AbstractWe show that through a point of an affine variety there always exists a smooth plane curve inside the ambient affine space, which has the multiplicity of intersection with the variety at least 3. This result has an application to the study of affine schemes
AbstractWe show that any fat point (local punctual scheme) has at most one embedding in the affine s...
Abstract. The main result of the paper is an upper bound for oscillation of spatial curves around ge...
In this thesis, we study a conjecture made by D. McKinnon about rational approximations to rational ...
AbstractWe show that through a point of an affine variety there always exists a smooth plane curve i...
Bernik V, Götze F, Kukso O. On algebraic points in the plane near smooth curves. Lithuanian Mathemat...
International audienceWe classify closed curves isomorphic to the affine line in the complement of a...
We study smooth projective varieties X ⊆ PN of dimension n ≥ 3, such that for some linear (N-n+1)-di...
We introduce the notion of affine parallels to convex plane curves and study these bifurcations
For a pair of points in a smooth locally convex surface in 3-space, its mid-plane is the plane conta...
We study deformations of smooth rational curves on singular varieties. We define the multiplicity of...
Abstract. This paper is concerned with the problem of approximating in the Sobolev norm a homeomorph...
Abstract. In this paper we recall two basic conjectures on the developables of convex projective cur...
This is an expository account based mainly on an article by Jack Ohm titled “Space curves as ideal-t...
We show that any fat point (local punctual scheme) has at most one embedding in the affine space up ...
Abstract. We give necessary and sufficient topological conditions for a simple closed curve on a rea...
AbstractWe show that any fat point (local punctual scheme) has at most one embedding in the affine s...
Abstract. The main result of the paper is an upper bound for oscillation of spatial curves around ge...
In this thesis, we study a conjecture made by D. McKinnon about rational approximations to rational ...
AbstractWe show that through a point of an affine variety there always exists a smooth plane curve i...
Bernik V, Götze F, Kukso O. On algebraic points in the plane near smooth curves. Lithuanian Mathemat...
International audienceWe classify closed curves isomorphic to the affine line in the complement of a...
We study smooth projective varieties X ⊆ PN of dimension n ≥ 3, such that for some linear (N-n+1)-di...
We introduce the notion of affine parallels to convex plane curves and study these bifurcations
For a pair of points in a smooth locally convex surface in 3-space, its mid-plane is the plane conta...
We study deformations of smooth rational curves on singular varieties. We define the multiplicity of...
Abstract. This paper is concerned with the problem of approximating in the Sobolev norm a homeomorph...
Abstract. In this paper we recall two basic conjectures on the developables of convex projective cur...
This is an expository account based mainly on an article by Jack Ohm titled “Space curves as ideal-t...
We show that any fat point (local punctual scheme) has at most one embedding in the affine space up ...
Abstract. We give necessary and sufficient topological conditions for a simple closed curve on a rea...
AbstractWe show that any fat point (local punctual scheme) has at most one embedding in the affine s...
Abstract. The main result of the paper is an upper bound for oscillation of spatial curves around ge...
In this thesis, we study a conjecture made by D. McKinnon about rational approximations to rational ...
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