Infinitely many local higher symmetries without recursion operator or master symmetry: integrability of the Foursov--Burgers system revisited

Abstract

We consider the Burgers-type system studied by Foursov, wt &=& wxx + 8 w wx + (2-4α)z zx, zt &=& (1-2α)zxx - 4α z wx + (4-8α)w zx - (4+8α)w2 z + (-2+4α)z3, (*) for which no recursion operator or master symmetry was known so far, and prove that the system (*) admits infinitely many local generalized symmetries that are constructed using a nonlocal two-term recursion relation rather than from a recursion operator.