B(H)sa(α) into B(H). Various smoothness conditions when imposed on this map define the corresponding classes of operator-smooth functions. [ABSTRACT FROM AUTHOR]

Published

2007

132. Pseudodifferential Operators with Compound Slowly Oscillating Symbols.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Let V (ℝ) denote the Banach algebra of absolutely continuous functions of bounded total variation on ℝ. We study an algebra $$ \mathfrak{B} $$ of pseudodifferential operators of zero order with compound slowly oscillating V (ℝ)-valued symbols (x, y) ↦ a(x, y, ·) of limited smoothness with respect to x, y ∈ ℝ. Sufficient conditions for the boundedness and compactness of pseudodifferential operators with compound symbols on Lebesgue spaces Lp(ℝ) are obtained. A symbol calculus for the algebra $$ \mathfrak{B} $$ is constructed on the basis of an appropriate approximation of symbols by infinitely differentiable ones and by use of the techniques of oscillatory integrals. A Fredholm criterion and an index formula for pseudodifferential operators A ∈ $$ \mathfrak{B} $$ are obtained. These results are carried over to Mellin pseudodifferential operators with compound slowly oscillating V (ℝ)-valued symbols. Finally, we construct a Fredholm theory of generalized singular integral operators on weighted Lebesgue spaces Lp with slowly oscillating Muckenhoupt weights over slowly oscillating Carleson curves. [ABSTRACT FROM AUTHOR]

Published

2007

133. Algebras of Singular Integral Operators with Piecewise Continuous Coefficients on Weighted Nakano Spaces.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We find Fredholm criteria and a formula for the index of an arbitrary operator in the Banach algebra of singular integral operators with piecewise continuous coefficients on Nakano spaces (generalized Lebesgue spaces with variable exponent) with Khvedelidze weights over either Lyapunov curves or Radon curves without cusps. These results "localize" the Gohberg-Krupnik Fredholm theory with respect to the variable exponent. [ABSTRACT FROM AUTHOR]

Published

2007

134. Schmidt-Representation of Difference Quotient Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We consider difference quotient operators in de Branges Hilbert spaces of entire functions. We give a description of the spectrum and a formula for the spectral subspaces. The question of completeness of the system of eigenvectors and generalized eigenvectors is discussed. For certain cases the s-numbers and the Schmidt-representation of the operator under discussion is explicitly determined. [ABSTRACT FROM AUTHOR]

Published

2007

135. Split Algorithms for Centrosymmetric Toeplitz-plus-Hankel Matrices with Arbitrary Rank Profile.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Split Levinson and Schur algorithms for the inversion of centrosymmetric Toeplitz-plus-Hankel matrices are designed that work, in contrast to previous algorithms, for matrices with any rank profile. Furthermore, it is shown that the algorithms are related to generalized ZW-factorizations of the matrix and its inverse. [ABSTRACT FROM AUTHOR]

Published

2007

136. Inverse Scattering to Determine the Shape of a Vocal Tract.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The inverse scattering problem is reviewed for determining the cross sectional area of a human vocal tract. Various data sets are examined resulting from a unit-amplitude, monochromatic, sinusoidal volume velocity sent from the glottis towards the lips. In case of nonuniqueness from a given data set, additional information is indicated for the unique recovery. [ABSTRACT FROM AUTHOR]

Published

2007

137. The Infinite-dimensional Continuous Time Kalman-Yakubovich-Popov Inequality.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We study the set MΣ of all generalized positive self-adjoint solutions (that may be unbounded and have an unbounded inverse) of the KYP (Kalman-Yakubovich-Popov) inequality for a infinite-dimensional linear time-invariant system Σ in continuous time with scattering supply rate. It is shown that if MΣ is nonempty, then the transfer function of Σ coincides with a Schur class function in some right half-plane. For a minimal system Σ the converse is also true. In this case the set of all H ∈ MΣ with the property that the system is still minimal when the original norm in the state space is replaced by the norm induced by H is shown to have a minimal and a maximal solution, which correspond to the available storage and the required supply, respectively. The notions of strong H-stability, H-*-stability and H-bistability are introduced and discussed. We show by an example that the various versions of H-stability depend crucially on the particular choice of H ∈ MΣ. In this example, depending on the choice of the original realization, some or all H ∈ MΣ will be unbounded and/or have an unbounded inverse. [ABSTRACT FROM AUTHOR]

Published

2007

138. Unbounded Normal Algebras and Spaces of Fractions.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

We consider arbitrary families of unbounded normal operators, commuting in a strong sense, in particular algebras consisting of unbounded normal operators, and investigate their connections with some algebras of fractions of continuous functions on compact spaces. New examples and properties of spaces of fractions are also given. [ABSTRACT FROM AUTHOR]

Published

2007

139. Algorithms to Solve Hierarchically Semi-separable Systems.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

‘Hierarchical Semi-separable' matrices (HSS matrices) form an important class of structured matrices for which matrix transformation algorithms that are linear in the number of equations (and a function of other structural parameters) can be given. In particular, a system of linear equations Ax = b can be solved with linear complexity in the size of the matrix, the overall complexity being linearly dependent on the defining data. Also, LU and ULV factorization can be executed ‘efficiently', meaning with a complexity linear in the size of the matrix. This paper gives a survey of the main results, including a proof for the formulas for LU-factorization that were originally given in the thesis of Lyon [1], the derivation of an explicit algorithm for ULV factorization and related Moore-Penrose inversion, a complexity analysis and a short account of the connection between the HSS and the SSS (sequentially semi-separable) case. A direct consequence of the computational theory is that from a mathematical point of view the HSS structure is ‘closed' for a number operations. The HSS complexity of a Moore-Penrose inverse equals the HSS complexity of the original, for a sum and a product of operators the HSS complexity is no more than the sum of the individual complexities. [ABSTRACT FROM AUTHOR]

Published

2007

140. Canonical Forms for Symmetric and Skewsymmetric Quaternionic Matrix Pencils.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Canonical forms are given for pairs of quaternionic matrices, or equivalently matrix pencils, with various symmetry properties, under strict equivalence and symmetry respecting congruence. Symmetry properties are induced by involutory antiautomorphisms of the quaternions which are different from the quaternionic conjugation. Some applications are developed, in particular, canonical forms for quaternionic matrices that are symmetric or skewsymmetric with respect to symmetric or skewsymmetric quaternion-valued inner products. Another application concerns joint numerical cones of pairs of skewsymmetric quaternionic matrices. [ABSTRACT FROM AUTHOR]

Published

2007

141. On the Irreducibility of a Class of Homogeneous Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this paper we construct a class of homogeneous Hilbert modules over the disc algebra $$ \mathcal{A}(\mathbb{D}) $$ as quotients of certain natural modules over the function algebra $$ \mathcal{A}(\mathbb{D}^2 ) $$. These quotient modules are described using the jet construction for Hilbert modules. We show that the quotient modules obtained this way, belong to the class Bk($$ \mathbb{D} $$) and that they are mutually inequivalent, irreducible and homogeneous. [ABSTRACT FROM AUTHOR]

Published

2007

142. A Truncated Matricial Moment Problem on a Finite Interval. The Case of an Odd Number of Prescribed Moments.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

The main goal of this paper is to study the truncated matricial moment problem on a finite closed interval in the case of an odd number of prescribed moments by using of the FMI method of V.P. Potapov. The solvability of this problem is characterized by the fact that two block Hankel matrices built from the data of the problem are nonnegative Hermitian (Theorem 1.3). An essential step to solve the problem under consideration is to derive an effective coupling identity between both block Hankel matrices (Proposition 2.5). In the case that these Hankel matrices are both positive Hermitian we parametrize the set of solutions via a linear fractional transformation the generating matrix-valued function of which is a matrix polynomial whereas the set of parameters consists of distinguished pairs of meromorphic matrix-valued functions. [ABSTRACT FROM AUTHOR]

Published

2007

143. The Transformation of Issai Schur and Related Topics in an Indefinite Setting.

Author

Gohberg, I., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., Kaper, H. G., Kuroda, S. T., and Lancaster, P.

Abstract

We review our recent work on the Schur transformation for scalar generalized Schur and Nevanlinna functions. The Schur transformation is defined for these classes of functions in several situations, and it is used to solve corresponding basic interpolation problems and problems of factorization of rational J-unitary matrix functions into elementary factors. A key role is played by the theory of reproducing kernel Pontryagin spaces and linear relations in these spaces. [ABSTRACT FROM AUTHOR]

Published

2007

144. Positive semigroups in L1-spaces.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this chapter, we investigate asymptotic properties of one-parameter positive semigroups in L1(Ω, Σ, μ), where (Ω, Σ, μ) is a measure space with a σ-finite measure μ. In the last section, we shall also consider the theory of Markov semigroups in so-called non-commutative L1-spaces. For one-parameter positive semigroups in L1-spaces, there is a rich theory, which includes many results on the existence of invariant densities, criteria for asymptotic stability, decomposition theorems, etc. (cf. [71]). The choice of results presented in this chapter is motivated mainly by the author’s research interests, and it does not reflect the present state of the very broad asymptotic theory of positive semigroups in L1-spaces. We send the reader for many other important aspects of this theory and for their applications to books of Foguel [43], Krengel [67], Lasota and Mackey [71], and Schaefer [110]. [ABSTRACT FROM AUTHOR]

Published

2007

145. Positive semigroups in ordered Banach spaces.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this chapter, we deal with one-parameter positive semigroups in ordered Banach spaces. Firstly, we discuss the notion of ideally ordered Banach spaces and uniformly order convex Banach spaces. Both classes include Lp-spaces (1 ≤ p < ∞) as well as preduals of von Neumann algebras. We prove several theorems about positive semigroups in such Banach spaces. Then we consider positive semigroups in Banach lattices and investigate several types of asymptotic regularity of these semigroups. In the last section of this chapter, we deal with relations between the geometry of Banach lattices and mean ergodicity of bounded positive semigroups in them. [ABSTRACT FROM AUTHOR]

Published

2007

146. Elementary theory of one-parameter semigroups.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In the first chapter of the book, we give an introduction to the theory of one-parameter operator semigroups. We begin with the splitting theorem of Jacobs- Deleeuw-Glicksberg and the Eberlein mean ergodic theorem for a one-parameter operator semigroup. Then we present the elementary theory of C0-semigroups and discuss some relations between spectral properties of the generator of a C0- semigroup and its asymptotic behavior. We follow the standard textbooks [13], [48], [57], [67], [74], [80], [130], and send the reader for other deep and delicious topics of this theory to those books and to [17], [67], [87], [41], [89]. In the last section, we discuss the asymptotically finite-dimensional semigroups. We use frequently well-known results from operator theory and functional analysis, and send the reader to standard textbooks [2], [74], [105], and [130] for them. [ABSTRACT FROM AUTHOR]

Published

2007

147. Orbits and Capacity.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

Let T be an operator on a Banach space X. By an orbit of T we mean a sequence (Tnx)n∞=0, where x ∈ X is a fixed vector. This notion, which originated in the theory of dynamical systems, is closely related to the concepts of local spectral radius and capacity of an operator. Further motivations come from stability problems of semigroups of operators and the invariant subspace problem. [ABSTRACT FROM AUTHOR]

Published

2007

148. Taylor Spectrum.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this chapter we introduce and study another important spectral system for commuting operators — the Taylor spectrum. Although the definition of the Taylor spectrum is rather complicated, the Taylor spectrum has a distinguished property among other spectral systems, namely the existence of the functional calculus for functions analytic on a neighbourhood of the Taylor spectrum. From this reason many experts consider the Taylor spectrum to be the proper generalization of the ordinary spectrum for single operators. [ABSTRACT FROM AUTHOR]

Published

2007

149. Essential Spectrum.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this chapter we study various types of essential spectra of operators on a Banach space X. They are closely connected with the Calkin algebra $$ \mathcal{B}\left( X \right)/\mathcal{K}\left( X \right) $$ , where $$ \mathcal{K}\left( X \right) $$ denotes the ideal of compact operators. [ABSTRACT FROM AUTHOR]

Published

2007

150. Operators.

Author

Gohberg, I., Alpay, D., Arazy, J., Atzmon, A., Ball, J. A., Ben-Artzi, A., Bercovici, H., Böttcher, A., Clancey, K., Coburn, L. A., Curto, R. E., Davidson, K. R., Douglas, R. G., Dijksma, A., Dym, H., Fuhrmann, P. A., Gramsch, B., Helton, J. A., Kaashoek, M. A., and Kaper, H. G.

Abstract

In this chapter we study the Banach algebra of all operators acting on a Banach space. All Banach spaces are assumed to be complex and non-trivial, of dimension at least 1. By an operator we always mean a bounded linear mapping between two Banach spaces. [ABSTRACT FROM AUTHOR]

Published

2007