Interpolation and optimal hitting for complete minimal surfaces with finite total curvature

Abstract

We prove that, given a compact Riemann surface and disjoint finite sets ≠ E⊂ and ⊂, every map R3 extends to a complete conformal minimal immersion E R3 with finite total curvature. This result opens the door to study optimal hitting problems in the framework of complete minimal surfaces in R3 with finite total curvature. To this respect we provide, for each integer r 1, a set A⊂R3 consisting of 12r+3 points in an affine plane such that if A is contained in a complete nonflat orientable immersed minimal surface X M3, then the absolute value of the total curvature of X is greater than 4π r.