Non-Euclidean Geometry of Human Body and Electrical Networks

Abstract

The review of application of non-Euclidean geometries for interpretation of growth of the human body is submitted and features of use of non-Euclidean geometries in the electric circuit theory are shown. The common mathematical apparatus represents interdisciplinary approach in view of analogy of processes of a different physical nature. Growth of the human body and changes of parameters of an operating regime of a network correspond to projective and conformal transformations which possess an invariant, that is the cross-ratio of four points. The obtained results develop methodology of application of non-Euclidean geometries.