In this note we introduce a natural Finsler structure on convex surfaces, referred to as the quotient Finsler structure, which is dual
in a sense to the inclusion of a convex surface in a normed space as a submanifold. It has an associated quotient girth, which is similar to the notion of girth defined by Sch¨affer. We prove the analogs of Sch¨affer’s dual girth conjecture (proved by ´ Alvarez-Paiva) and the Holmes–Thompson dual volumes theorem in the quotient setting. We then show that the quotient Finsler structure admits a natural extension to higher Grassmannians, and prove the corresponding theorems in the general case. We follow ´ Alvarez-Paiva’s approach
to the problem, namely, we study the symplectic geometry of the associated co-ball bundles. For the higher Grassmannians, the theory
of Hamiltonian actions is applied.