On Computing a Set of Points Meeting Every Cell Defined by a Family of Polynomials on a Variety

Let \(P\_{N+1}(x)\) be the polynomial which is defined recursively by \(P\_{0}(x)=0\), \(P\_{1}(x)=1, \quad\) and \(\alpha\_{n} P\_{n+1}(x)+\alpha\_{n-1} P\_{n-1}(x)+b\_{n} P\_{n}(x)=x d\_{n} P\_{n}(x), \quad n=1, \quad 2, \ldots, N\), where \(\alpha\_{n}, b\_{n}, d\_{n}\) are real sequences with \(

In this paper the number of directions determined by a set of q&n points of AG(2, q) is studied. To such a set we associate a curve of degree n and show that its linear components correspond to points that can be added to the set without changing the set of determined directions. The existence of li

We generalize the definition of natural scales (originally defined on a single point) to systems of interacting fields defined on a set of discrete, correlated points. We study the case of a nearest neighbour interaction over a d-dimensional rectangular lattice; the thermodynamic limit of natural sc