Our base field is the field ℂ of complex numbers. We study families of reductive group actions on $$ {\mathbb A} $$ 2 parametrized by curves and show that every faithful action of a non-finite reductive group on $$ {\mathbb A} $$ 3 is linearizable, i.e., G-isomorphic to a representation of G. The difficulties arise for non-connected groups G. We prove a Generic Equivalence Theorem which says that two affine morphisms : S ⟶ Y and q : Τ ⟶ Y of varieties with isomorphic (closed) fibers become isomorphic under a dominant étale base change φ: U ⟶ Y . A special case is the following result. Call a morphism φ: X ⟶ Y a fibration with fiber F if φ is at and all fibers are (reduced and) isomorphic to F. Then an affine fibration with fiber F admits an...
AbstractLet G be an algebraic reductive group over a field of positive characteristic. Choose a para...
Let $G$ be a reductive group and $X$ a smooth projective curve. We prove that, for $G$ classical and...
AbstractWe say that an algebraic group G over a field is anti-affine if every regular function on G ...
We study families of reductive group actions on A2 parametrized by curves and show that every faithf...
Let $G$ be a reductive group. We prove that a family of polynomial actions of $G$ on $\mathbb{C}^2$,...
AbstractAlgebraic actions of unipotent groups U on affine k-varieties X (k is an algebraically close...
We prove the geometrical Satake isomorphism for a reductive group defined over F=k((t)), and split ...
International audienceWe extend the methods of geometric invariant theory to actions of non-reductiv...
International audienceWe prove that topologically isomorphic linear cellular automaton shifts are al...
Considering a certain construction of algebraic varieties $X$ endowed with an algebraic action of th...
Let $R$ be a discrete valuation ring with fraction field $K$. Let $X$ be a flat $R$-scheme of finite...
Abstract.: Let G be a connected simple semisimple algebraic group over a local field F of arbitrary ...
Based on results about commuting automorphisms of affine varieties due to Cantat, Xie and the first ...
We prove that topologically isomorphic linear cellular automaton shifts are algebraically isomorphic...
Abstract. We show that every algebraic action of a linearly reductive group on a–ne n-space Cn which...
AbstractLet G be an algebraic reductive group over a field of positive characteristic. Choose a para...
Let $G$ be a reductive group and $X$ a smooth projective curve. We prove that, for $G$ classical and...
AbstractWe say that an algebraic group G over a field is anti-affine if every regular function on G ...
We study families of reductive group actions on A2 parametrized by curves and show that every faithf...
Let $G$ be a reductive group. We prove that a family of polynomial actions of $G$ on $\mathbb{C}^2$,...
AbstractAlgebraic actions of unipotent groups U on affine k-varieties X (k is an algebraically close...
We prove the geometrical Satake isomorphism for a reductive group defined over F=k((t)), and split ...
International audienceWe extend the methods of geometric invariant theory to actions of non-reductiv...
International audienceWe prove that topologically isomorphic linear cellular automaton shifts are al...
Considering a certain construction of algebraic varieties $X$ endowed with an algebraic action of th...
Let $R$ be a discrete valuation ring with fraction field $K$. Let $X$ be a flat $R$-scheme of finite...
Abstract.: Let G be a connected simple semisimple algebraic group over a local field F of arbitrary ...
Based on results about commuting automorphisms of affine varieties due to Cantat, Xie and the first ...
We prove that topologically isomorphic linear cellular automaton shifts are algebraically isomorphic...
Abstract. We show that every algebraic action of a linearly reductive group on a–ne n-space Cn which...
AbstractLet G be an algebraic reductive group over a field of positive characteristic. Choose a para...
Let $G$ be a reductive group and $X$ a smooth projective curve. We prove that, for $G$ classical and...
AbstractWe say that an algebraic group G over a field is anti-affine if every regular function on G ...