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The Dirichlet Problem for the Plane Deformation of a Thin Plate on an Elastic Foundation

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Integral Methods in Science and Engineering

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References

  1. Chudinovich, I., Constanda, C.: Variational and Potential Methods in the Theory of Bending of Plates with Transverse Shear Deformation. Chapman & Hall/CRC, Boca Raton-London-New York-Washington, DC (2000).

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  2. Chudinovich, I., Constanda, C.: Variational and Potential Methods for a Class of Linear Hyperbolic Evolutionary Processes. Springer, London (2005).

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  3. Constanda, C.: A Mathematical Analysis of Bending of Plates with Transverse Shear Deformation. Longman/Wiley, Harlow-New York (1990).

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  4. Duvaut, G., Lions, J.-L.: Inequalities in Mechanics and Physics. Springer, Berlin (1976).

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Author information

Authors and Affiliations

  1. University of Tulsa, OK, USA

    I. Chudinovich, C. Constanda, D. Doty, W. Hamill & S. Pomeranz

Authors
  1. I. Chudinovich
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  2. C. Constanda
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  3. D. Doty
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  4. W. Hamill
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  5. S. Pomeranz
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Editor information

Editors and Affiliations

  1. Department of Mathematical and Computer Sciences, University of Tulsa, 600 South College Avenue, Tulsa, OK 74104, USA

    C. Constanda

  2. Department of Civil and Environmental Engineering, University of Waterloo, 200 University Avenue West, Waterloo, ON N2L 3G1, Canada

    S. Potapenko

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© 2008 Birkhäuser Boston

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Chudinovich, I., Constanda, C., Doty, D., Hamill, W., Pomeranz, S. (2008). The Dirichlet Problem for the Plane Deformation of a Thin Plate on an Elastic Foundation. In: Constanda, C., Potapenko, S. (eds) Integral Methods in Science and Engineering. Birkhäuser Boston. https://doi.org/10.1007/978-0-8176-4671-4_10

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