311 / 2019-09-30 00:28:08
Peculiarities of Construction of Analytical Solutions to Boundary Value Problems of the Theory of Elasticity in Finite Domains with the Angular Points of the Boundary
Papkovich–Fadle eigenfunctions,Biorthogonal functions,Lagrange expansions,Boundary value problems,Exact solutions
Final Paper
GuangmingYu / Qingdao University of Technology
Guangtai Zhang / Xinjiang University
KovalenkoM D / Russian Academy of Sciences
MenshovaI V / Russian Academy of Sciences
KerzhaevA P / Russian Academy of Sciences
XiankunZeng / Qingdao University of Technology
CanDuan / China Construction Tunnel Co., Ltd.
ZibinXue / China Construction Tunnel Co., Ltd.
The article presents a formulation of the biharmonic problem of the theory of elasticity and the method developed by the authors for its solution using the example of the first basic boundary value problem for a half-strip (rectangle). The solution is constructed in the form of series in Papkovich–Fadle eigenfunctions. The coefficients of the series are determined in a simple closed form on the basis of the theory of the Borel transform developed by the authors in the class of quasi-entire functions of exponential type. The obtained series are equiconvergent with the corresponding trigonometric series. Despite the fact that the mathematical apparatus is quite complex, the final formulas are simple, reliable and can easily be applied in engineering calculations. The exact solutions obtained describe residual stresses. Therefore, they are especially valuable for solving various engineering problems of rock mechanics, where such stresses almost always exist, particularly in the problems associated with the construction of underground structures (such as the metro), the construction of mathematical models of rock bursts and earthquakes, etc.
Important Date
  • Conference Date

    Nov 15

    2019

    to

    Nov 18

    2019

  • Nov 09 2019

    Draft paper submission deadline

  • Nov 18 2019

    Registration deadline

Sponsored By
南方计算力学联络委员会
江苏省力学学会
Organized By
武汉大学
华中科技大学
武汉理工大学
武汉科技大学
湖北省力学学会
海军工程大学
长江科学院
武汉市力学学会
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