Generic Lines in Projective Space and the Koszul Property

Abstract

In this paper, we study the Koszul property of the homogeneous coordinate ring of a generic collection of lines in Pn and the homogeneous coordinate ring of a collection of lines in general linear position in Pn. We show that if M is a collection of m lines in general linear position in Pn with 2m ≤ n+1 and R is the coordinate ring of M, then R is Koszul. Further, if M is a generic collection of m lines in Pn and R is the coordinate ring of M with m even and m +1≤ n or m is odd and m +2≤ n, then R is Koszul. Lastly, we show if M is a generic collection of m lines such that \[ m > 172(3(n2+10n+13)+3(n-1)3(3n+5)),\] then R is not Koszul. We give a complete characterization of the Koszul property of the coordinate ring of a generic collection of lines for n ≤ 6 or m ≤ 6. We also determine the Castelnuovo-Mumford regularity of the coordinate ring for a generic collection of lines and the projective dimension of the coordinate ring of collection of lines in general linear position.