On construction of asymptotic solution of the perturbed Klein-Gordon equation
We consider an application of the asymptotic method of nonlinear mechanics to the construction of an approximate solution of the Klein-Gordon equation.
Saved in:
| Date: | 1995 |
|---|---|
| Main Authors: | , |
| Format: | Article |
| Language: | Russian English |
| Published: |
Institute of Mathematics, NAS of Ukraine
1995
|
| Online Access: | https://umj.imath.kiev.ua/index.php/umj/article/view/5520 |
| 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
On the application of Ateb-functions to the construction of an asymptotic solution of the perturbed nonlinear Klein-Gordon equation
by: Mitropolskiy, Yu. A., et al.
Published: (1998)
by: Mitropolskiy, Yu. A., et al.
Published: (1998)
On the construction of an asymptotic solution of a perturbed Bretherton equation
by: Mitropolskiy, Yu. A., et al.
Published: (1998)
by: Mitropolskiy, Yu. A., et al.
Published: (1998)
On the application of Ateb-functions to the construction of a solution of a nonlinear Klein-Gordon equation
by: Sokil, B. I., et al.
Published: (1997)
by: Sokil, B. I., et al.
Published: (1997)
Remarks about Lp — Lq estimates for solutions of the Klein — Gordon equations
by: Markovsky , A. I., et al.
Published: (1992)
by: Markovsky , A. I., et al.
Published: (1992)
FD-method for solving the nonlinear Klein - Gordon equation
by: Dragunov, D. V., et al.
Published: (2012)
by: Dragunov, D. V., et al.
Published: (2012)
FD-method for solving the nonlinear Klein–Gordon equation
by: Dragunov, D.V., et al.
Published: (2012)
by: Dragunov, D.V., et al.
Published: (2012)
Stable difference scheme for a nonlinear Klein-Gordon equation
by: Nizhnik, L. P., et al.
Published: (1997)
by: Nizhnik, L. P., et al.
Published: (1997)
Standing Waves in Discrete Klein-Gordon Type Equations with Saturable Nonlinearities
by: S. M. Bak
Published: (2021)
by: S. M. Bak
Published: (2021)
Standing Waves in Discrete Klein-Gordon Type Equations with Saturable Nonlinearities
by: Бак, Сергій
Published: (2021)
by: Бак, Сергій
Published: (2021)
Algorithmic aspects of software implementation of the FD-method for solving the Klein – Gordon equation
by: V. L. Makarov, et al.
Published: (2013)
by: V. L. Makarov, et al.
Published: (2013)
Klein-Gordon Equation as a Result of Wave Equation Averaging on the Riemannian Manifold of Complex Microstructure
by: Khrabustovskyi, A.V.
Published: (2007)
by: Khrabustovskyi, A.V.
Published: (2007)
The Klein-Gordon Equation and Differential Substitutions of the Form v=φ(u,ux,uy)
by: Kuznetsova, M.N., et al.
Published: (2012)
by: Kuznetsova, M.N., et al.
Published: (2012)
Approximate solution of the Fokker-Planck-Kolmogorov equation
by: Mitropolskiy, Yu. A., et al.
Published: (1995)
by: Mitropolskiy, Yu. A., et al.
Published: (1995)
Global Attraction to Solitary Waves in Models Based on the Klein-Gordon Equatio
by: Komech, A.I., et al.
Published: (2008)
by: Komech, A.I., et al.
Published: (2008)
Classification of the Orthogonal Separable Webs for the Hamilton-Jacobi and Klein-Gordon Equations on 3-Dimensional Minkowski Space
by: Valero, Carlos, et al.
Published: (2022)
by: Valero, Carlos, et al.
Published: (2022)
Asymptotic decomposition of fully integrable Pfaff systems with perturbation
by: Mitropolsky , Yu. A., et al.
Published: (1988)
by: Mitropolsky , Yu. A., et al.
Published: (1988)
Evolution of sine-Gordon equation kinks in the presence of spatial perturbations
by: Ekomasov, E.G., et al.
Published: (2006)
by: Ekomasov, E.G., et al.
Published: (2006)
A functional discrete method (FD-method) for solving the Cauchy problem for a nonlinear Klein–Gordon equation
by: V. L. Makarov, et al.
Published: (2014)
by: V. L. Makarov, et al.
Published: (2014)
The convergence conditions and algorithmic aspects of the software implementation of the FD method for solving the Cauchy problem for the nonlinear Klein-Gordon equation
by: V. L. Makarov, et al.
Published: (2014)
by: V. L. Makarov, et al.
Published: (2014)
Constructing Asymptotic Soliton-Like Solution to the Singular Perturbed Korteweg-De Vries Equation with Special Coefficients
by: K. S. Zaitseva, et al.
Published: (2018)
by: K. S. Zaitseva, et al.
Published: (2018)
Construction of a Fundamental Solution of a Perturbed Parabolic Equation
by: Bondarenko, V. G., et al.
Published: (2003)
by: Bondarenko, V. G., et al.
Published: (2003)
Asymptotic methods in the theory of nonlinear random oscillations
by: Kolomiyets, V. G., et al.
Published: (1994)
by: Kolomiyets, V. G., et al.
Published: (1994)
Asymptotic solutions of singularly perturbed differential algebraic equations with turning points
by: M. O. Rashevskyi, et al.
Published: (2021)
by: M. O. Rashevskyi, et al.
Published: (2021)
Asymptotic behavior of the solutions of boundary-value
problems for singularly perturbed integro-differential equations
by: Dauylbayev, M. K., et al.
Published: (2026)
by: Dauylbayev, M. K., et al.
Published: (2026)
Asymptotic expansions of solutions to singularly perturbed systems
by: Shchitov, I. N., et al.
Published: (1993)
by: Shchitov, I. N., et al.
Published: (1993)
Asymptotic Σ-solutions to singularly perturbed Benjamin–Bona–Mahony equation with variable coefficients
by: V. H. Samoilenko, et al.
Published: (2018)
by: V. H. Samoilenko, et al.
Published: (2018)
Diatomic molecules with the improved deformed generalized deng–fan potential plus deformed eckart potential model through the solutions of the modified Klein–Gordon and Schrцdinger equations within NCQM symmetries
by: A. Maireche
Published: (2022)
by: A. Maireche
Published: (2022)
Diatomic molecules with the improved deformed generalized deng–fan potential plus deformed eckart potential model through the solutions of the modified Klein–Gordon and Schrцdinger equations within NCQM symmetries
by: A. Maireche
Published: (2022)
by: A. Maireche
Published: (2022)
Asymptotic stepwise solutions of the Korteweg-de Vries equation with a singular perturbation and their accuracy
by: S. I. Lyashko, et al.
Published: (2021)
by: S. I. Lyashko, et al.
Published: (2021)
Asymptotic $Σ$-solutions to singularly perturbed
Benjamin – Bona – Mahony equation with variable coefficients
by: Samoilenko, V. G., et al.
Published: (2018)
by: Samoilenko, V. G., et al.
Published: (2018)
Asymptotics of solutions of discontinuous singularly perturbed boundary-value problems
by: Mel'nik, T. A., et al.
Published: (1999)
by: Mel'nik, T. A., et al.
Published: (1999)
Asymptotic behavior of the solutions of boundary-value problems for singularly perturbed integro-differential equations
by: M. K. Dauylbaev, et al.
Published: (2019)
by: M. K. Dauylbaev, et al.
Published: (2019)
Asymptotic multiphase Sigma-solutions to the singularly perturbed Korteweg-de Vries equation with variable coefficients
by: V. H. Samoilenko, et al.
Published: (2014)
by: V. H. Samoilenko, et al.
Published: (2014)
Asymptotic behavior of a class of perturbed differential equations
by: Dorgham, A., et al.
Published: (2021)
by: Dorgham, A., et al.
Published: (2021)
Asymptotic behavior of a class of perturbed differential equations
by: A. Dorgham, et al.
Published: (2021)
by: A. Dorgham, et al.
Published: (2021)
Asymptotic solutions of the Cauchy problem for the singularly perturbed Korteweg-de Vries equation with variable coefficients
by: Samoilenko, V. G., et al.
Published: (2007)
by: Samoilenko, V. G., et al.
Published: (2007)
Asymptotics of a solution of a discontinuous singularly perturbed Cauchy problem
by: Mel'nik, T. A., et al.
Published: (1994)
by: Mel'nik, T. A., et al.
Published: (1994)
On the influence of integral perturbations to the asymptotic stability of solutions of a second-order linear differential equation
by: S. Iskandarov, et al.
Published: (2020)
by: S. Iskandarov, et al.
Published: (2020)
On weak convergence of solutions of random perturbed evolution equations
by: Kolomiets, Yu. V., et al.
Published: (1995)
by: Kolomiets, Yu. V., et al.
Published: (1995)
Asymptotic solutions of soliton type of the Korteweg–de Vries equation with variable coefficients and singular perturbation
by: V. H. Samoilenko, et al.
Published: (2019)
by: V. H. Samoilenko, et al.
Published: (2019)