226: 2009: Stunde(2020-12-16), Vorlesung Analysis 1, 28. Computational and Numerical Analysis of Transient Problems in Acoustics, Elasticity, and Electromagnetism (16w5071) Christian Lubich (University of Tuebingen), Peter Monk (University of Delaware) January 17, 2016 - January 22, 2016 1 Overview of the Field Wave propagation underlies several important technologies that are at the center of our . Im Buch gefunden – Seite 486( Scandinavian university books ) ISBN Sport medicine : physiology . ... T. Lubich , anno accademico 1972-73 . ... Tübingen . Proskurov , Vaslui Anatol'evich . KÜnika 1 lechenle DNLM : W1 AR125QR Bd.52 1973 stafilokokkovykh zabolevani . Tuebingen Verified email at na.uni-tuebingen.de. Mathematisches Institut, Universität Tübingen, Germany E-mail: Lubich@na.uni-tuebingen.de. D-72076 Tübingen, Phone: +49 7071 29 72935 numerical analysis and simulation, Strong rates of convergence for a space-time discretization of the stochastic Allen-Cahn equation with multiplicative noise, Optimal control for the thin-film equation: Convergence of a multi-parameter approach to track state constraints avoiding degeneracies, Convergence of a θ-scheme to solve the stochastic nonlinear Schrodinger equation with Stratonovich noise, Optimal Control in Evolutionary Micromagnetism, Finite element approximations of the stochastic mean curvature flow of planar curves of graphs, An inverse curvature flow in a spacetime with a future singularity, A note on inverse mean curvature flow in cosmological spacetimes, Convergent Finite Element Based Discretization of the Stochastic Landau-Lifshitz-Gilbert Equation, Control of Interface Evolution in Multi-Phase Fluid Flows, The role of noise in finite ensembles of nanomagnetic particles, Rates of Convergence For Discretisations of Stochastic Incompressible Navier-Stokes Equations, Attractivity, Invariance and Ergodicity For SDEs On Riemannian Manifolds, Approximate Euler Method For Parabolic Stochastic Partial Differential Equations Driven by Space-Time Lévy Noise, Finite Element Based Discretizations of the Incompressible Navier-Stokes Equations With Multiplicative Random Forcing, Hyperbolic formulations of General Relativity with Hamiltonian structure, Convergent Finite Element Based Discretization of the Stochastic Landau-Lifshitz-Gilbert Equations, Time-splitting methods to solve the stochastic incompressible stokes equation, Convergent Finite Element Discretization of the Multi-fluid Nonstationary Incompressible Magnetohydrodynamics Equations, Domain Decomposition Strategies For the Stochastic Heat Equation, Strongly hyperbolic Hamiltonian systems in numerical relativity: Formulation and symplectic integration, Convergent Finite Element Discretization of the Navier-Stokes Korteweg System For Liquid-Vapor Phase Transition, Convergent Finite Element Discretizations of the Navier-Stokes-Nernst-Planck-Poisson System, Finite Element Approximations of Harmonic Map Heat Flows and Wave Map into Spheres of Nonconstant Radii, Discreted ifferential forms for cosmological space-times, Splitting integrators for skew-hermitian systems of stochastic differential equations, Convergent Finite Element Discretizations of the Nonstationary Incompressible Magnetohydrodynamics System, Finite Element Discretization of Motions of Incompressible Generalized Newtonian Flows, A Note On Pressure Approximation of First and Higher Order Projection Schemes For the Nonstationary Incompressible Navier-Stokes Equations, Convergence of an Implicit Finite Element Discretization for a Class of Parabolic Equations With Nonstandard Anisotropic Growth Conditions, Analysis of the Navier-Stokes-Nernst-Planck-Poisson System, Convergent Discretizations for the Nernst-Planck-Poisson System, On Pressure Approximation via Projection Methods for nonstationary incompressible Navier-Stokes Equations, Modelling of thermally assisted magnetodynamics, Convergence of a Finite Element based Space-Time Discretization in Elastodynamics, A convergent implicit discretization of the Maxwell-Landau-Lifshitz-Gilbert equation, Finite element approximations of the Ericksen-Lesie model for nematic liquid crystal flow, Error analysis of finite element approximations of the inverse mean curvature flow arising from the general relativity, Finite Element approximations of wave maps into spheres, Fully Practical, Constraint Preserving, Implicit Approximation of Harmonic Map Heat Flow Into Spheres, Convergence of an Implicit, Constraint Preserving Finite Element Discretization of p-Harmonic Heat Flow Into Spheres, Stable Discretization of Scalar and Constrained Vectorial Perona-Malik Equation. lubich@na.uni-tuebingen.de Abstract In a recen t pap er, Sto er sho w ed that w eakly attractiv e in v arian t tori of dissipativ e . Stunde(2020-12-14), Vorlesung Analysis 1, 27. Stunde(2020-12-02), Vorlesung Analysis 1, 20. Tuebingen Verified email at na.uni-tuebingen.de. Bal´azs Kova´cs and Christian Lubich Mathematisches Institut, University of Tu¨bingen, Auf der Morgenstelle 10, 72076 Tu¨bingen, Germany kovacs@na.uni-tuebingen.de, lubich@na.uni-tuebingen.de Maxwell's equations are considered with transparent boundary conditions, for initial con- 1274 C. LUBICH, B. VANDEREYCKEN, AND H. WALACH where C(t) 2R r 1 d is the time-dependent core tensor of full multilinear rank with entries c ' 1;:::;' d (t), and U i(t) is the mode-itime-dependent basis matrix of size n i r i with entries u (i) k i;' i (t).. Erich Carelli, Alexander Müller, Andreas Prohl. . Ľubomír Baňas, Andreas Prohl, and Marián Slodička. An error analysis of the multi-configuration time-dependent Hartree method of quantum dynamics - Volume 44 Issue 4 E-mail: lubich (at) na.uni-tuebingen.de. Thomas Dunst, Erika Hausenblas, Andreas Prohl. A novel algorithmic approach is presented for the problem of partitioning a connected undirected weighted graph under constraints such as cardinality or membership requirements or must-link and cannot-link constraints. Stunde(2020-12-16), Vorlesung Analysis 1, 29. Jan Bohn, Michael Feischl, Balázs Kovács. title: Vorlesung Analysis 1, 6. Stunde(2021-02-17), Vorlesung Analysis 1, 57. E-mail: Lubich@na.uni-tuebingen.de Ordinary differential equations have been used for more than 300 years; a few of them can be solved analytically, but most of them, and practically all appearing This is the published version of a paper published in SIAM Journal on Numerical Analysis . Im Buch gefunden – Seite 1067[ 4 ] J.C. Butcher , The Numerical Analysis of Ordinary Differential Equations , J. Wiley & Sons , 1987 . ( 5 ) T. Eirola , Invariant curves of one - step ... E - mail address : lubichona.uni-tuebingen.de 2. Qualitative properties . Stunde(2020-11-30), Vorlesung Analysis 1, 19. As an impetus he gave me some ideas how Mathematical Institut University of Tübingen Auf der Morgenstelle 10. Dominik Sulz M. Sc. Runge---Kutta Time Discretization of Nonlinear Parabolic Equations Studied via Discrete Maximal Parabolic Regularity. Stunde(2021-02-10), Vorlesung Analysis 1, 53. SIAM Journal on Numerical Analysis 47 (1), 227-249, 2009. (2018), and then consider different examples of wave equations with dynamic boundary conditions fitting into this abstract framework. lubich@na.uni-tuebingen.de Article published by EDP Sciences c EDP Sciences, SMAI 2010 In contrast to (1.5), the approx-imation yn+1 is dened implicitly by (1.6), and the implementation requires the 2 L. Gauckler, E. Hairer, and Ch. ; 2 Department of Pharmacology, Toxicology and Clinical Pharmacy, Institute of Pharmacy, University of Tuebingen, Auf der Morgenstelle 8, D-72076 Tuebingen, Germany. They are restated as matrix nearness problems for the weight matrix of the graph, where the . Jonas Kusch, Gianluca Ceruti, Lukas Einkemmer, Martin Frank. Computing quantum dynamics in the One-step formulations Introducing the velocity ˙q = v turns equation (1.1) into a first-order system of doubled dimension q˙ = v, v˙ = f(q), (1.3) an equation in the so-called phase space.In analogy to this, we introduce E. Hairer and Ch. Stunde(2021-01-13), Vorlesung Analysis 1, 37. Affiliations 1 Institute for Ophthalmic Research, Centre for Ophthalmology, University of Tuebingen, Elfriede-Aulhorn-Strasse 7, D-72076 Tuebingen, Germany. Stunde(2020-11-23), Vorlesung Analysis 1, 14. Marco Caliari Ricercatore di Analisi Numerica, University of Verona Verified email at univr.it. Stunde(2020-12-21), Vorlesung Analysis 1, 30. email: lubich@na.uni-tuebingen.de Abstract. Long-time analysis of nonlinearly perturbed wave equations via modulated Fourier expansions D. COHEN 1, 2, E. HAIRER and CH.LUBICH April 26, 2006 1 Dept. Stunde(2021-02-03), Vorlesung Analysis 1, 49. E-mail: Lubich@na.uni-tuebingen.de. - 1/7/2008-31/12/2008, University of Tuebingen (Germany), scientific collaboration with prof. Christian Lubich. Tuebingen Verified email at na.uni-tuebingen.de. Long-term analysis of semilinear wave equations with slowly varying wave speed 3 Im Buch gefunden – Seite 399... Christian Lubich Mathematisches Institut , Universität Tübingen , Germany E - mail : Lubichona.uni-tuebingen.de Gerhard ... backward error analysis , which translates the geometric properties of the method into the structure of a ... Im Buch gefunden – Seite 710Comput., vol 15, no 1, pages 139-148. HOCHBRUCK,M., (1996), The Pade table and its relation to certain numerical algorithm, Habilitationsschrift, Universitat Tubingen. HOCHBRUCK,M., LUBICH,C., (1996), Error analysis of Krylov methods ... Imran H Biswas, Ananta K Majee, Guy Vallet. Lubich 1.1 Motion of charged particles in a strong magnetic eld We consider the di erential equation that determines the position x(t) 2R3 . email: lubich@na.uni-tuebingen.de Abstract. Im Buch gefunden – Seite viStructure-Preserving Algorithms for Ordinary Differential Equations Ernst Hairer, Christian Lubich, Gerhard Wanner ... can then be obtained by combining this backward error analysis with KAM theory and related perturbation theories. Long-term analysis of the Störmer-Verlet method for Hamiltonian systems with a solution-dependent high frequency. After secondary education at the Bundesrealgymnasium in Innsbruck, Lubich studied mathematics at the University of Innsbruck from 1977 to graduation with Magister degree in 1981. Stunde(2020-11-18), Vorlesung Analysis 1, 12. Lévy noise, Discrete maximum principles for nonlinear elliptic finite element problems on Riemannian manifolds with boundary, A fast matrix-free spectral method for the nonlinear Schrödinger equation, Convergence of a decoupled mixed FEM for the dynamic Ginzburg–Landau equations in nonsmooth domains with incompatible initial data, A splitting integrator for the BCS equations of superconductivity, The forward-backward stochastic heat equation:
He was from 1979 to 1981 a student assistant in Innsbruck and from 1981 to 1983 a research associate in the Sonderforschungsbereich 123 Stochastische mathematische Modelle at the University of . D Cohen, E Hairer, C Lubich. Stunde(2020-11-11), Vorlesung Analysis 1, 9. Im Buch gefunden – Seite 576[Lor06] K. Lorenz, Adiabatische Integratoren für hochoszillatorische mechanische Systeme, Doctoral thesis, Univ. Tübingen (2006). [LJL05] K. Lorenz, T. Jahnke & C. Lubich, Adiabatic integrators for highly oscillatory second order linear ... Implicit Euler Method. Martin Ondreját, Andreas Prohl, Noel J. Walkington. Peer C. Kunstmann. Tuebingen Verified email at na.uni-tuebingen.de. 293-305. Im Buch gefunden – Seite xvi... of Technology portfolio theory [V.10] Christian Lubich, Professor, Mathematisches Institut, Universität Tübingen ... the shallow-water equations [III.27], the wave equation [III.31], complex analysis [IV.1] Youssef Marzouk, ... DFG project Ho 1577/4-1 and -2, Iterative methods for time-dependent differential equations, 2003 - 2006. Christian Lubich Mathematics, Univ. semiclassical regime. title: creator: Lubich, Christian (author) subjects: Mathematik, Analysis, Vorlesung description: Vorlesung im WiSe 2020 . Stunde. Mathematics Department, Heriot-Watt University, Edinburgh - Cited by 1,139 - Numerical analysis . From quantum to classical molecular dynamics: reduced models and numerical analysis. CHRISTIAN LUBICH1 1Mathematisches Institut, Universit¨at T¨ubingen, Auf der Morgenstelle 10, D-72076 T¨ubingen, Germany. Stunde(2021-01-11), Vorlesung Analysis 1, 35. Dimitra Antonopoulou, Ľubomír Baňas, Robert Nürnberg, Andreas Prohl. the LotkaŒVolterra problem (1.1) (with h = 0:5) are represented in the third picture of Fig.1.1. Im Buch gefunden – Seite 6137 ) " y 0.6 Zhang & Gross 0.4 о This work 0.2 0.0 0 1 ... Dr. C. Lubich , Institute of Mathematics , University of Tübingen , Germany , for many useful discussions on his convolution quadrature ... Analysis by a Novel Time - Domain BEM 613. Nonreflecting boundary conditions for problems of wave propagation are nonlocal in space and time. Germany. The di erential equation for Y(t) 2Mis obtained by projecting F(t;Y(t)) (or A(t) in the case of a given explicit time-dependent . 1 Dipartimento di Matematica ed Informatica, Universit`a degli studi di Salerno, Via ponte don Melillo, 84084 Fisciano (SA), Italy. Stunde(2021-01-27), Vorlesung Analysis 1, 44. Lubich 1 Introduction We consider semilinear wave equations @2 t u= c("t)2u + g(u) on a bounded . Stunde(2020-11-18), Vorlesung Analysis 1, 13. We present novel time integration schemes for Newtonian dynamics Ľubomír Baňas, Zdzislaw Brzeźniak, Mikhail Neklyudov, Andreas Prohl. 19 Avril 2013 - 19 Avril 2013 Numerical challenges in relativistic quantum mechanics 20 Avril 2013 - 20 Avril 2013 Spectral Theory of Coulomb Systems - Symposion in honor of Heinz Siedentop on the occasion of his 60th birthday Second edition, Springer, 2006. Xiaobing Feng, Michael Neilan, Andreas Prohl. The Princeton Companion to Applied Mathematics, ed. I searched at the university Internet sites for someone who could supervise me within these elds: nonstandard analysis and operator algebras. Im Buch gefunden – Seite 2207Lubich , Christian , Dr. rer . nat . , o . Prof. U Tübingen ; d : Univ . , Mathemati- ( Red . ) sches Inst . , AB Numerische Mathematik , Auf der Morgenstelle 10 , D - 72076 Luboldt , Hans - Joachim , Dr. med . , PD U Duisburg - Essen ... Jörg Nick, Balázs Kovács, Christian Lubich, Time-dependent electromagnetic scattering from thin layers, March . Full discretisation of semi-linear stochastic wave equations driven by multiplicative noise. BLUE BOOK: Ch. Quasi-linear parabolic equations are discretised in time by fully implicit backward difference formulae (BDF) as well as by implicit---explicit and linearly implicit BDF methods up to order five. This article reviews convolution quadrature and its uses, extends the known approx-imation results for the case of sectorial Laplace transforms to finite-part convolutions Tuebingen Verified email at na.uni-tuebingen.de Li, Buyang Hong Kong Polytechnic University Verified email at polyu.edu.hk Karátson János ELTE Matematikai Intézet & BME Matematikai Intézet Verified email at cs.elte.hu Stunde(2020-11-02), Vorlesung Analysis 1, 3. Stunde(2021-02-01), Vorlesung Analysis 1, 46. Donnerstag 8:00-9:30. U. Archive for rational mechanics and analysis 187 (2), 341-368. , 2008. Im Buch gefunden – Seite 469Mathematisches Institut, Universität Tübingen, Auf der Morgenstelle 10, 72076 Tübingen, Germany e-mail: lubich ... the following combinations of dynamics/equations have been selected for a detailed discussion: 1.
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