Добірка наукової літератури з теми "Coupled evolution equations"
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Статті в журналах з теми "Coupled evolution equations"
Maruszewski, Bogdan. "Coupled evolution equations of deformable semiconductors." International Journal of Engineering Science 25, no. 2 (January 1987): 145–53. http://dx.doi.org/10.1016/0020-7225(87)90002-4.
Повний текст джерелаYusufoğlu, Elcin, and Ahmet Bekir. "Exact solutions of coupled nonlinear evolution equations." Chaos, Solitons & Fractals 37, no. 3 (August 2008): 842–48. http://dx.doi.org/10.1016/j.chaos.2006.09.074.
Повний текст джерелаNakagiri, Shin-ichi, and Jun-hong Ha. "COUPLED SINE-GORDON EQUATIONS AS NONLINEAR SECOND ORDER EVOLUTION EQUATIONS." Taiwanese Journal of Mathematics 5, no. 2 (June 2001): 297–315. http://dx.doi.org/10.11650/twjm/1500407338.
Повний текст джерелаKhan, K., and M. A. Akbar. "Solitary Wave Solutions of Some Coupled Nonlinear Evolution Equations." Journal of Scientific Research 6, no. 2 (April 23, 2014): 273–84. http://dx.doi.org/10.3329/jsr.v6i2.16671.
Повний текст джерелаMalfliet, W. "Travelling-wave solutions of coupled nonlinear evolution equations." Mathematics and Computers in Simulation 62, no. 1-2 (February 2003): 101–8. http://dx.doi.org/10.1016/s0378-4754(02)00182-9.
Повний текст джерелаAlabau, F., P. Cannarsa, and V. Komornik. "Indirect internal stabilization of weakly coupled evolution equations." Journal of Evolution Equations 2, no. 2 (May 1, 2002): 127–50. http://dx.doi.org/10.1007/s00028-002-8083-0.
Повний текст джерелаRYDER, E., and D. F. PARKER. "Coupled evolution equations for axially inhomogeneous optical fibres." IMA Journal of Applied Mathematics 49, no. 3 (1992): 293–309. http://dx.doi.org/10.1093/imamat/49.3.293.
Повний текст джерелаZhao, Dan, and Zhaqilao. "Darboux transformation approach for two new coupled nonlinear evolution equations." Modern Physics Letters B 34, no. 01 (December 6, 2019): 2050004. http://dx.doi.org/10.1142/s0217984920500049.
Повний текст джерелаKhan, Kamruzzaman, and M. Ali Akbar. "Traveling Wave Solutions of Some Coupled Nonlinear Evolution Equations." ISRN Mathematical Physics 2013 (May 20, 2013): 1–8. http://dx.doi.org/10.1155/2013/685736.
Повний текст джерелаWan, Qian, and Ti-Jun Xiao. "Exponential Stability of Two Coupled Second-Order Evolution Equations." Advances in Difference Equations 2011 (2011): 1–14. http://dx.doi.org/10.1155/2011/879649.
Повний текст джерелаДисертації з теми "Coupled evolution equations"
Pauletti, Miguel Sebastian. "Parametric AFEM for geometric evolution equations and coupled fluid-membrane interaction." College Park, Md.: University of Maryland, 2008. http://hdl.handle.net/1903/8603.
Повний текст джерелаThesis research directed by: Dept. of Mathematics. Title from t.p. of PDF. Includes bibliographical references. Published by UMI Dissertation Services, Ann Arbor, Mich. Also available in paper.
Brand, Christopher [Verfasser], and Georg [Akademischer Betreuer] Dolzmann. "Coupled Evolution Equations for Immersions of Closed Manifolds and Vector Fields / Christopher Brand ; Betreuer: Georg Dolzmann." Regensburg : Universitätsbibliothek Regensburg, 2019. http://d-nb.info/1185758143/34.
Повний текст джерелаTrad, Farah. "Stability of some hyperbolic systems with different types of controls under weak geometric conditions." Electronic Thesis or Diss., Valenciennes, Université Polytechnique Hauts-de-France, 2024. http://www.theses.fr/2024UPHF0015.
Повний текст джерелаThe purpose of this thesis is to investigate the stabilization of certain second order evolution equations. First, we focus on studying the stabilization of locally weakly coupled second order evolution equations of hyperbolic type, characterized by direct damping in only one of the two equations. As such systems are not exponentially stable , we are interested in determining polynomial energy decay rates. Our main contributions concern abstract strong and polynomial stability properties, which are derived from the stability properties of two auxiliary problems: the sole damped equation and the equation with a damping related to the coupling operator. The main novelty is thatthe polynomial energy decay rates are obtained in several important situations previously unaddressed, including the case where the coupling operator is neither partially coercive nor necessarily bounded. The main tools used in our study are the frequency domain approach combined with new multipliers technique based on the solutions of the resolvent equations of the aforementioned auxiliary problems. The abstract framework developed is then illustrated by several concrete examples not treated before. Next, the stabilization of a two-dimensional Kirchhoff plate equation with generalized acoustic boundary conditions is examined. Employing a spectrum approach combined with a general criteria of Arendt-Batty, we first establish the strong stability of our model. We then prove that the system doesn't decay exponentially. However, provided that the coefficients of the acoustic boundary conditions satisfy certain assumptions we prove that the energy satisfies varying polynomial energy decay rates depending on the behavior of our auxiliary system. We also investigate the decay rate on domains satisfying multiplier boundary conditions. Further, we present some appropriate examples and show that our assumptions have been set correctly. Finally, we consider a wave wave transmission problem with generalized acoustic boundary conditions in one dimensional space, where we investigate the stability theoretically and numerically. In the theoretical part we prove that our system is strongly stable. We then present diverse polynomial energy decay rates provided that the coefficients of the acoustic boundary conditions satisfy some assumptions. we give relevant examples to show that our assumptions are correct. In the numerical part, we study a numerical approximation of our system using finite volume discretization in a spatial variable and finite difference scheme in time
Lienstromberg, Christina. "On Microelectromechanical Systems with General Permittivity." Thesis, Université Paris-Saclay (ComUE), 2016. http://www.theses.fr/2016SACLN007/document.
Повний текст джерелаIn the framework of this thesis physical/mathematical models for microelectromechanical systems with general permittivity have been developed and analysed with modern mathematical methods from the domain of partial differential equations. In particular these systems are moving boundary problems and thus difficult to handle. Numerical methods have been developed in order to validate the obtained analytical results
Petraco, Nicholas Dominick Koslap. "Benchmark open-shell coupled cluster studies and the evolution of nonvariational solutions to the Schrödinger equation." 2002. http://purl.galileo.usg.edu/uga%5Fetd/petraco%5Fnicholas%5Fd%5F200205%5Fphd.
Повний текст джерелаDirected by Henary F. Schaefer, III. Includes articles published in, and an article submitted to The journal of chemical physics. Includes bibliographical references.
Частини книг з теми "Coupled evolution equations"
Crisan, Dan, and Prince Romeo Mensah. "Blow-Up of Strong Solutions of the Thermal Quasi-Geostrophic Equation." In Mathematics of Planet Earth, 1–14. Cham: Springer International Publishing, 2022. http://dx.doi.org/10.1007/978-3-031-18988-3_1.
Повний текст джерелаSaha Ray, Santanu. "New Exact Traveling Wave Solutions of the Coupled Schrödinger–Boussinesq Equations and Tzitzéica-Type Evolution Equations." In Nonlinear Differential Equations in Physics, 199–229. Singapore: Springer Singapore, 2019. http://dx.doi.org/10.1007/978-981-15-1656-6_6.
Повний текст джерелаEl Allaoui, Abdelati, Said Melliani, JinRong Wang, Youssef Allaoui, and Lalla Saadia Chadli. "A Generalized Coupled System of Impulsive Integro-Differential Evolution Equations with Mutual Boundary Values." In Lecture Notes in Networks and Systems, 1–16. Cham: Springer International Publishing, 2022. http://dx.doi.org/10.1007/978-3-031-12416-7_1.
Повний текст джерелаTakabe, Hideaki. "Introduction." In Springer Series in Plasma Science and Technology, 1–14. Cham: Springer International Publishing, 2024. http://dx.doi.org/10.1007/978-3-031-45473-8_1.
Повний текст джерелаZheng, Songmu. "Decay of Solutions to Linear Evolution Equations." In Nonlinear parabolic equations and hyperbolic-parabolic coupled systems, 33–68. Chapman and Hall/CRC, 2020. http://dx.doi.org/10.1201/9780429154225-2.
Повний текст джерелаNitzan, Abraham. "The quantum mechanical density operator and its time evolution." In Chemical Dynamics in Condensed Phases, 343–94. Oxford University PressOxford, 2024. http://dx.doi.org/10.1093/9780191947971.003.0010.
Повний текст джерела"General Relativity Evolution of the Photons in Dielectrics." In Quantum and Optical Dynamics of Matter for Nanotechnology, 361–89. IGI Global, 2014. http://dx.doi.org/10.4018/978-1-4666-4687-2.ch010.
Повний текст джерелаGerbeau, J. F., and C. Le Bris. "Mathematical Study of a Coupled System Arising in Magnetohydrodynamics." In Evolution Equations and Their Applications in Physical and Life Sciences, 355–67. CRC Press, 2019. http://dx.doi.org/10.1201/9780429187810-30.
Повний текст джерелаFilipovic, Nenad, Milos Radovic, Dalibor D. Nikolic, Igor Saveljic, Zarko Milosevic, Themis P. Exarchos, Gualtiero Pelosi, Dimitrios I. Fotiadis, and Oberdan Parodi. "Computer Predictive Model for Plaque Formation and Progression in the Artery." In Coronary and Cardiothoracic Critical Care, 220–45. IGI Global, 2019. http://dx.doi.org/10.4018/978-1-5225-8185-7.ch012.
Повний текст джерелаFilipovic, Nenad, Milos Radovic, Dalibor D. Nikolic, Igor Saveljic, Zarko Milosevic, Themis P. Exarchos, Gualtiero Pelosi, Dimitrios I. Fotiadis, and Oberdan Parodi. "Computer Predictive Model for Plaque Formation and Progression in the Artery." In Handbook of Research on Trends in the Diagnosis and Treatment of Chronic Conditions, 279–300. IGI Global, 2016. http://dx.doi.org/10.4018/978-1-4666-8828-5.ch013.
Повний текст джерелаТези доповідей конференцій з теми "Coupled evolution equations"
Wang, Ya-Guang. "A new approach to study hyperbolic-parabolic coupled systems." In Evolution Equations Propagation Phenomena - Global Existence - Influence of Non-Linearities. Warsaw: Institute of Mathematics Polish Academy of Sciences, 2003. http://dx.doi.org/10.4064/bc60-0-18.
Повний текст джерелаRomeo, Francesco, and Achille Paolone. "Propagation Properties of Three-Coupled Periodic Mechanical Systems." In ASME 2005 International Design Engineering Technical Conferences and Computers and Information in Engineering Conference. ASMEDC, 2005. http://dx.doi.org/10.1115/detc2005-85617.
Повний текст джерелаLeftheriotis, Georgios A., and Athanassios A. Dimas. "Coupled Simulation of Oscillatory Flow, Sediment Transport and Morphology Evolution of Ripples Based on the Immersed Boundary Method." In ASME 2014 33rd International Conference on Ocean, Offshore and Arctic Engineering. American Society of Mechanical Engineers, 2014. http://dx.doi.org/10.1115/omae2014-24006.
Повний текст джерелаLehmann, B., D. Kraus, and A. Kummert. "Coupled curve evolution equations for ternary images in sidescan-sonar images guided by Lamé curves for object recognition." In 2012 19th IEEE International Conference on Image Processing (ICIP 2012). IEEE, 2012. http://dx.doi.org/10.1109/icip.2012.6467419.
Повний текст джерелаde Freitas Rachid, Felipe Bastos, José Henrique Carneiro de Araujo, and Renan Martins Baptista. "A Fully-Coupled Transient Model for Predicting Interface Contamination in Product Pipelines." In ASME 2001 International Mechanical Engineering Congress and Exposition. American Society of Mechanical Engineers, 2001. http://dx.doi.org/10.1115/imece2001/htd-24180.
Повний текст джерелаSchrade, David, Bai-Xiang Xu, Ralf Mu¨ller, and Dietmar Gross. "On Phase Field Modeling of Ferroelectrics: Parameter Identification and Verification." In ASME 2008 Conference on Smart Materials, Adaptive Structures and Intelligent Systems. ASMEDC, 2008. http://dx.doi.org/10.1115/smasis2008-411.
Повний текст джерелаAceves, A. B., C. De Anglis, J. V. Moloney, and S. Wabnitz. "Counterpropagating waves in periodic nonlinear structures." In OSA Annual Meeting. Washington, D.C.: Optica Publishing Group, 1992. http://dx.doi.org/10.1364/oam.1992.mww3.
Повний текст джерелаTao, Sha, and Benxin Wu. "Early-Stage Evolution of Electrons Emitted From Metal Target Surface During Ultrashort Laser Ablation in Vacuum." In ASME 2011 International Mechanical Engineering Congress and Exposition. ASMEDC, 2011. http://dx.doi.org/10.1115/imece2011-63258.
Повний текст джерелаAthanassoulis, Gerassimos A., and Konstandinos A. Belibassakis. "A Nonlinear Coupled-Mode Model for Water Waves Over a General Bathymetry." In ASME 2002 21st International Conference on Offshore Mechanics and Arctic Engineering. ASMEDC, 2002. http://dx.doi.org/10.1115/omae2002-28411.
Повний текст джерелаKrishna, C. Vamsi, and Santosh Hemchandra. "Reduced Order Modelling of Combustion Instability in a Backward Facing Step Combustor." In ASME 2013 Gas Turbine India Conference. American Society of Mechanical Engineers, 2013. http://dx.doi.org/10.1115/gtindia2013-3559.
Повний текст джерелаЗвіти організацій з теми "Coupled evolution equations"
Zemach, Charles, and Susan Kurien. Notes from 1999 on computational algorithm of the Local Wave-Vector (LWV) model for the dynamical evolution of the second-rank velocity correlation tensor starting from the mean-flow-coupled Navier-Stokes equations. Office of Scientific and Technical Information (OSTI), November 2016. http://dx.doi.org/10.2172/1332214.
Повний текст джерела