Literatura académica sobre el tema "Neumann boundary control problems"
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Artículos de revistas sobre el tema "Neumann boundary control problems"
López, Ginés y Juan-Aurelio Montero-Sánchez. "Neumann boundary value problems across resonance". ESAIM: Control, Optimisation and Calculus of Variations 12, n.º 3 (20 de junio de 2006): 398–408. http://dx.doi.org/10.1051/cocv:2006009.
Texto completoKowalewski, Adam y Anna Krakowiak. "Optimal boundary control problems of retarded parabolic systems". Archives of Control Sciences 23, n.º 3 (1 de septiembre de 2013): 261–79. http://dx.doi.org/10.2478/acsc-2013-0016.
Texto completoBollo, Carolina M., Claudia M. Gariboldi y Domingo A. Tarzia. "Neumann boundary optimal control problems governed by parabolic variational equalities". Control and Cybernetics 50, n.º 2 (1 de junio de 2021): 227–52. http://dx.doi.org/10.2478/candc-2021-0012.
Texto completoHamamuki, Nao y Qing Liu. "A deterministic game interpretation for fully nonlinear parabolic equations with dynamic boundary conditions". ESAIM: Control, Optimisation and Calculus of Variations 26 (2020): 13. http://dx.doi.org/10.1051/cocv/2019076.
Texto completoGunzburger, Max D., Hyung-Chun Lee y Jangwoon Lee. "Error Estimates of Stochastic Optimal Neumann Boundary Control Problems". SIAM Journal on Numerical Analysis 49, n.º 4 (enero de 2011): 1532–52. http://dx.doi.org/10.1137/100801731.
Texto completoEppler, Karsten y Helmut Harbrecht. "Tracking Neumann Data for Stationary Free Boundary Problems". SIAM Journal on Control and Optimization 48, n.º 5 (enero de 2010): 2901–16. http://dx.doi.org/10.1137/080733760.
Texto completoWerner, K. D. "Boundary value control problems involving the bessel differential operator". Journal of the Australian Mathematical Society. Series B. Applied Mathematics 27, n.º 4 (abril de 1986): 453–72. http://dx.doi.org/10.1017/s0334270000005075.
Texto completoKowalewski, Adam y Marek Miśkowicz. "Extremal Problems for Infinite Order Parabolic Systems with Boundary Conditions Involving Integral Time Lags". Pomiary Automatyka Robotyka 26, n.º 4 (20 de diciembre de 2022): 37–42. http://dx.doi.org/10.14313/par_246/37.
Texto completoWong, Kar Hung. "On the computational algorithms for time-lag optimal control problems". Bulletin of the Australian Mathematical Society 32, n.º 2 (octubre de 1985): 309–11. http://dx.doi.org/10.1017/s0004972700009989.
Texto completoKrumbiegel, K. y J. Pfefferer. "Superconvergence for Neumann boundary control problems governed by semilinear elliptic equations". Computational Optimization and Applications 61, n.º 2 (2 de diciembre de 2014): 373–408. http://dx.doi.org/10.1007/s10589-014-9718-0.
Texto completoTesis sobre el tema "Neumann boundary control problems"
Pfefferer, Johannes [Verfasser], Thomas [Akademischer Betreuer] Apel y Arnd [Akademischer Betreuer] Rösch. "Numerical analysis for elliptic Neumann boundary control problems on polygonal domains / Johannes Pfefferer. Universität der Bundeswehr München, Fakultät für Bauingenieurwesen und Umweltwissenschaften. Gutachter: Thomas Apel ; Arnd Rösch. Betreuer: Thomas Apel". Neubiberg : Universitätsbibliothek der Universität der Bundeswehr München, 2014. http://d-nb.info/1054706824/34.
Texto completoLu, Xing. "La contrôlabilité frontière exacte et la synchronisation frontière exacte pour un système couplé d’équations des ondes avec des contrôles frontières de Neumann et des contrôles frontières couplés de Robin". Thesis, Strasbourg, 2018. http://www.theses.fr/2018STRAD013/document.
Texto completoThis thesis studies the widespread natural phenomenon of synchronization, which was first observed by Huygens en 1665. On the basis of the results on the exact boundary controllability, for a coupled system of wave equations with Neumann boundary controls, we consider its exact boundary synchronization (by groups), as well as the determination of the state of synchronization. Then, we consider the exact boundary controllability and the exact boundary synchronization (by groups) for the coupled system with coupled Robin boundary controls. Due to difficulties from the lack of regularity of the solution, we have to face a bigger challenge. In order to overcome this difficulty, we take advantage of the regularity results for the mixed problem with Neumann boundary conditions (Lasiecka and Triggiani) to discuss the exact boundary controllability, and by the method of compact perturbation, to obtain the non-exact controllability for the system
Winkler, Max [Verfasser], Thomas [Akademischer Betreuer] Apel, Olaf [Akademischer Betreuer] Steinbach y Roland [Akademischer Betreuer] Herzog. "Finite Element Error Analysis for Neumann Boundary Control Problems on Polygonal and Polyhedral Domains / Max Winkler. Universität der Bundeswehr München, Fakultät für Bauingenieurwesen und Umweltwissenschaften. Betreuer: Thomas Apel. Gutachter: Thomas Apel ; Olaf Steinbach ; Roland Herzog". Neubiberg : Universitätsbibliothek der Universität der Bundeswehr München, 2015. http://d-nb.info/1077773129/34.
Texto completoAlsaedy, Ammar y Nikolai Tarkhanov. "Normally solvable nonlinear boundary value problems". Universität Potsdam, 2013. http://opus.kobv.de/ubp/volltexte/2013/6507/.
Texto completoYang, Xue. "Neumann problems for second order elliptic operators with singular coefficients". Thesis, University of Manchester, 2012. https://www.research.manchester.ac.uk/portal/en/theses/neumann-problems-for-second-order-elliptic-operators-with-singular-coefficients(2e65b780-df58-4429-89df-6d87777843c8).html.
Texto completoOrey, Maria de Serpa Salema Reis de. "Factorization of elliptic boundary value problems by invariant embedding and application to overdetermined problems". Doctoral thesis, Faculdade de Ciências e Tecnologia, 2011. http://hdl.handle.net/10362/8677.
Texto completoThe purpose of this thesis is the factorization of elliptic boundary value problems defined in cylindrical domains, in a system of decoupled first order initial value problems. We begin with the Poisson equation with mixed boundary conditions, and use the method of invariant embedding: we embed our initial problem in a family of similar problems, defined in sub-domains of the initial domain, with a moving boundary, and an additional condition in the moving boundary. This factorization is inspired by the technique of invariant temporal embedding used in Control Theory when computing the optimal feedback, for, in fact, as we show, our initial problem may be defined as an optimal control problem. The factorization thus obtained may be regarded as a generalized block Gauss LU factorization. From this procedure emerges an operator that can be either the Dirichlet-to-Neumann or the Neumann-to-Dirichlet operator, depending on which boundary data is given on the moving boundary. In any case this operator verifies a Riccati equation that is studied directly by using an Yosida regularization. Then we extend the former results to more general strongly elliptic operators. We also obtain a QR type factorization of the initial problem, where Q is an orthogonal operator and R is an upper triangular operator. This is related to a least mean squares formulation of the boundary value problem. In addition, we obtain the factorization of overdetermined boundary value problems, when we consider an additional Neumann boundary condition: if this data is not compatible with the initial data, then the problem has no solution. In order to solve it, we introduce a perturbation in the original problem and minimize the norm of this perturbation, under the hypothesis of existence of solution. We deduce the normal equations for the overdetermined problem and, as before, we apply the method of invariant embedding to factorize the normal equations in a system of decoupled first order initial value problems.
López, Ríos Juan Carlos. "Water-wave equations and free boundary problems: inverse problems and control". Tesis, Universidad de Chile, 2015. http://repositorio.uchile.cl/handle/2250/135179.
Texto completoEn este trabajo se aborda el problema de existencia de algunos tipos de soluciones para las ecuaciones de ondas en el agua así como la relación que existe entre estas soluciones y la forma de un fondo impermeable sobre la que se desliza el fluido. Empezamos por describir las ecuaciones que modelan el fenómeno físico a partir de las leyes de conservación; el modelo general de las ecuaciones de ondas en el agua, escrito para la restricción de la velocidad potencial a la superficie libre, es \begin{equation*} \left\{ \begin{aligned} &\partial_t\zeta-G(\zeta,b)\psi=0, \\ &\partial_t\psi+g\zeta+\frac{1}{2}|\nabla_X\psi|^2-\frac{1}{2(1+|\nabla_X\zeta|^2)}(G(\zeta,b)\psi+\nabla_X\zeta\cdot\nabla_X\psi)^2=0, \end{aligned} \right. \end{equation*} donde $G=G(\zeta,b)\psi$ es el operador Dirichlet-Neumann, el cual contiene la información del fondo $b$, \begin{equation*} G(\zeta,b)\psi:=-\sqrt{1+|\nabla_X\zeta|^2}\partial_n\phi|_{y=\zeta(t,X)}, \end{equation*} y \begin{equation*} \left\{ \begin{array}{rl} & \Delta\phi=0, \quad \R\times(b,\zeta), \\ & \phi|_{y=\zeta}=\psi, \quad \partial_n \phi|_{y=b(X)}=0. \end{array} \right. \end{equation*} Después de describir las condiciones para un teorema de existencia y unicidad de soluciones de las ecuaciones de ondas en el agua, en espacios de Sobolev, nos preguntamos sobre el mínimo de datos necesarios, sobre la superficie libre, para identificar el fondo de manera única. Por la relación que existe entre el operador Dirichlet-Neumann y la velocidad dentro del fluido y utilizando la propiedad de continuación única de las funciones armónicas hemos probado que basta conocer el perfil, la velocidad potencial y la velocidad normal en un instante de tiempo dado y un abierto de $\R$, aún cuando nuestro sistema es de evolución. En la segunda parte se estudia la existencia de soluciones en forma de salto hidráulico para las ecuaciones estacionarias de ondas en el agua, en dimensión dos y su relación con la velocidad aguas arriba, caracterizada por un parámetro adimensional, llamado el número de Froude, $F$, como consecuencia de la existencia de ramas de bifurcación de la solución trivial para el problema \begin{equation*} \mathcal{F}(\eta,F)=\eta+F\widetilde{\psi}_{y^{\prime }}+\frac{\epsilon}{2}(% \widetilde{\psi}_{x^{\prime }}^2+\widetilde{\psi}_{y^{\prime }}^2)-\epsilon^2\eta_x\widetilde{\psi}_{x^{\prime }}\widetilde{\psi}% _{y^{\prime }}+\frac{\epsilon^3}{2}\eta_x^2\widetilde{\psi}_{y^{\prime }}^2; \end{equation*} donde \begin{equation*} \left\{ \begin{aligned} &\Delta\widetilde{\psi}=\epsilon G, && (-L,L)\times(0,1), \\ &\widetilde{\psi}_{x'}=0, && x'=-L,L, \\ &\widetilde{\psi}=0, && y'=0, \\ &\widetilde{\psi}=-F\eta, && y'=1. \end{aligned} \right. \end{equation*}
PERROTTA, Antea. "Differential Formulation coupled to the Dirichlet-to-Neumann operator for scattering problems". Doctoral thesis, Università degli studi di Cassino, 2020. http://hdl.handle.net/11580/75845.
Texto completoKulkarni, Mandar S. "Multi-coefficient Dirichlet Neumann type elliptic inverse problems with application to reflection seismology". Birmingham, Ala. : University of Alabama at Birmingham, 2009. https://www.mhsl.uab.edu/dt/2010r/kulkarni.pdf.
Texto completoTitle from PDF t.p. (viewed July 21, 2010). Additional advisors: Thomas Jannett, Tsun-Zee Mai, S. S. Ravindran, Günter Stolz, Gilbert Weinstein. Includes bibliographical references (p. 59-64).
Kamyad, A. V. "Boundary control problems for the multi-dimensional diffusion equation". Thesis, University of Leeds, 1988. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.382023.
Texto completoLibros sobre el tema "Neumann boundary control problems"
Kunoth, Angela. Wavelet Methods — Elliptic Boundary Value Problems and Control Problems. Wiesbaden: Vieweg+Teubner Verlag, 2001. http://dx.doi.org/10.1007/978-3-322-80027-5.
Texto completoKunoth, Angela. Wavelet Methods -- Elliptic Boundary Value Problems and Control Problems. Wiesbaden: Vieweg+Teubner Verlag, 2001.
Buscar texto completoThe [D-bar] Neumann problem and Schrödinger operators. Berlin: Walter de Gruyter, 2014.
Buscar texto completoElliot, Tonkes, ed. On the nonlinear Neumann problem with critical and supercritical nonlinearities. Warszawa: Polska Akademia Nauk, Instytut Matematyczny, 2003.
Buscar texto completoA, Soloviev Alexander, Shaposhnikova Tatyana y SpringerLink (Online service), eds. Boundary Integral Equations on Contours with Peaks. Basel: Birkhäuser Basel, 2010.
Buscar texto completoColli, Pierluigi, Angelo Favini, Elisabetta Rocca, Giulio Schimperna y Jürgen Sprekels, eds. Solvability, Regularity, and Optimal Control of Boundary Value Problems for PDEs. Cham: Springer International Publishing, 2017. http://dx.doi.org/10.1007/978-3-319-64489-9.
Texto completoBenedek, Agnes Ilona. Remarks on a theorem of Å. Pleijel and related topics. Bahia Blanca, Argentina: INMABB-CONICET, Universidad Nacional del Sur, 2005.
Buscar texto completoPawłow, Irena. Analysis and control of evolution multi-phase problems with free boundaries. Wrocław: Zakład Narodowy im. Ossolińskich, 1987.
Buscar texto completoBratiĭchuk, N. S. Granichnye zadachi dli͡a︡ prot͡s︡essov s nezavisimymi prirashchenii͡a︡mi. Kiev: Nauk. dumka, 1990.
Buscar texto completoJ, Simon, ed. Control of boundaries and stabilization: Proceedings of the IFIP WG 7.2 Conference, Clermont Ferrand, France, June 20-23, 1988. Berlin: Springer-Verlag, 1989.
Buscar texto completoCapítulos de libros sobre el tema "Neumann boundary control problems"
Nowakowski, Andrzej. "A Neumann Boundary Control for Multidimensional Parabolic “Minmax” Control Problems". En Advances in Dynamic Games and Their Applications, 1–13. Boston: Birkhäuser Boston, 2009. http://dx.doi.org/10.1007/978-0-8176-4834-3_4.
Texto completoTakacs, Stefan y Walter Zulehner. "Multigrid Methods for Elliptic Optimal Control Problems with Neumann Boundary Control". En Numerical Mathematics and Advanced Applications 2009, 855–63. Berlin, Heidelberg: Springer Berlin Heidelberg, 2010. http://dx.doi.org/10.1007/978-3-642-11795-4_92.
Texto completoGonçalves, Etereldes y Marcus Sarkis. "Robust Parameter-Free Multilevel Methods for Neumann Boundary Control Problems". En Lecture Notes in Computational Science and Engineering, 111–18. Berlin, Heidelberg: Springer Berlin Heidelberg, 2013. http://dx.doi.org/10.1007/978-3-642-35275-1_11.
Texto completoBongarti, Marcelo y Irena Lasiecka. "Boundary Stabilization of the Linear MGT Equation with Feedback Neumann Control". En Deterministic and Stochastic Optimal Control and Inverse Problems, 150–67. Boca Raton: CRC Press, 2021. http://dx.doi.org/10.1201/9781003050575-7.
Texto completoKogut, Peter I. y Günter R. Leugering. "Asymptotic Analysis of Elliptic Optimal Control Problems in Thick Multistructures with Dirichlet and Neumann Boundary Controls". En Optimal Control Problems for Partial Differential Equations on Reticulated Domains, 477–514. Boston: Birkhäuser Boston, 2011. http://dx.doi.org/10.1007/978-0-8176-8149-4_13.
Texto completoPOP, NICOLAE, Luige Vladareanu y Victor Vladareanu. "On the Neumann Boundary Optimal Control of a Frictional Quasistatic Contact Problem with Dry Friction". En Progress on Difference Equations and Discrete Dynamical Systems, 327–36. Cham: Springer International Publishing, 2020. http://dx.doi.org/10.1007/978-3-030-60107-2_17.
Texto completoAzevedo, A., J. F. Rodrigues y L. Santos. "The N-membranes Problem with Neumann Type Boundary Condition". En Free Boundary Problems, 55–64. Basel: Birkhäuser Basel, 2006. http://dx.doi.org/10.1007/978-3-7643-7719-9_6.
Texto completoFeltrin, Guglielmo. "Neumann and Periodic Boundary Conditions: Existence Results". En Positive Solutions to Indefinite Problems, 69–99. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-319-94238-4_3.
Texto completoFeltrin, Guglielmo. "Neumann and Periodic Boundary Conditions: Multiplicity Results". En Positive Solutions to Indefinite Problems, 101–30. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-319-94238-4_4.
Texto completoAdomian, George. "Decomposition Solutions for Neumann Boundary Conditions". En Solving Frontier Problems of Physics: The Decomposition Method, 190–95. Dordrecht: Springer Netherlands, 1994. http://dx.doi.org/10.1007/978-94-015-8289-6_7.
Texto completoActas de conferencias sobre el tema "Neumann boundary control problems"
Sipin, Alexander S. "Random Walk on Balls for the Neumann Boundary Value Problem". En 2022 6th International Scientific Conference on Information, Control, and Communication Technologies (ICCT). IEEE, 2022. http://dx.doi.org/10.1109/icct56057.2022.9976762.
Texto completoZhao, Qing-hai, Xiao-kai Chen, Yi Lin y Zheng-Dong Ma. "Linear Heat Conduction Equation Based Filtering Iteration for Topology Optimization". En ASME 2012 International Mechanical Engineering Congress and Exposition. American Society of Mechanical Engineers, 2012. http://dx.doi.org/10.1115/imece2012-87631.
Texto completoLi, Hui, Baoli Deng, Chunlei Liu, Jian Zou y Huilong Ren. "Prediction of Wave-Induced Motions and Loads of Ships With Forward Speed by Matching Method". En ASME 2020 39th International Conference on Ocean, Offshore and Arctic Engineering. American Society of Mechanical Engineers, 2020. http://dx.doi.org/10.1115/omae2020-18614.
Texto completoHasni, Mohd Mughti, Zanariah Abdul Majid y Norazak Senu. "Solving linear Neumann boundary value problems using block methods". En PROCEEDINGS OF THE 20TH NATIONAL SYMPOSIUM ON MATHEMATICAL SCIENCES: Research in Mathematical Sciences: A Catalyst for Creativity and Innovation. AIP, 2013. http://dx.doi.org/10.1063/1.4801145.
Texto completoJahanshahi, M. "Reduction of Two Dimensional Neumann and Mixed Boundary Value Problems to Dirichlet Boundary Value Problems". En Proceedings of the 4th International ISAAC Congress. WORLD SCIENTIFIC, 2005. http://dx.doi.org/10.1142/9789812701732_0017.
Texto completoGámez, José L. "Local bifurcation for elliptic problems: Neumann versus Dirichlet boundary conditions". En The First 60 Years of Nonlinear Analysis of Jean Mawhin. WORLD SCIENTIFIC, 2004. http://dx.doi.org/10.1142/9789812702906_0006.
Texto completoBornia, Giorgio y Saikanth Ratnavale. "Different approaches for Dirichlet and Neumann boundary optimal control". En INTERNATIONAL CONFERENCE OF NUMERICAL ANALYSIS AND APPLIED MATHEMATICS (ICNAAM 2017). Author(s), 2018. http://dx.doi.org/10.1063/1.5043899.
Texto completoKuryliak, D. B. y Z. T. Nazarchuk. "Wave scattering by wedge with Dirichlet and Neumann boundary conditions". En Proceedings of III International Seminar/Workshop on Direct and Inverse Problems of Electromagnetic and Acoustic Wave Theory. DIPED-98. IEEE, 1998. http://dx.doi.org/10.1109/diped.1998.730938.
Texto completoNingning, Yan. "Boundary Element Method for Boundary Control Problems". En 2007 Chinese Control Conference. IEEE, 2006. http://dx.doi.org/10.1109/chicc.2006.4346826.
Texto completoHong, Keum S. y Joseph Bentsman. "Stability Criterion for a Linear Oscillatory Parabolic System with Neumann Boundary Conditions". En 1989 American Control Conference. IEEE, 1989. http://dx.doi.org/10.23919/acc.1989.4790367.
Texto completoInformes sobre el tema "Neumann boundary control problems"
Seidman, Thomas I. Free Boundary Problems Arising in the Control of a Flexible Robot Arm,. Fort Belvoir, VA: Defense Technical Information Center, septiembre de 1987. http://dx.doi.org/10.21236/ada189124.
Texto completoHackbarth, Carolyn y Rebeca Weissinger. Water quality in the Northern Colorado Plateau Network: Water years 2016–2018 (revised with cost estimate). National Park Service, noviembre de 2023. http://dx.doi.org/10.36967/nrr-2279508.
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