On invariant solutions of the differential equations of the one-dimensional motion of a hooke medium

The solution8 of finite-dimensional time-invariant transport equations are corzszdered. With the aid of an auxiliary equation the given equation is shown to be equivalent to a pair of coupled linear equations. Further, any four distinct solutions of a transport equation are related to the solution o

We consider evolution equations of the form u t = f(x, u, u x )u xx + g(x, u, u x ) and u t = u xx + g(x, u, u x ). In the spirit of the recent work of Ibragimov [Ibragimov NH. Laplace type invariants for parabolic equations. Nonlinear Dynam 2002;28:125-33] who adopted the infinitesimal method for c

The real special linear group of degree n naturally acts on the vector space of n  n real symmetric matrices. How to determine invariant hyperfunction solutions of invariant linear differential equations with polynomial coefficients on the vector space of n  n real symmetric matrices is discussed