Admissible local systems for a class of line arrangements

Abstract

A rank one local system on a smooth complex algebraic variety M is admissible roughly speaking if the dimension of the cohomology groups Hm(M,) can be computed directly from the cohomology algebra H*(M,). We say that a line arrangement is of type k if k 0 is the minimal number of lines in containing all the points of multiplicity at least 3. We show that if is a line arrangement in the classes k for k≤ 2, then any rank one local system on the line arrangement complement M is admissible. Partial results are obtained for the class 3.