Bihamiltonian tests for integrable systems associated to rank-1 F-CohFTs

Abstract

Double ramification (DR) hierarchies associated to rank-1 F-CohFTs are important integrable perturbations of the Riemann--Hopf hierarchy. In this paper, we perform bihamiltonian tests for these DR hierarchies, and conjecture that the ones that are bihamiltonian form a 2-parameter family. Remarkably, our computations suggest that there is a 1-parameter subfamily of the rank-1 F-CohFTs, where the corresponding DR hierarchy is conjecturally Miura equivalent to the Camassa--Holm hierarchy. We also prove a conjecture regarding bihamiltonian Hodge hierarchies. Finally, we systematically study Miura invariants, and for another 1-parameter subfamily propose a conjectural relation to the Degasperis--Procesi hierarchy.