The Waldschmidt constant of special fat flat subschemes in PN]The Waldschmidt constant of special fat flat subschemes in PN

Abstract

The purpose of this paper is to construct some special kind of subschemes in PN with N 3, which we call them "fat flat subschemes" and compute their Waldschmidt constants. These subschemes are constructed by adding, in a particular way, a finite number of linear subspaces of PN of many different dimensions to a star configuration in PN, with arbitrary preassigned multiplicities to each one of these linear subspaces, as well as the star configuration. Among other things, it will be shown that for every positive integer d, there are infinitely many fat flat subschemes in PN with the Waldschmidt constant equal to d. In addition to this, for any two integers 1 a<b, we also construct a fat flat subscheme of the above type in some projective space PM, which its Waldschmidt constant is equal to b/a. In addition to these, all non-reduced fat points subschemes Z in P2 with the Waldschmidt constants less than 5/2 are classified.