Abstract
Green's and Poisson's matrices in an n-dimensional half-space are computed for the system of linear isotropic elasticity and four types of boundary conditions attacked by Boussinesq and Cerruti by means of potential-theoretic methods and reconsidered by Sneddon (1993). This involves the solution of convolution equations and the computation of various convolution products by means of distribution theory. The question of uniqueness is also addressed.
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