2-years impact-factor Math-Net.Ru of «Algebra i Analiz» journal, 2021

2-years impact-factor Math-Net.Ru of the journal in 2021 is calculated as the number of citations in 2021 to the scientific papers published during 2019–2020.

The table below contains the list of citations in 2021 to the papers published in 2019–2020. We take into account all citing publications we found from different sources, mostly from references lists available on Math-Net.Ru. Both original and translation versions are taken into account.

The impact factor Math-Net.Ru may change when new citations to a year given are found.

1 2 3 4 5  Full list
N	Citing pulication		Cited paper
1.	A. F. Vakulenko, “O razlozheniyakh po proizvedeniyam garmonicheskikh polinomov v ${\mathbb R}^3$”, Matematicheskie voprosy teorii rasprostraneniya voln. 51, Zap. nauchn. sem. POMI, 506, POMI, SPb., 2021, 36–42	→	On algebras of harmonic quaternion fields in ${\mathbb R}^3$ M. I. Belishev, A. F. Vakulenko Algebra i Analiz, 31:1 (2019),  1–17
2.	Orevkov S.Yu., “Algebraically Unrealizable Complex Orientations of Plane Real Pseudoholomorphic Curves”, Geom. Funct. Anal., 31:4 (2021), 930–947	→	Separating semigroup of hyperelliptic curves and of genus 3 curves S. Yu. Orevkov Algebra i Analiz, 31:1 (2019),  108–113
3.	D. A. Polyakova, Trends in Mathematics, Operator Theory and Differential Equations, 2021, 163	→	General solution of homogeneous convolution equation in spaces of ultradifferentiable functions D. A. Polyakova Algebra i Analiz, 31:1 (2019),  114–142
4.	B. N. Khabibullin, “Globalnaya ogranichennost funktsii konechnogo poryadka, ogranichennykh vne malykh mnozhestv”, Matem. sb., 212:11 (2021), 116–127	→	Balayage of measures and subharmonic functions on a system of rays. I. Classic case B. N. Khabibullin, A. V. Shmelyova Algebra i Analiz, 31:1 (2019),  156–210
5.	A. E. Salimova, B. N. Khabibullin, “Rost tselykh funktsii eksponentsialnogo tipa i kharakteristiki raspredelenii tochek vdol pryamoi na kompleksnoi ploskosti”, Ufimsk. matem. zhurn., 13:3 (2021), 116–128	→	Balayage of measures and subharmonic functions on a system of rays. I. Classic case B. N. Khabibullin, A. V. Shmelyova Algebra i Analiz, 31:1 (2019),  156–210
6.	B. N. Khabibullin, E. B. Menshikova, “Balayage of measures with respect to polynomials and logarithmic kernels on the complex plane”, Lobachevskii J. Math., 42:12 (2021), 2823–2833	→	Balayage of measures and subharmonic functions on a system of rays. I. Classic case B. N. Khabibullin, A. V. Shmelyova Algebra i Analiz, 31:1 (2019),  156–210
7.	B. N. Khabibullin, “The logarithm of the modulus of an entire function as a minorant for a subharmonic function outside a small exceptional set”, Azerbaijan J. Math., 11:2 (2021), 48–59	→	Balayage of measures and subharmonic functions on a system of rays. I. Classic case B. N. Khabibullin, A. V. Shmelyova Algebra i Analiz, 31:1 (2019),  156–210
8.	V. G. Tkachev, “The universality of one half in commutative nonassociative algebras with identities”, J. Algebra, 569 (2021), 466–510	→	Spectral properties of nonassociative algebras and breaking regularity for nonlinear elliptic type PDEs V. G. Tkachev Algebra i Analiz, 31:2 (2019),  51–74
9.	M. Chen, “Fractional-order adaptive p-Laplace equation-based art image edge detection”, Adv. Math. Phys., 2021 (2021), 2337712	→	Spectral properties of nonassociative algebras and breaking regularity for nonlinear elliptic type PDEs V. G. Tkachev Algebra i Analiz, 31:2 (2019),  51–74
10.	M. Chen, “Fractional-order adaptive p-Laplace equation-based art image edge detection”, Adv. Math. Phys., 2021 (2021), 2337712	→	Note on an eigenvalue problem for an ODE originating from a homogeneous $ p$-harmonic function M. Akman, J. Lewis, A. Vogel Algebra i Analiz, 31:2 (2019),  75–87
11.	I. I. Skrypnik, M. V. Voitovych, “B-1 classes of De Giorgi–Ladyzhenskaya–Ural'tseva and their applications to elliptic and parabolic equations with generalized Orlicz growth conditions”, Nonlinear Anal.-Theory Methods Appl., 202 (2021), 112135	→	Behavior of solutions of the Dirichlet Problem for the $ p(x)$-Laplacian at a boundary point Yu. A. Alkhutov, M. D. Surnachev Algebra i Analiz, 31:2 (2019),  88–117
12.	Yu. A. Alkhutov, M. D. Surnachev, “Vnutrennyaya i granichnaya nepreryvnost $p(x)$-garmonicheskikh funktsii”, Kraevye zadachi matematicheskoi fiziki i smezhnye voprosy teorii funktsii. 49, K yubileyu Grigoriya Aleksandrovicha SEREGINA, Zap. nauchn. sem. POMI, 508, POMI, SPb., 2021, 7–38	→	Behavior of solutions of the Dirichlet Problem for the $ p(x)$-Laplacian at a boundary point Yu. A. Alkhutov, M. D. Surnachev Algebra i Analiz, 31:2 (2019),  88–117
13.	G. Mingione, V. Radulescu, “Recent developments in problems with nonstandard growth and nonuniform ellipticity”, J. Math. Anal. Appl., 501:1, SI (2021), 125197	→	Behavior of solutions of the Dirichlet Problem for the $ p(x)$-Laplacian at a boundary point Yu. A. Alkhutov, M. D. Surnachev Algebra i Analiz, 31:2 (2019),  88–117
14.	M. A. Shan, I. I. Skrypnik, M. V. Voitovych, “Harnack's inequality for quasilinear elliptic equations with generalized Orlicz growth”, Electron. J. Differ. Equ., 2021	→	Behavior of solutions of the Dirichlet Problem for the $ p(x)$-Laplacian at a boundary point Yu. A. Alkhutov, M. D. Surnachev Algebra i Analiz, 31:2 (2019),  88–117
15.	Maria A. Shan, Igor I. Skrypnik, Mykhailo V. Voitovych, “Harnack's inequality for quasilinear elliptic equations with generalized Orlicz growth”, ejde, 2021:01-104 (2021), 27	→	Behavior of solutions of the Dirichlet Problem for the $ p(x)$-Laplacian at a boundary point Yu. A. Alkhutov, M. D. Surnachev Algebra i Analiz, 31:2 (2019),  88–117
16.	Yu. A. Alkhutov, M. D. Surnachev, “The Boundary Behavior of a Solution to the Dirichlet Problem for a Linear Degenerate Second Order Elliptic Equation”, J Math Sci, 259:2 (2021), 109	→	Behavior of solutions of the Dirichlet Problem for the $ p(x)$-Laplacian at a boundary point Yu. A. Alkhutov, M. D. Surnachev Algebra i Analiz, 31:2 (2019),  88–117
17.	Y. Miyanishi, G. Rozenblum, “Spectral properties of the Neumann-Poincare operator in 3D elasticity”, Int. Math. Res. Notices, 2021:11 (2021), 8715–8740	→	Eigenvalues of the Neumann–Poincare operator in dimension 3: Weyl's law and geometry Y. Miyanishi, G. Rozenblum Algebra i Analiz, 31:2 (2019),  248–268
18.	K. Ando, H. Kang, Y. Miyanishi, M. Putinar, “Spectral analysis of Neumann-Poincare operator”, Rev. Roum. Math. Pures Appl., 66:3-4 (2021), 545–575	→	Eigenvalues of the Neumann–Poincare operator in dimension 3: Weyl's law and geometry Y. Miyanishi, G. Rozenblum Algebra i Analiz, 31:2 (2019),  248–268
19.	K. Ando, H. Kang, Y. Miyanishi, T. Nakazawa, “Surface localization of plasmons in three dimensions and convexity”, SIAM J. Appl. Math., 81:3 (2021), 1020–1033	→	Eigenvalues of the Neumann–Poincare operator in dimension 3: Weyl's law and geometry Y. Miyanishi, G. Rozenblum Algebra i Analiz, 31:2 (2019),  248–268
20.	Lorenzo Baldassari, Pierre Millien, Alice L. Vanel, “Modal approximation for plasmonic resonators in the time domain: the scalar case”, Partial Differ. Equ. Appl., 2:4 (2021)	→	Eigenvalues of the Neumann–Poincare operator in dimension 3: Weyl's law and geometry Y. Miyanishi, G. Rozenblum Algebra i Analiz, 31:2 (2019),  248–268
1 2 3 4 5  Full list