A scheme of variable separation for matrix bilinear functional equation and its use
Necessary and sufficient conditions for the solvability of a bilinear matrix functional equation are presented. The conditions are applied in the construction of the solutions of systems of partial differential equations.
Saved in:
| Date: | 1992 |
|---|---|
| Main Authors: | , , , |
| Format: | Article |
| Language: | Ukrainian |
| Published: |
Institute of Mathematics, NAS of Ukraine
1992
|
| Online Access: | https://umj.imath.kiev.ua/index.php/umj/article/view/8170 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Journal Title: | Ukrains’kyi Matematychnyi Zhurnal |
| Download file: |  |
Institution
Ukrains’kyi Matematychnyi ZhurnalSimilar Items
Best Bilinear Approximations for the Classes of Functions of Many Variables
by: A. S. Romanjuk, et al.
Published: (2013)
by: A. S. Romanjuk, et al.
Published: (2013)
Best Bilinear Approximations for the Classes of Functions of Many Variables
by: Romanyuk, A. S., et al.
Published: (2013)
by: Romanyuk, A. S., et al.
Published: (2013)
Best trigonometric and bilinear approximations for the Besov classes of functions of many variables
by: Romanyuk, A. S., et al.
Published: (1995)
by: Romanyuk, A. S., et al.
Published: (1995)
Kolmogorov widths and bilinear approximations of the classes of periodic functions of one and many variables
by: A. S. Romaniuk
Published: (2018)
by: A. S. Romaniuk
Published: (2018)
Kolmogorov widths and bilinear approximations of the classes of periodic
functions of one and many variables
by: Romanyuk, A. S., et al.
Published: (2018)
by: Romanyuk, A. S., et al.
Published: (2018)
Estimates for bilinear approximations of the classes TeX of periodic functions of two variables
by: Solich, K. V., et al.
Published: (2012)
by: Solich, K. V., et al.
Published: (2012)
Asymptotic estimates for the best trigonometric and bilinear approximations of classes of functions of several variables
by: Romanyuk, A. S., et al.
Published: (2010)
by: Romanyuk, A. S., et al.
Published: (2010)
Separation of variables in two-dimensional wave equations with potential
by: Fushchich, V. I., et al.
Published: (1994)
by: Fushchich, V. I., et al.
Published: (1994)
Bilinear approximations of the classes S(Щ (с,и))B of periodic functions of many variables
by: K. V. Solich, et al.
Published: (2017)
by: K. V. Solich, et al.
Published: (2017)
Some Problems of Simultaneous Approximation of Functions of Two Variables and Their Derivatives by Interpolation Bilinear Splines
by: Vakarchuk, S. B., et al.
Published: (2005)
by: Vakarchuk, S. B., et al.
Published: (2005)
Separation of variables in the two-dimensional wave equation with potential
by: Zhdanov, R.Z., et al.
Published: (1994)
by: Zhdanov, R.Z., et al.
Published: (1994)
Best bilinear approximations of the classes $S^{\Omega}_{p, \theta}B$ of periodic functions of many variables
by: Solich, K. V., et al.
Published: (2011)
by: Solich, K. V., et al.
Published: (2011)
Exact penalty functions in schemes of decomposition of variables
by: Ju. P. Laptin
Published: (2014)
by: Ju. P. Laptin
Published: (2014)
Generalized separation of variables and exact
solutions of nonlinear equations
by: Barannyk, T. A., et al.
Published: (2010)
by: Barannyk, T. A., et al.
Published: (2010)
Bilinear approximation of kernels of Volterra equation of the second kind
by: Verlan, D.A.
Published: (2012)
by: Verlan, D.A.
Published: (2012)
The best trigonometric and bilinear approximations of the functions of many variables from the classes $B_{p,\theta}^r$. I
by: Romanyuk, A.S., et al.
Published: (1992)
by: Romanyuk, A.S., et al.
Published: (1992)
Exact penalty functions and convex extension of functions in schemes of decomposition in variables
by: Ju. P. Laptin
Published: (2016)
by: Ju. P. Laptin
Published: (2016)
The best trigonometric and bilinear approximations for functions of many variables from the classes $B^r_{p, \theta}$. II
by: Romanyuk, A. S., et al.
Published: (1993)
by: Romanyuk, A. S., et al.
Published: (1993)
Separately continuous functions with respect to a variable frame
by: Herasymchuk, V. H., et al.
Published: (2004)
by: Herasymchuk, V. H., et al.
Published: (2004)
On the optimal renewal of bilinear functionals in linear Normed spaces
by: Babenko, V. F., et al.
Published: (1997)
by: Babenko, V. F., et al.
Published: (1997)
Exact solutions with generalized separation of variables of the nonlinear heat equation
by: A. F. Barannyk, et al.
Published: (2022)
by: A. F. Barannyk, et al.
Published: (2022)
Generalized procedure of separation of variables and reduction of nonlinear wave equations
by: Barannyk, T. A., et al.
Published: (2009)
by: Barannyk, T. A., et al.
Published: (2009)
The exact solutions with generalized separation of variables of the nonlinear heat equation
by: Barannyk, A. F., et al.
Published: (2022)
by: Barannyk, A. F., et al.
Published: (2022)
Best bilinear approximations of functions from Nikolskii-Besov classes
by: Romanyuk, A. S., et al.
Published: (2012)
by: Romanyuk, A. S., et al.
Published: (2012)
The scheme of relation between characteristic thermo- dynamic functions and their variable parameters
by: H. A. Rudnytska, et al.
Published: (2011)
by: H. A. Rudnytska, et al.
Published: (2011)
Solutions of Helmholtz and Schrödinger Equations with Side Condition and Nonregular Separation of Variables
by: Broadbridge, P., et al.
Published: (2012)
by: Broadbridge, P., et al.
Published: (2012)
Separation of Variables and the Geometry of Jacobians
by: Hurtubise, J.
Published: (2007)
by: Hurtubise, J.
Published: (2007)
On the error of the interpolation by bilinear splines
by: Shabozov, M. Sh., et al.
Published: (1994)
by: Shabozov, M. Sh., et al.
Published: (1994)
Study of properties of firmness of solutions of equations with partial derivatives by the method of separation of variables
by: Bugir, M. K., et al.
Published: (1992)
by: Bugir, M. K., et al.
Published: (1992)
Exact solutions with generalized separation of variables for the nonlinear heat equation with a source
by: A. Barannyk, et al.
Published: (2024)
by: A. Barannyk, et al.
Published: (2024)
Exact solutions with generalized separation of variables for the nonlinear heat equation with a source
by: Barannyk, A., et al.
Published: (2024)
by: Barannyk, A., et al.
Published: (2024)
Symmetry Operators and Separation of Variables for Dirac's Equation on Two-Dimensional Spin Manifolds
by: Carignano, A., et al.
Published: (2011)
by: Carignano, A., et al.
Published: (2011)
Схема відокремлення змінних для матричного білінійного функціонального рівняння та її застосування
by: Каленюк, П.І., et al.
Published: (1992)
by: Каленюк, П.І., et al.
Published: (1992)
Про дію диференціального виразу нескінченного порядку в класах цілих функцій багатьох комплексних змінних
by: Каленюк, П.І., et al.
Published: (2007)
by: Каленюк, П.І., et al.
Published: (2007)
Deformation Quantization with Separation of Variables of ₂‚₄(ℂ)
by: Okuda, Taika, et al.
Published: (2025)
by: Okuda, Taika, et al.
Published: (2025)
Separation of Variables and Superintegrability on Riemannian Coverings
by: Chanu, Claudia Maria, et al.
Published: (2023)
by: Chanu, Claudia Maria, et al.
Published: (2023)
On Darboux's Approach to R-Separability of Variables
by: Sym, A., et al.
Published: (2011)
by: Sym, A., et al.
Published: (2011)
On separable and \(H\)-separable polynomials in skew polynomial rings of several variables
by: Ikehata, Shuichi
Published: (2018)
by: Ikehata, Shuichi
Published: (2018)
Block-Separation of Variables: a Form of Partial Separation for Natural Hamiltonians
by: Chanu, C.M., et al.
Published: (2019)
by: Chanu, C.M., et al.
Published: (2019)
On separable and H-separable polynomials in skew polynomial rings of several variables
by: Ikehata, S.
Published: (2010)
by: Ikehata, S.
Published: (2010)