Conservation laws and symmetries of Hunter-Saxton equation: revisited

Abstract

Through a reciprocal transformation T0 induced by the conservation law ∂t(ux2) = ∂x(2uux2), the Hunter-Saxton (HS) equation uxt = 2uu2x + ux2 is shown to possess conserved densities involving arbitrary smooth functions, which have their roots in infinitesimal symmetries of wt = w2, the counterpart of the HS equation under T0. Hierarchies of commuting symmetries of the HS equation are studied under appropriate changes of variables initiated by T0, and two of these are linearized while the other is identical to the hierarchy of commuting symmetries admitted by the potential modified Korteweg-de Vries equation. A fifth order symmetry of the HS equation is endowed with a sixth order hereditary recursion operator by its connection with the Fordy-Gibbons equation. These results reveal the origin for the rich and remarkable structures of the HS equation and partially answer the questions raised by Wang [ Nonlinearity 23(2010) 2009].