Lie group classification and invariant exact solutions of the generalized Kompaneets equations

Abstract

In this paper, from the group-theoretic point of view it is investigated such class of the generalized Kompaneets equations (GKEs): ut=1x2·[x4(ux+f(u))]x, \ (t,x) ∈ R+ × R+, where u=u(t,x), ut=∂ u∂ t, ux=∂ u∂ x, uxx=∂2 u∂ x2; f(u) is an arbitrary smooth function of the variable u. Using the Lie--Ovsiannikov algorithm, the group classification of the class under study is carried out. It is shown that the kernel algebra of the full groups of the GKEs is the one-dimensional Lie algebra g= ∂t . Using the direct method, the equivalence group G of the class is found. It is obtained six non-equivalent (up to the equivalence transformations from the group G) GKEs that allow wider invariance algebras than g. It is shown that, among the non-linear equations from the class, the GKE with the function f(u)=u43 has the maximal symmetry properties, namely, it admits a three-dimensional maximal Lie invariance algebra. Using the obtained operators, it is found all possible non-equivalent group-invariant exact solutions of the GKE under consider.