Riemann spaces and Pfaff differential forms

Abstract

In this work we study differential geometry in N dimensional Riemann curved spaces using Pfaff derivatives. Avoiding the classical partial derivative the Pfaff derivatives are constructed in a more sophisticated way and make evaluations become easier. In this way Christofell symbols ikj of classical Riemann geometry as also the elements of the metric tensor gij are replaced with one symbol (the qikj). Actually to describe the space we need no usage of the metric tensor gij at all. We also don't use Einstein's notation and this simplifies also things a lot. For example we don't have to use upper and lower indexes, which in eyes of a beginner, is quite messy. Also we don't use the concept of tensor. All quantities of the surface or curve or space which form a tensor field are called invariants or curvatures of the space. Several new ideas are developed in this basis.