Equations of the linear theory of elasticity with point maxwellian sources of stress relaxation

A theory of elasticity for piecewise-linear potentials is constructed assuming that the elastic potential consists of two terms, one of which depends on the hydrostatic pressure and other on the equivalent stress Z, which is a homogeneous function of the first power of the stress deviator. These ass

IRe(s)l < n, where H~ 1 is the inverse of the Mellin type transform which was first introduced by D. Naylor in his paper [1]. We begin by assuming that A(s) may be written in the form A(s)= p(t")t"-l(R2~t-~-:)dt, in which case it is seen that

The conditions for the existence of Riemann invariants of a one-dimensional system of equations of the non-linear theory of elasticity are investigated. Haantjes' diagonalization criterion is used to determine the form of the elastic potential for which the system has six Riemann invariants or three