Generating even triangulations of the projective plane

We show how to lift the even intersection equivalence relation from the hyperovals of PG(2, 4) to an equivalence relation amongst sets of hyperconics in "PG(2, F ). Here, F is any "nite or in"nite "eld of characteristic two that contains a sub"eld of order 4, but does not contain a sub"eld of order

In this paper we describe an algorithm for computing the dual of a projective plane curve. The algorithm requires no extension of the field of coefficients of the curve and runs in polynomial time.

In this paper we determine a new upper bound for the regularity index of fat points of \(P^{2}\), without requiring any geometric condition on the points. This bound is intermediate between Segre's bound, that holds for points in the general position, and the more general bound, that is attained whe

The homogeneous coordinate ring of a quantum projective plane is a 3-dimensional Artin᎐Schelter regular algebra with the same Hilbert series as the polynomial ring in three variables; such an algebra A is a graded noncommutative analogue of the polynomial ring in three variables. When A is a finite

An explicit formula for the number of finite cyclic projective planes or planar . Ž . difference sets is derived by applying Ramanujan sums Von Sterneck numbers and Mobius inversion over the set partition lattice to counting one-to-one solution vectors of multivariable linear congruences.

Let X be the surface obtained by blowing up general points p 1 p n of the projective plane over an algebraically closed ground field k, and let L be the pullback to X of a line on the plane. If C is a rational curve on X with C • L = d, then for every t there is a natural map C C t ⊗ X X L → C C t +