Kompaniets Mikhail Vladimirovich

Publications in Math-Net.Ru

1. Representation of renormalization group functions by nonsingular integrals in a model of the critical dynamics of ferromagnets: The fourth order of the $\varepsilon$-expansion
   
   TMF, 195:1 (2018),  105–116
2. Critical behavior of the $O(n)$ $\phi^4$ model with an antisymmetric tensor order parameter: Three-loop approximation
   
   TMF, 190:2 (2017),  239–253
3. Renormalization group in the infinite-dimensional turbulence: determination of the RG-functions without renormalization constants
   
   Nanosystems: Physics, Chemistry, Mathematics, 6:4 (2015),  461–469
4. Representation of the $\beta$-function and anomalous dimensions by nonsingular integrals in models of critical dynamics
   
   TMF, 185:1 (2015),  3–11
5. 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
6. Principle of maximal randomness and parity violation in turbulence
   
   TMF, 176:1 (2013),  3–12
7. Representation of the $\beta$-function and anomalous dimensions by nonsingular integrals: Proof of the main relation
   
   TMF, 175:3 (2013),  325–336
8. Renormalization group and the $\varepsilon$-expansion: Representation of the $\beta$-function and anomalous dimensions by nonsingular integrals
   
   TMF, 169:1 (2011),  100–111
9. Renormalization group in the theory of turbulence: Three-loop approximation as $d\to\infty$
   
   TMF, 158:3 (2009),  460–477
10. $H$-Model of critical dynamics: Two-loop calculations of RG functions and critical indices
    
    TMF, 119:1 (1999),  73–92