YAO Wei-an, LI Xiao-chuan. Symplectic Duality System on the Plane Magnetoelectroelastic Solids[J]. Applied Mathematics and Mechanics, 2006, 27(2): 177-185.
Citation: YAO Wei-an, LI Xiao-chuan. Symplectic Duality System on the Plane Magnetoelectroelastic Solids[J]. Applied Mathematics and Mechanics, 2006, 27(2): 177-185.

Symplectic Duality System on the Plane Magnetoelectroelastic Solids

  • Received Date: 2004-09-28
  • Rev Recd Date: 2005-10-17
  • Publish Date: 2006-02-15
  • By means of the generalized variable principle of magnetoelectroelastic solids, the plane magnetoelectroelastic solids problem was derived to Hamiltonian system. In symplectic geometry space, which consists of origin variables, displacements, electric potential and magnetic potential, and their duality variables, lengthways stress, electric displacement and magnetic induction, the effective methods of separation of variables and symplectic eigenfunction expansion were applied to solve the problem. Then all the eigen-solutions and eigen-solutions in Jordan form on eigenvalue zero can be given, and their specific physical significations were showed clearly. At last, the special solutions were presented with uniform loader, constant electric displacement and constant magnetic induction on two sides of the rectangle domain.
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