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Applied and Numerical Partial Differential Equations pp 9–23Cite as

On a Class of Partial Differential Equations with Nonlocal Dirichlet Boundary Conditions

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Part of the book series: Computational Methods in Applied Sciences ((COMPUTMETHODS,volume 15))

Abstract

We establish existence and uniqueness of solutions of a class of partial differential equations with nonlocal Dirchlet conditions in weighted function spaces. The problem is motivated by the study of the probability distribution of the response of an elasto-plastic oscillator when subjected to white noise excitation (see [1,2] on the derivation of the boundary value problem). Note that the developments in [1,2] are based on an extension of Khasminskii’s method (see, e.g. [5]) and in this paper we use a direct approach to achieve our objectives.

We refer the reader to [3, 4, 6, 7] for general background on modeling, theoretical, and computational issues related to elasto-plastic oscillators.

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References

  1. A. Bensoussan and J. Turi. Stochastic variational inequalities for elasto-plastic oscillators. C. R. Math. Acad. Sci. Paris, 343(6):399–406, 2006.

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  2. A. Bensoussan and J. Turi. Degenerate Dirichlet problems related to the invariant measure of elasto-plastic oscillators. Appl. Math. Optim., 58(1):1–27, 2007. DOI 10.1007/s00245-007-9027-4 (available online).

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  3. C. Féau. Les méthodes probabilistes en mécanique sismique. Application aux calculs de tuyauteries fissurées. Thèse, Université d’Evry, 2003.

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  5. R. Z. Khasminskii. Stochastic stability of differential equations. Sijthoff and Noordhoff, Alphen aan den Rijn, 1980.

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  6. A. Preumont. Random vibration and spectral analysis. Kluwer Academic Publ., Dordrecht, 2nd edition, 1994.

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  7. J. B. Roberts and P.-T. D. Spanos. Random vibration and statistical linearization. John Wiley & Sons, Chichester, 1990.

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Author information

Authors and Affiliations

  1. International Center for Decision and Risk Analysis, ICDRiA, School of Management, University of Texas at Dallas, Richardson, TX, 75083, USA

    Alain Bensoussan

  2. Programs in Mathematical Sciences, University of Texas at Dallas, Richardson, TX, 75083, USA

    Janos Turi

Authors
  1. Alain Bensoussan
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  2. Janos Turi
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Corresponding author

Correspondence to Alain Bensoussan .

Editor information

Editors and Affiliations

  1. Dept. Mathematics, University of Houston, Calhoun Road 4800, Houston, 77204-3008, U.S.A.

    W. Fitzgibbon

  2. Dept. Mathematics, University of Houston, Calhoun Road 4800, Houston, 77204-3008, U.S.A.

    Y.A. Kuznetsov

  3. Dept. Mathematical Information , University of Jyväsklyklä, Jyväskylä, 40351, Finland

    Pekka Neittaanmäki

  4. Numèrics en Enginyeria (CIMNE), Centre Internacional de Mètodes, C/ Gran Capitan s/n, Barcelona, 08034, Spain

    Jacques Périaux

  5. Dept. Mathematique, Université de Paris VI, place Jussieu 4 , Paris CX 05, 75252, France

    Olivier Pironneau

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Bensoussan, A., Turi, J. (2010). On a Class of Partial Differential Equations with Nonlocal Dirichlet Boundary Conditions. In: Fitzgibbon, W., Kuznetsov, Y., Neittaanmäki, P., Périaux, J., Pironneau, O. (eds) Applied and Numerical Partial Differential Equations. Computational Methods in Applied Sciences, vol 15. Springer, Dordrecht. https://doi.org/10.1007/978-90-481-3239-3_3

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  • DOI: https://doi.org/10.1007/978-90-481-3239-3_3

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  • Publisher Name: Springer, Dordrecht

  • Print ISBN: 978-90-481-3238-6

  • Online ISBN: 978-90-481-3239-3

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