In this paper two uniqueness theorems for an anisotropic mixture of two linear elastic solids are established: The former concerns the mixed boundary-value problem, the latter the displacement problem. These theorems are proved for unbounded domains in the absence of artificial restrictions upon the behaviour of the unknown fields at infinity. A reciprocity theorem is also given. © 1983 Springer-Verlag.
Uniqueness and reciprocity in the boudary-initial value problem for a mixture of two elastic solids occupying an unbounded domain
BORRELLI, Alessandra;PATRIA, Maria Cristina
1983
Abstract
In this paper two uniqueness theorems for an anisotropic mixture of two linear elastic solids are established: The former concerns the mixed boundary-value problem, the latter the displacement problem. These theorems are proved for unbounded domains in the absence of artificial restrictions upon the behaviour of the unknown fields at infinity. A reciprocity theorem is also given. © 1983 Springer-Verlag.File in questo prodotto:
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