Gaifullin, Sergey scite author profile

Gaifullin, Sergey

3Publications

55Citation Statements Received

74Citation Statements Given

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Affiliations

Moscow Center For Continuous Mathematical Education, National Research University Higher School of Economics, Lomonosov Moscow State University

Publications

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The automorphism group of a rigid affine variety

Arzhantsev

Sergey

2016

Math. Nachr.

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An irreducible algebraic variety $X$ is rigid if it admits no nontrivial action of the additive group of the ground field. We prove that the automorphism group $\text{Aut}(X)$ of a rigid affine variety contains a unique maximal torus $\mathbb{T}$. If the grading on the algebra of regular functions $\mathbb{K}[X]$ defined by the action of $\mathbb{T}$ is pointed, the group $\text{Aut}(X)$ is a finite extension of $\mathbb{T}$. As an application, we describe the automorphism group of a rigid trinomial affine hypersurface and find all isomorphisms between such hypersurfaces.Comment: 12 page

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Affine toric SL(2)-embeddings

Sergey¹

2008

Sb. Math.

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In 1973 V.L.Popov classified affine SL(2)-embeddings. He proved that a locally transitive SL(2)-action on a normal affine three-dimensional variety X is uniquely determined by a pair ( p q , r), where 0 < p q ≤ 1 is an uncancelled fraction and r is a positive integer. Here r is the order of the stabilizer of a generic point. In this paper we show that the variety X is toric, i.e. admits a locally transitive action of an algebraic torus, if and only if r is divisible by q − p. To do this we prove the following necessary and sufficient condition for an affine G/H-embedding to be toric. Suppose X is a normal affine variety, G is a simply connected semisimple algebraic group acting regularly on X, H is a closed subgroup of G such that the character group X(H) is finite and G/H ֒→ X is a dense open equivariant embedding. Then X is toric if and only if there exist a quasitorus bT and a (G × b T )-module V such that X G ∼

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Deformations of Period Lattices of Flexible Polyhedral Surfaces

Gaifullin

Sergey

2014

Discrete Comput Geom

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Abstract. In the end of the 19th century Bricard discovered a phenomenon of flexible polyhedra, that is, polyhedra with rigid faces and hinges at edges that admit non-trivial flexes. One of the most important results in this field is a theorem of Sabitov asserting that the volume of a flexible polyhedron is constant during the flexion. In this paper we study flexible polyhedral surfaces in R 3 two-periodic with respect to translations by two non-colinear vectors that can vary continuously during the flexion. The main result is that the period lattice of a flexible two-periodic surface homeomorphic to a plane cannot have two degrees of freedom.

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