Matching pursuits among shifted cauchy kernels in higher-dimensional spaces

Appealing to the Clifford analysis and matching pursuits, we study the adaptive decompositions of functions of several variables of finite energy under the dictionaries consisting of shifted Cauchy kernels. This is a realization of matching pursuits among shifted Cauchy kernels in higher-dimensional spaces. It offers a method to process signals in arbitrary dimensions.     

Mixed model identification for linear time‐invariant systems with mixed noises in frequency domain

In this paper, we present a new method for frequency domain identification of discrete linear time‐invariant systems. We take consideration of the case where the output noises are mixed or unknown. In order to deal with this problem, a new mixed model structure is used correspondingly. The augmented Lagrangian method (ALM) is combined in selection of poles for the shifted Cauchy kernels to get solutions to the optimal problem. Simulations show the proposed method can get efficient approximation to the original systems.     

THE COLLOCATION METHODS FOR SINGULAR INTEGRAL EQUATIONS WITH CAUCHY KERNELS

1 Introduction Singular integral equations (SIEs) with Cauchy kernels Of the formoften arise in mathematical models of physical phenomena. Since closed-form solutions to SIEsare generally not available, much att.ntion has been focused on numerical methods of solution.In the past twenty years, various collocation methods for SIEs have been the topic of a greatmany of papers, most of which can be found in two surveys[213]. The early works in the fieldis to study tile numerical solutions for…     

Adaptive Fourier decomposition of functions in quaternionic Hardy spaces

We study decompositions of functions in the Hardy spaces into linear combinations of the basic functions in the orthogonal rational systems B_n, which are obtained in the respective contexts through Gram–Schmidt orthogonalization process on shifted Cauchy kernels. Those lead to adaptive decompositions of quaternionic‐valued signals of finite energy. This study is a generalization of the main results of the first author's recent research in relation to adaptive Takenaka–Malmquist systems in one complex variable. Copyright © 2011 John Wiley & Sons, Ltd.     

On a transplant operator and explicit construction of Cauchy-type integral representations for p-analytic functions

We present a new technique for explicit construction of Cauchy kernels and Cauchy integral representations for a class of generalized analytic functions and p-analytic functions.     

A Domain Integral Equation for the Bergman Kernel

Certain integral operators involving the Szegö, the Bergman and the Cauchy kernels are known to have the reproducing property. Both the Szegö and the Bergman kernels have series representations in terms of an orthonormal basis. In this paper we derive the Cauchy kernel by means of biorthogonality. The ideas involved are then applied to construct a non-Hermitian kernel admitting a reproducing property for a space associated with the Bergman kernel. The construction leads to a domain integral equation for the Bergman kernel.^{1 2}     

Averaging of the Cauchy kernels and integral realization of the local residue

We consider a family of kernels of integral representations associated with toric varieties. These kernels generalizes, in particular, the Bochner-Martinelli form. We show that the integral representation formulas can be derived by averaging of the Cauchy kernels on some positive measures. We apply then the obtained result to get an integral realization of the local residue corresponding to each kernel of integral representation.     

Integral equations for the mixed boundary value problem in plane elastostatics

Six formulations of the mixed boundary value problem of plane elastostatics integral equations are presented. All equations are of purely second kind and are characterized by a uniform structure of the kernels with respect to geometrical and statical boundary values. The kernels of two formulations are regular, the remaining formulations contain Cauchy principal value integrals.     

Generalized power functions

In this paper some relations for the kernels of the Carleman–Vekua equation, in particular the representations of these kernels in the form of generalized power functions completely analogous to the well-known elementary Cauchy kernel expansion, are studied. The obtained results are applied to some problems of the theory of generalized analytic functions.     

第I类非自共轭锥上的Gamma函数

本文将Ｇａｍｍａ函数及Ｓｉｅｇｅｌ积分推广到一般的第Ｉ类非自共轭锥上．作为其应用，显式给出了以这些锥为底的管状域（或第一类Ｓｉｅｇｅｌ域）的Ｃａｕｃｈｙ Ｓｚｅｇ¨ｏ核和形式Ｐｏｉｓｏｎ核．     

Continuity and compactness of singular integral operators

In the space of square integrable functions we establish effective sufficient continuity and compactness conditions for singular integral operators with Cauchy kernels on a segment of the real axis.     

Some new properties of biharmonic heat kernels

Contrary to the second-order case, biharmonic heat kernels are sign-changing. A deep knowledge of their behaviour may however allow us to prove positivity results for solutions of the Cauchy problem. We establish further properties of these kernels, we prove some Lorch–Szegö-type monotonicity results and we give some hints on how to obtain similar results for higher order polyharmonic parabolic problems.     

Direct methods for the approximate solution of operator equations with nonzero kernel

We justify direct methods for the approximate solution of linear operator equations with nonzero kernels and apply these methods to the justification of projective methods for the approximate solution of standard singular integral equations with Cauchy kernels and positive index on the unit disk. Translated from Ukrainskii Matematicheskii Zhurnal, Vol. 50, No. 9, pp. 1202–1213, September, 1998.     

The use of Chebyshev series for approximate analytic solution of ordinary differential equations

Application of Chebyshev series to solve ordinary differential equations is described. This approach is based on the approximation of the solution to a given Cauchy problem and its derivatives by partial sums of shifted Chebyshev series. The coefficients of the series are determined by an iterative process using Markov quadrature formulas. It is shown that the proposed approach can be applied to formulate an approximate analytical method for solving Cauchy problems. A number of examples are considered to illustrate the obtaining of approximate analytical solutions in the form of partial sums of shifted Chebyshev series.     

The analytic model of a hyponormal operator with rank one self-commutator

The analytic model of a general hyponormal operator with rank one self-commutator is obtained. A Cauchy integral representation for the adjoint is given, certain kernels are discussed, and conditions are given under which the hyponormal operator is similar to a subnormal Toeplitz operator.     

Singular integrals with generalized Cauchy kernels for the velocity field in boundary value problems of filtration in an anisotropic inhomogeneous porous layer

We study two-dimensional stationary and nonstationary boundary value problems of fluid filtration in an anisotropic inhomogeneous porous layer whose conductivity is modeled by a not necessarily symmetric tensor. For the velocity field, we introduce generalized singular Cauchy and Cauchy type integrals whose kernels are expressed via the leading solutions of the main equations and have a hydrodynamic interpretation. We obtain the limit values of a Cauchy type generalized integral (Sokhotskii-Plemelj generalized formulas). This permits one to develop a method for solving boundary value problems for the filtration velocity field. The idea of the method and its efficiency are illustrated for the boundary value problem of filtration in adjacent layers of distinct conductivities and the problem of the evolution of liquid interface.     

The standard error of nonparametric density estimates

We study the asymptotic behavior of the errors in the Parzen estimators of normal and Cauchy distribution densities for different kernels.Translated from Statisticheskie Metody, pp. 3–18, 1980.     

Construction of Cauchy integrals for one class of nonanalytic functions of complex variables

For some values of characteristics of p-analytic and (p, q)-analytic functions, the values of kernels of Cauchy integrals are found in an explicit form involving elementary and special functions. The application of the Cauchy integral for deriving the Muskhelishvili equation in the Stokes problem on a slow axially symmetric flow of a viscous liquid is demonstrated. Bibliography: 9 titles. Translated fromObchyslyuval’na ta Prykladna Matematyka, No. 76, 1992, pp. 98–111.     

LINEAR SINGULAR INTEGRAL EQUATION ON DOMAINS COMPOSED BY BALLS

For domains composed by balls in Cn, this paper studies the boundary behaviour of Cauchy type integrals with discrete holomorphic kernels and the corresponding linear singular integral equation on each piece of smooth lower dimensional edges on the boundary of the domain.     

Generalized cauchy singular integral for the boundary values of two-dimensional flows in an anisotropic-inhomogeneous layer of a porous medium

We consider the main boundary value problems of two-dimensional stationary flows in an anisotropic-inhomogeneous layer with an arbitrary (not necessarily symmetric) permeability tensor. We present Cauchy integrals and Cauchy type integrals whose kernels can be expressed via the fundamental solutions of the main equations and have a hydrodynamic meaning. This permits one to develop the method of singular integral equations for solving two-dimensional boundary value problems. The considered problems can be used as mathematical models, in particular, for the extraction of fluids (water, oil) from natural layers of soil with complicated geological structure.