New phenomena in the containment problem for simplicial arrangements

Abstract

In this note we consider two simplicial arrangements of lines and ideals I of intersection points of these lines. There are 127 intersection points in both cases and the numbers ti of points lying on exactly i configuration lines (points of multiplicity i) coincide. We show that in one of these examples the containment I(3) ⊂eq I2 holds, whereas it fails in the other. We also show that the containment fails for a subarrrangement of 21 lines. The interest in the containment relation between I(3) and I2 for ideals of points in 2 is motivated by a question posted by Huneke around 2000. Configurations of points with I(3) ⊂eq I2 are quite rare. Our example reveals two particular features: All points are defined over and all intersection points of lines are involved. In examples studied by now only points with multiplicity i≥ 3 were considered. The novelty of our arrangements lies in the geometry of the element in I(3) which witness the noncontainment in I2. In all previous examples such an element was a product of linear forms. Now, in both cases there is an irreducible curve of higher degree involved.