Optimal Synthesis in a Radially Symmetric Grushin Space

Abstract

We study the geometry of R3 equipped with a rotationally invariant Carnot-Carth\'eodory metric obtained by weighting motion in the z-direction by a function f(r) of the cylindrical radius. When f vanishes only at r=0, the space exhibits a Grushin--type singularity along the vertical axis. We provide sufficient conditions on f ensuring a Grushin--like structure and describe the full optimal synthesis at singular points. For Riemannian points, we propose a candidate cut time determined by a discrete symmetry of the Hamiltonian flow. In the integrable case f(r)=r, we prove that this candidate coincides with the true cut time and give an explicit description of the cut locus.