Integrable Z22-graded super-Liouville Equation and Induced Z22-graded super-Virasoro Algebra

Abstract

We present a framework for enlarging the construction of Z22-graded classical Toda theory from the class of Z22-graded Lie algebras to the class of Z22-graded Lie superalgebras. This scheme is applied to derive a Z22-graded extension of the super-Liouville equation based on a Z22-graded extension of osp(1|2). The mathematical tools employed in this work are a Z22-graded version of the zero-curvature formalism and of the Polyakov's soldering procedure. It is demonstrated that both methods yield the same Z22-graded super-Liouville equation. An algebraic construction of solutions to the resulting equations is also presented, together with their Bäcklund transformations. Furthermore, three distinct new Z22-graded extensions of the super-Virasoro algebra are obtained via Hamiltonian reduction of the WZNW currents defined for Z22-osp(1|2).