Canonical Coordinates and Natural Equations for Minimal Time-like Surfaces in R42

Abstract

We apply the complex analysis over the double numbers D to study the minimal time-like surfaces in R42. A minimal time-like surface which is free of degenerate points is said to be of general type. We divide the minimal time-like surfaces of general type into three types and prove that these surfaces admit special geometric (canonical) parameters. Then the geometry of the minimal time-like surfaces of general type is determined by the Gauss curvature K and the curvature of the normal connection , satisfying the system of natural equations for these surfaces. We prove the following: If (K, ), \, K2- 2 > 0 is a solution to the system of natural equations, then there exists exactly one minimal time-like surface of the first type and exactly one minimal time-like surface of the second type with invariants (K, ); if (K, ),\, K2- 2 < 0 is a solution to the system of natural equations, then there exists exactly one minimal time-like surface of the third type with invariants (K, ).