Sobolev-orthogonal systems of functions and some of their applications

Sobolev-orthogonal systems of functions and some of their applications

Systems of functions are considered which are associated with a given orthogonal system and are orthogonal with respect to an inner product of Sobolev type involving terms with masses concentrated at a point. Special attention is paid to such systems generated by classical orthogonal systems such as...

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Veröffentlicht in:Russian mathematical surveys 2019-08, Vol.74 (4), p.659-733
1. Verfasser: Sharapudinov, I. I.
Format: Artikel
Sprache:eng
Schlagworte:
Cauchy problems
Differential equations
Fourier series
Jacobi
Laguerre polynomials
Mathematical analysis
Nonlinear equations
Nonlinear systems
Polynomials
Sobolev-orthogonal systems
Cauchy problem for a system of ordinary differential equations
systems generated by the Haar polynomials
the cosines
the Legendre
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Zusammenfassung:Systems of functions are considered which are associated with a given orthogonal system and are orthogonal with respect to an inner product of Sobolev type involving terms with masses concentrated at a point. Special attention is paid to such systems generated by classical orthogonal systems such as the cosine system, the Haar system, and the systems of Legendre, Jacobi, and Laguerre polynomials. The approximation properties of Fourier series in Sobolev-orthogonal systems are investigated in several cases. For (generally speaking, non-linear) systems of differential equations deep connections between Sobolev-orthogonal systems and the Cauchy problem are considered. Bibliography: 54 titles.
ISSN:0036-0279
1468-4829
DOI:10.1070/RM9846