AbstractWe show that any fat point (local punctual scheme) has at most one embedding in the affine space up to analytic equivalence. If the algebra of functions of the fat point admits a non-trivial grading over the non-negative integers, we prove that it has at most one embedding up to algebraic equivalence. However, we give an example of a fat point having algebraically non-equivalent embeddings in the affine plane
Information on the Hilbert function of a finite set of fat points is relevant in a variety of studie...
We study homogeneous schemes of fat points in P^2 whose support is either a complete intersection (...
AbstractIn this paper, we address the following two general problems: given two algebraic varieties ...
We show that any fat point (local punctual scheme) has at most one embedding in the affine space up ...
AbstractWe show that any fat point (local punctual scheme) has at most one embedding in the affine s...
This work employs geometric methods to investigate the relationship between the geometry of fat poin...
Abstract. In this paper we analyze some examples of affine varieties with non-unique embeddings and ...
A classical unsolved problem of projective geometry is that of finding the dimensions of all the (hi...
ABSTRACT. An axiom system for n-dimensional affine geometry is presented; in the spirit of Hermann G...
AbstractWe investigate the minimal graded free resolutions of ideals of at most n+1 fat points in ge...
AbstractWe show that through a point of an affine variety there always exists a smooth plane curve i...
none3We study the connection between the generation of a fat point scheme supported at general poin...
together with its indirect forms are introduced. Logical relationships between these formulas and be...
An Andre embedding is a representation of a point-line geometry S with approximately s(2) points on ...
The author proves in a purely algebraic way that any flat geo-odular space is an affine space and vi...
Information on the Hilbert function of a finite set of fat points is relevant in a variety of studie...
We study homogeneous schemes of fat points in P^2 whose support is either a complete intersection (...
AbstractIn this paper, we address the following two general problems: given two algebraic varieties ...
We show that any fat point (local punctual scheme) has at most one embedding in the affine space up ...
AbstractWe show that any fat point (local punctual scheme) has at most one embedding in the affine s...
This work employs geometric methods to investigate the relationship between the geometry of fat poin...
Abstract. In this paper we analyze some examples of affine varieties with non-unique embeddings and ...
A classical unsolved problem of projective geometry is that of finding the dimensions of all the (hi...
ABSTRACT. An axiom system for n-dimensional affine geometry is presented; in the spirit of Hermann G...
AbstractWe investigate the minimal graded free resolutions of ideals of at most n+1 fat points in ge...
AbstractWe show that through a point of an affine variety there always exists a smooth plane curve i...
none3We study the connection between the generation of a fat point scheme supported at general poin...
together with its indirect forms are introduced. Logical relationships between these formulas and be...
An Andre embedding is a representation of a point-line geometry S with approximately s(2) points on ...
The author proves in a purely algebraic way that any flat geo-odular space is an affine space and vi...
Information on the Hilbert function of a finite set of fat points is relevant in a variety of studie...
We study homogeneous schemes of fat points in P^2 whose support is either a complete intersection (...
AbstractIn this paper, we address the following two general problems: given two algebraic varieties ...
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