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27,033 results on '"Vasil'ev, A."'

1. The automorphism groups of small affine rank 3 graphs

Author

Guo, Jin, Vasil'ev, Andrey V., and Wang, Rui

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 20B25, 05E18, 05E30
Abstract

A rank 3 graph is an orbital graph of a rank 3 permutation group of even order. Despite the classification of rank 3 graphs being complete, see, e.g., Chapter 11 of the recent monograph 'Strongly regular graphs' by Brouwer and Van Maldeghem, the full automorphism groups of these graphs (equivalently, the 2-closures of rank 3 groups) have not been explicitly described, though a lot of information on this subject is available. In the present note, we address this problem for the affine rank 3 graphs. We find the automorphism groups for finitely many relatively small graphs and show that modulo known results, this provides the full description of the automorphism groups of the affine rank 3 graphs, thus reducing the general problem to the case when the socle of the automorphism group is nonabelian simple.

Published
2024

2. Closures of permutation groups with restricted nonabelian composition factors

Author

Ponomarenko, Ilia, Skresanov, Saveliy V., and Vasil'ev, Andrey V.

Subjects
Mathematics - Group Theory, 20B05 (Primary) 20B25, 20G40 (Secondary)
Abstract

Given a permutation group $G$ on a finite set $\Omega$, let $G^{(k)}$ denote the $k$-closure of $G$, that is, the largest permutation group on $\Omega$ having the same orbits in the induced action on $\Omega^k$ as $G$. Recall that a group is $\mathrm{Alt}(d)$-free if it does not contain a section isomorphic to the alternating group of degree $d$. Motivated by some problems in computational group theory, we prove that the $k$-closure of an $\mathrm{Alt}(d)$-free group is again $\mathrm{Alt}(d)$-free for $k \geq 4$ and $d \geq 25$., Comment: 20 pages

Published
2024

3. The structure of a finite group and the maximum $\pi$-index of its elements

Author

Liu, A-Ming and Vasil'ev, Andrey V.

Subjects
Mathematics - Group Theory, 20E45, 20D20
Abstract

Given a set of primes $\pi$, the $\pi$-index of an element $x$ of a finite group $G$ is the $\pi$-part of the index of the centralizer of $x$ in $G$. If $\pi=\{p\}$ is a singleton, we just say the $p$-index. If the $\pi$-index of $x$ is equal to $p_1^{k_1}\ldots p^{k_s}$, where $p_1,\ldots,p_s$ are distinct primes, then we set $\exp_\pi(x)=k_1+\ldots+k_s$. In this short note, we study how the number $\epsilon_\pi(G)=\max\{\epsilon_\pi(x):x\in G\}$ restricts the structure of the factor group $G/Z(G)$ of $G$ by its center. First, for a finite group $G$, we prove that $\phi_p(G/Z(G))\leq\epsilon_p(G)$, where $\phi_p(G/Z(G))$ is the Frattini length of a Sylow $p$-subgroup of $G/Z(G)$. Second, for a $\pi$-separable finite group $G$, we prove that $l_\pi(G/Z(G))\leq\epsilon_\pi(G)$, where $l_{\pi}(G/Z(G))$ is the $\pi$-length of $G/Z(G)$.

Published
2024

4. On $\mathrm{K}$-$\mathbb{P}_{t}$-subnormal subgroups of finite groups and related formations

Author

Vasil'ev, A. F. and Vasil'eva, T. I.

Subjects
Mathematics - Group Theory
Abstract

Let $t$ be a fixed natural number. A subgroup $H$ of a group $G$ will be called $\mathrm{K}$-$\mathbb{P}_{t}$-subnormal in $G$ if there exists a chain of subgroups $H = H_{0} \leq H_{1} \leq \cdots \leq H_{m-1} \leq H_{m} = G$ such that either $H_{i-1}$ is normal in $H_{i}$ or $|H_{i} : H_{i-1}|$ is a some prime $p$ and $p-1$ is not divisible by the $(t+1)$th powers of primes for every $i = 1,\ldots , n$. In this work, properties of $\mathrm{K}$-$\mathbb{P}_{t}$-subnormal subgroups and classes of groups with Sylow $\mathrm{K}$-$\mathbb{P}_{t}$-subnormal subgroups are obtained.

Published
2024

12. On recognition of the direct squares of the simple groups with abelian Sylow 2-subgroups

Author

Li, Tao, Moghaddamfar, A. R., Vasil'ev, Andrey V., and Wang, Zhigang

Subjects
Mathematics - Group Theory, 20D60, 20D06
Abstract

The spectrum of a group is the set of orders of its elements. Finite groups with the same spectra as the direct squares of the finite simple groups with abelian Sylow 2-subgroups are considered. It is proved that the direct square $J_1\times J_1$ of the sporadic Janko group $J_1$ and the direct squares ${^2}G_2(q)\times{^2}G_2(q)$ of the simple small Ree groups ${^2}G_2(q)$ are uniquely characterized by their spectra in the class of finite groups, while for the direct square $PSL_2(q)\times PSL_2(q)$ of a 2-dimensional simple linear group $PSL_2(q)$, there are always infinitely many groups (even solvable groups) with the same spectra.

Published
2023
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19. On computing the closures of solvable permutation groups

Author

Ponomarenko, Ilia and Vasil'ev, Andrey V.

Subjects
Mathematics - Group Theory, 20B25, 20B40, F.2.2
Abstract

Let $m\ge 3$ be an integer. It is proved that the $m$-closure of a given solvable permutation group of degree $n$ can be constructed in time $n^{O(m)}$., Comment: 7 pages

Published
2023
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25. On $p$-index extremal groups

Author

Vasil'ev, Andrey V. and Gorshkov, Ilya B.

Subjects
Mathematics - Group Theory, 20E45, 20D60
Abstract

The question on connection between the structure of a finite group $G$ and the properties of the indices of elements of $G$ has been a popular research topic for many years. The $p$-index $|x^G|_p$ of an element $x$ of a group $G$ is the $p$-part of its index $|x^G|=|G:C_G(x)|$. The presented short note describes some new results and open problems in this direction, united by the concept of the $p$-index of a group element.

Published
2023
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26. On the Generalized Fitting Height and Nonsoluble Length of the Mutually Permutable Products of Finite Groups

Author

Murashka, Viachaslau I. and Vasil'ev, Alexander F.

Subjects
Mathematics - Group Theory, 20D40, 20D25
Abstract

The generalized Fitting height $h^*(G)$ of a finite group $G$ is the least number $h$ such that $\mathrm{F}_h^* (G) = G$, where $\mathrm{F}_{(0)}^* (G) = 1$, and $\mathrm{F}_{(i+1)}^*(G)$ is the inverse image of the generalized Fitting subgroup $\mathrm{F}^*(G/\mathrm{F}^*_{(i)} (G))$. Let $p$ be a prime, $1=G_0\leq G_1\leq\dots\leq G_{2h+1}=G$ be the shortest normal series in which for $i$ odd the factor $G_{i+1}/G_i$ is $p$-soluble (possibly trivial), and for $i$ even the factor $G_{i+1}/G_i$ is a (non-empty) direct product of nonabelian simple groups. Then $h=\lambda_p(G)$ is called the non-$p$-soluble length of a group $G$. We proved that if a finite group $G$ is a mutually permutable product of of subgroups $A$ and $B$ then $\max\{h^*(A), h^*(B)\}\leq h^*(G)\leq \max\{h^*(A), h^*(B)\}+1$ and $\max\{\lambda_p(A), \lambda_p(B)\}= \lambda_p(G)$. Also we introduced and studied the non-Frattini length., Comment: arXiv admin note: substantial text overlap with arXiv:2103.13354

Published
2023

30. On recognition of direct powers of finite simple linear groups by spectrum

Author

Yang, N., Gorshkov, I. B., Staroletov, A. M., and Vasil'ev, A. V.

Subjects
Mathematics - Group Theory, 20D06
Abstract

The spectrum of a finite group is the set of its element orders. We give an affirmative answer to Problem 20.58(a) from the Kourovka Notebook proving that for every positive integer $k$, the $k$-th direct power of the simple linear group $L_{n}(2)$ is uniquely determined by its spectrum in the class of finite groups provided $n$ is a power of $2$ greater than or equal to $56k^2$., Comment: 17 pages

Published
2022
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31. Organophosphorus S-adenosyl-L-methionine mimetics: synthesis, stability, and substrate properties

Author

Alexander Yu Rudenko, Sofia S. Mariasina, Anastasiia K. Bolikhova, Maxim V. Nikulin, Ratislav M. Ozhiganov, Vasiliy G. Vasil’ev, Yuri A. Ikhalaynen, Anastasia L. Khandazhinskaya, Maxim A. Khomutov, Peter V. Sergiev, Alex R. Khomutov, and Vladimir I. Polshakov

Subjects
S-adenosyl-L-methionine, SAM analogs, halide methyltransferase, MAT2A, COMT, WBSCR27, Chemistry, QD1-999
Abstract

S-Adenosyl-l-methionine (SAM)-mediated methylation of biomolecules controls their function and regulates numerous vital intracellular processes. Analogs of SAM with a reporter group in place of the S-methyl group are widely used to study these processes. However, many of these analogs are chemically unstable that largely limits their practical application. We have developed a new compound, SAM-PH, which contains an H-phosphinic group (-P(O)(H)OH) instead of the SAM carboxylic group. SAM-PH is significantly more stable than SAM, retains functional activity in catechol-O-methyltransferase and methyltransferase WBSCR27 reactions. The last is associated with Williams–Beuren syndrome. Rac-SAM-PH was synthesized chemically, while (R,S)-SAM-PH and its analogs were prepared enzymatically either from H-phosphinic analogs of methionine (Met-PH) or H-phosphinic analog of S-adenosyl-l-homocysteine (SAH-PH) using methionine adenosyltransferase 2A or halide methyltransferases, respectively. SAH-PH undergoes glycoside bond cleavage in the presence of methylthioadenosine nucleosidase like natural SAH. Thus, SAM-PH and its analogs are promising new tools for investigating methyltransferases and incorporating reporter groups into their substrates.

Published
2024
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