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Abstract We describe all metrics geodesically compatible with a gl gl -regular Nijenhuis operator L. The set of such metrics is large enough so that a generic local curve γ is a geodesic for a suitable metric g from this set. Next, we show that a certain evolutionary PDE system of hydrodynamic type constructed from L preserves the property of γ to be a g -geodesic. This implies that every metric g geodesically compatible with L gives us a finite-dimensional reduction of this PDE system. We show that its restriction onto the set of g -geodesics is naturally equivalent to the Poisson action of Rⁿ Rn on the cotangent bundle generated by the integrals coming from geodesic compatibility.
Bolsinov et al. (Mon,) studied this question.