Efficient construction of homological Seifert surfaces

Abstract

Let be a bounded domain of R3 whose closure is polyhedral, and let T be a triangulation of . Assuming that the boundary of is sufficiently regular, we provide an explicit formula for the computation of homological Seifert surfaces of any 1-boundary γ of T; namely, 2-chains of T whose boundary is γ. It is based on the existence of special spanning trees of the complete dual graph of T, and on the computation of certain linking numbers associated with those spanning trees. If the triangulation T is fine, the explicit formula is too expensive to be used directly. For this reason, making also use of a simple elimination procedure, we devise a fast algorithm for the computation of homological Seifert surfaces. Some numerical experiments illustrate the efficiency of this algorithm.