Add to ORKGThe Danielewski hypersurfaces are the hypersurfaces X Q,n in $ {\mathbb{C}^3} $ defined by an equation of the form x n y = Q(x, z) where n ⩾ 1 and Q(x, z) is a polynomial such that Q(0, z) is of degree at least two. They were studied by many authors during the last twenty years. In the present article, we give their classification as algebraic varieties. We also give their classification up to automorphism of the ambient space. As a corollary, we obtain that every Danielewski hypersurface X Q,n with n ⩾ 2 admits at least two nonequivalent embeddings into $ {\mathbb{C}^3}
In a recent paper Ahlgren, Ono and Penniston described the L-series of K3 surfaces from a certain on...
In this paper, we address the following two general problems: given two algebraic varieties in Cn, f...
Besides its construction as a quotient of an abelian surface, a Kummer surface can be obtained as th...
The Danielewski hypersurfaces are the hypersurfaces $X_{Q,n}$ in $\mathbb{C}^3$ defined by an equati...
In this thesis, we study a class of hypersurfaces in $\mathbb{C}^3$, called \emph{Danielewski hypers...
Revised version with simplified proofs. A classification of special Danielewski surfaces admitting m...
AbstractIn [L. Makar-Limanov, On groups of automorphisms of a class of surfaces, Israel J. Math. 69 ...
International audienceWe consider the family of complex polynomials in \C[x,y,z] of the form x^2y-z^...
We give the classification of all complete algebraic vector fields on Danielewski surfaces (smooth s...
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This thesis is a collection of various results related to the arithmetic of K3 surfaces and hypersur...
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We will prove that there are infinitely many families of K3 surfaces which both admit a finite sympl...
Consider any rational Hodge isometry $\psi:H^2(S_1,\QQ)\rightarrow H^2(S_2,\QQ)$ between any two K\ ...
We describe a method to construct hypersurfaces of the complex affine n-space with isomorphic C*-cyl...
In a recent paper Ahlgren, Ono and Penniston described the L-series of K3 surfaces from a certain on...
In this paper, we address the following two general problems: given two algebraic varieties in Cn, f...
Besides its construction as a quotient of an abelian surface, a Kummer surface can be obtained as th...
The Danielewski hypersurfaces are the hypersurfaces $X_{Q,n}$ in $\mathbb{C}^3$ defined by an equati...
In this thesis, we study a class of hypersurfaces in $\mathbb{C}^3$, called \emph{Danielewski hypers...
Revised version with simplified proofs. A classification of special Danielewski surfaces admitting m...
AbstractIn [L. Makar-Limanov, On groups of automorphisms of a class of surfaces, Israel J. Math. 69 ...
International audienceWe consider the family of complex polynomials in \C[x,y,z] of the form x^2y-z^...
We give the classification of all complete algebraic vector fields on Danielewski surfaces (smooth s...
International audienceA special Danielewski surface is an affine surface which is the total space of...
This thesis is a collection of various results related to the arithmetic of K3 surfaces and hypersur...
We describe the set of all locally nilpotent derivations of the quotient ring K[X,Y, Z]/(f (X)Y - ph...
We will prove that there are infinitely many families of K3 surfaces which both admit a finite sympl...
Consider any rational Hodge isometry $\psi:H^2(S_1,\QQ)\rightarrow H^2(S_2,\QQ)$ between any two K\ ...
We describe a method to construct hypersurfaces of the complex affine n-space with isomorphic C*-cyl...
In a recent paper Ahlgren, Ono and Penniston described the L-series of K3 surfaces from a certain on...
In this paper, we address the following two general problems: given two algebraic varieties in Cn, f...
Besides its construction as a quotient of an abelian surface, a Kummer surface can be obtained as th...