A generalization of Pythagoras on a surface

Abstract

We analyze Toponogov's sine theorem for an infinitesimal geodesic triangle ABC on a C2 regular surface M, which is given in his book [6, Problem 3.7.2] and we provide a generalization of the law of cosines for ABC on M. By replacing in the law of cosines B=π2 on M, we derive the generalized theorem of Pythagoras on a surface: AC2 = AB2 + BC2 + f( A,π2,AB,BC)o(AC2) or AC2 = AB2 + BC2 + ( A + C-π2)2 where f( A, B,AB,BC) is a rational function w.r. to cosA; cosB, sinA, sinB, AB and BC.