Nalimov Mikhail Yur'evich

Publications in Math-Net.Ru

1. Convergent perturbation theory and the strong coupling limit in quantum electrodynamics
   
   TMF, 216:3 (2023),  532–547
2. Composite operators of stochastic model A
   
   TMF, 216:3 (2023),  519–531
3. Kinetic coefficients in a time-dependent Green's function formalism at finite temperature
   
   TMF, 213:3 (2022),  538–554
4. Convergent perturbation theory for studying phase transitions
   
   TMF, 204:2 (2020),  226–241
5. Kinetic theory of boson gas
   
   TMF, 200:3 (2019),  507–521
6. Critical dynamics of the phase transition to the superfluid state
   
   TMF, 200:2 (2019),  361–377
7. Study of temperature Green's functions of graphene-like systems in a half-space
   
   TMF, 190:3 (2017),  426–439
8. Renormalization-group study of a superconducting phase transition: Asymptotic behavior of higher expansion orders and results of three-loop calculations
   
   TMF, 181:2 (2014),  374–386
9. Temperature Green's functions in Fermi systems: The superconducting phase transition
   
   TMF, 176:1 (2013),  89–97
10. Influence of hydrodynamic fluctuations on the phase transition in the $E$ and $F$ models of critical dynamics
    
    TMF, 176:1 (2013),  69–78
11. Microscopic justification of the stochastic F-model of critical dynamics
    
    TMF, 175:3 (2013),  398–407
12. Bose condensation: The viscosity critical dimension and developed turbulence
    
    TMF, 169:1 (2011),  89–99
13. Study of the higher-order asymptotic behavior of quantum field expansions in the theory of two-dimensional fully developed turbulence
    
    TMF, 169:1 (2011),  79–88
14. Borel resummation of the $\varepsilon$-expansion of the dynamical exponent $z$ in model A of the $\phi^4(O(n))$ theory
    
    TMF, 159:1 (2009),  96–108
15. Family of instantons of the Kraichnan model with a frozen velocity field
    
    TMF, 158:2 (2009),  200–213
16. Large-order asymptotic terms in perturbation theory: The first $(4-\epsilon)$-expansion correction to renormalization constants in the $O(n)$-symmetric theory
    
    TMF, 143:2 (2005),  211–230
17. Asymptotic Behavior of Higher-Order Perturbations: Scaling Functions of the $O(n)$-Symmetric $\phi^4$-Theory in the $(4-\epsilon)$-Expansion
    
    TMF, 129:3 (2001),  387–402
18. Asymptotic Behavior of Renormalization Constants in Higher Orders of the Perturbation Expansion for the $(4?\epsilon)$-Dimensionally Regularized $O(n)$-Symmetric $\phi^4$ Theory
    
    TMF, 126:3 (2001),  409–426
19. Renormalization group in the problem of the fully developed turbulence of a compresible fluid
    
    TMF, 110:3 (1997),  385–398
20. The renormalization group investigation of correlation functions and composite operators of the model of stohastic magnetic hydrodynamics
    
    TMF, 107:1 (1996),  142–154
21. Calculation of the spectra for developed decaying turbulence in the energy-containing and inertial regions
    
    TMF, 106:3 (1996),  416–424
22. The corrections to fully developed turbulent spectra due to the compressibility of fluid
    
    TMF, 106:3 (1996),  375–389
23. Renormalization-group approach to the problem of the effect of compressibility on the spectral properties of developed turbulence
    
    TMF, 104:2 (1995),  260–270
24. The perturbation expansion and goldstone singularities in the ordered phase of the $O_n$-symmetrical $\mathbf \Phi^4$-theory in half space
    
    TMF, 102:2 (1995),  223–236
25. The principle of maximum randomness in the theory of fully developed turbulence. II. Isotropic decaying turbulence
    
    TMF, 96:1 (1993),  150–159
26. The principle of maximum randomness in the theory of fully developed turbulence. I. Homogeneous isotropic turbulence
    
    TMF, 91:2 (1992),  294–308
27. Modified critical behavior in the $\varphi^4(O_n)$ model
    
    TMF, 91:1 (1992),  168–172
28. Goldstone singularities in the $4-\varepsilon$ expansion of the $\Phi^4$ theory
    
    TMF, 80:2 (1989),  212–225
29. Regular expansion for calculation of the renormalization-group functions in a theory with dimensional coupling constants
    
    TMF, 68:2 (1986),  210–224
30. $1/N$ expansion: Calculation of anomalous dimensions and mixing matrices in the order $1/N$ for $N\times p$ matrix gauge-invariant $\sigma$-model
    
    TMF, 58:2 (1984),  169–183
31. The $CP^{N-1}$ model: Calculation of anomalous dimensions and the mixing matrices in the order $1/N$
    
    TMF, 56:1 (1983),  15–30
32. Analog of dimensional regularization for calculation of the renormalization-group functions in the $1/n$ expansion for arbitrary dimension of space
    
    TMF, 55:2 (1983),  163–175