Canonical Weierstrass Representations for Maximal Space-like Surfaces in $\RR^4_2$ (1906.09935v1)

Abstract: It is known that any maximal space-like surface without isotropic points in the four-dimensional pseudo-Euclidean space with neutral metric admits locally geometric parameters which are special case of isothermal parameters. With respect to such parameters the surface is determined uniquely up to a motion by the Gauss curvature and the curvature of the normal connection, which satisfy a system of two PDE's (the system of natural PDE's). For any maximal space-like surface parametrized by canonical parameters we obtain a special Weierstrass representation -- canonical Weierstrass representation. These Weierstrass formulas allow us to solve explicitly the system of natural PDE's by virtue of two holomorphic functions in the Gauss plane. We find the relation between two pairs of holomorphic functions generating one and the same solution to the system of natural PDE's. We establish a geometric correspondence between the maximal space-like surfaces of general type in $\RR^4_2$, the solutions to the system of natural PDE's and the pairs of holomorphic functions in the Gauss plane. We prove that any maximal space-like surface in the four-dimensional pseudo-Euclidean space with neutral metric generates two maximal space-like surfaces in the three-dimensional Minkowski space and vice versa.