Sub-Randers metrics

Abstract

We introduce a new class of sub-Finsler metrics, called sub-Randers metrics, obtained by adding a one-form β∈ Γ(D*) to a sub-Riemannian metric a on a bracket-generating distribution D ⊂ TM. We define a sub-Randers manifold as a triple (M, D, F), where M is an n-dimensional smooth manifold and F(v) = a(v,v) + β(v), the condition \|β\|a < 1 ensures positive definiteness and convexity. Explicit equations for sub-Randers normal geodesics are derived, and we show that normal geodesics depend on β while abnormal geodesics are determined solely by the bracket-generating distribution D. Furthermore, we show that Zermelo navigation on D naturally generates sub-Randers normal geodesics. Finally, we prove a Hopf-Rinow type theorem which guarantees the existence of minimizing geodesics despite asymmetry, generalizing classical results to the sub-Randers setting.