On the Existence of Isoperimetric Extremals of Rotation and the Fundamental Equations of Rotary Diffeomorphisms


Josef Mikeš, Martin Sochor, Elena Stepanova




In this paper we study the existence and the uniqueness of isoperimetric extremals of rotation on two-dimensional (pseudo-) Riemannian manifolds and on surfaces on Euclidean space. We find the new form of their equations which is easier than results by S.\,G. Leiko. He introduced the notion of rotary dffeomorphisms. In this paper we propose a new proof of the fundamental equations of rotary mappings.