On integrability of Weingarten surfaces: a forgotten class

Abstract

Rediscovered by a systematic search, a forgotten class of integrable surfaces is shown to disprove the Finkel-Wu conjecture. The associated integrable nonlinear partial differential equation zyy + (1/z)xx + 2 = 0 possesses a zero curvature representation, a third-order symmetry, and a nonlocal transformation to the sine-Gordon equation φη = φ. We leave open the problem of finding a Backlund autotransformation and a recursion operator that would produce a local hierarchy.