On Field Size and Success Probability in Network Coding

Abstract

Using tools from algebraic geometry and Groebner basis theory we solve two problems in network coding. First we present a method to determine the smallest field size for which linear network coding is feasible. Second we derive improved estimates on the success probability of random linear network coding. These estimates take into account which monomials occur in the support of the determinant of the product of Edmonds matrices. Therefore we finally investigate which monomials can occur in the determinant of the Edmonds matrix.Comment: 16 pages, 3 figures, 2 tables. Accepted for publication at International Workshop on the Arithmetic of Finite Fields, WAIFI 200