Logo BSU

  1. Электронная библиотека БГУ
Issue Date Author Title Subject

Browsing by Author Lomovtsev, F. E.

Jump to: 0-9 A B C D E F G H I J K L M N O P Q R S T U V W X Y Z

А Б В Г Д Е Ж З И Й К Л М Н О П Р С Т У Ф Х Ц Ч Ш Щ Ъ Ы Ь Э Ю Я

or enter first few letters:  
Showing results 1 to 20 of 22  next >
PreviewIssue DateTitleAuthor(s)
2008A Generalization of Lions’ Theorems to Accretive Operator Coefficients for First-Order Operator-Differential Equations with Variable DomainsLomovtsev, F. E.
2006A Generalization of Lions’ Theory to First-Order Evolution Differential Equations with Smooth Operator Coefficients:Lomovtsev, F. E.
2006A Generalization of the Lions Theory for First-Order Evolution Differential Equations with Smooth Operator Coefficients: IILomovtsev, F. E.
2010Boundary Value Problems for Complete Partial Differential Equations of Variable OrderLomovtsev, F. E.
2005Boundary Value Problems for Complete Quasi-Hyperbolic Di erential Equations with Variable Domains of Smooth Operator Coe cients: IILomovtsev, F. E.
2004Boundary Value Problems for Complete Quasi-Hyperbolic Differential Equations with Variable Domains of Smooth Operator Coefficients: ILomovtsev, F. E.
2008Boundary Value Problems for Complete Quasi-Parabolic Di®erential Equations of Odd Order with Variable Domains of OperatorsLomovtsev, F. E.
2007Cauchy Problem for Quasihyperbolic Factorized Differential Equations with Variable Domains of Discontinuous OperatorsLomovtsev, F. E.
2007Cauchy Problems for Quasi-Hyperbolic Factorized Even-Order Differential Equations with Smooth Operator Coefficients Having Variable DomainsLomovtsev, F. E.
2008Euler–Poisson–Darboux Differential-Operator Equation with Variable Domains of Smooth OperatorsLomovtsev, F. E.; Khodos, S. P.
2021First mixed problem for general telegraph equation with variable coefficients on a segmentLomovtsev, F. E.
2008First-Order Differential Equations with Variable Domains of Piecewise Smooth Operator CoefficientsLomovtsev, F. E.; Vasilevsky, K. V.
2009Generalization of the Lions Theory for First-Order Evolution Differential Equations with Discontinuous Operators and with α ∈ [1/2, 1]Lomovtsev, F. E.
2012Goursat Problem for Two-Dimensional Second-Order Hyperbolic Operator-Differential Equations with Variable DomainsLomovtsev, F. E.; Motevich, A. V.
2012Goursat problem for two-dimensional second-order hyperbolic operator-differential equations with variable domainsLomovtsev, F. E.; Motevich, A. V.
2011Nonlocal Problem for Complete Second-Order Hyperbolic Operator-Differential Equations with Variable DomainsKhatimtsov, N. A.; Lomovtsev, F. E.
2005On a Stable Approximation to Boundary Value Problems for Evolution Operator-Di erential Equations with Variable DomainsLomovtsev, F. E.
2024Riemann formulas of classical solutions to the second mixed problem for the general telegraph equation with variable coefficients on a segmentLomovtsev, F. E.
2001Smoothness of Strong Solutions of Complete Hyperbolic Second-Order Di erential Equations with Variable Domains of Operator Coe cientsLomovtsev, F. E.
2000The Cauchy Problem for Complete Second-Order Hyperbolic Differential Equations with Variable Domains of Operator CoefficientsLomovtsev, F. E.
Showing results 1 to 20 of 22  next >