G
Grigory Panasenko
Researcher at Vilnius University
Publications - 104
Citations - 1019
Grigory Panasenko is an academic researcher from Vilnius University. The author has contributed to research in topics: Asymptotic expansion & Asymptotic analysis. The author has an hindex of 15, co-authored 93 publications receiving 827 citations. Previous affiliations of Grigory Panasenko include University of Lyon & Pierre-and-Marie-Curie University.
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Finite Platelet Size Could Be Responsible for Platelet Margination Effect
A Tokarev,A. A. Butylin,Elena A. Ermakova,Emmanuil E. Shnol,Grigory Panasenko,Fazoil I. Ataullakhanov,Fazoil I. Ataullakhanov +6 more
TL;DR: This analysis shows that the strong expulsion of the platelets from the core to the periphery of the blood vessel may mainly arise from the finite size of theplatelets, which impedes their positioning in between the densely packed erythrocytes in the core.
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Method of asymptotic partial decomposition of domain
TL;DR: A new method of partial decomposition of a domain is proposed for partial differential equations, based on the information about the structure of the asymptotic solution in different parts of the domain, to extract the subdomain of singular behavior of the solution and to simplify the problem in the sub domain of regular behavior ofThe solution.
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Asymptotic analysis of the non-steady Navier–Stokes equations in a tube structure. I. The case without boundary-layer-in-time
TL;DR: In this paper, the authors considered the non-steady Navier-Stokes equations with Dirichlet boundary conditions in thin tube structures and derived asymptotic partial domain decomposition.
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Asymptotic analysis of the non-steady Navier–Stokes equations in a tube structure. II. General case
TL;DR: In this article, the non-steady Navier-Stokes equations with Dirichlet boundary conditions are considered in thin tube structures, and the complete asymptotic expansion of the solution is constructed.
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Asymptotic methods for micropolar fluids in a tube structure
TL;DR: In this article, the steady motion of a micropolar fluid through a wavy tube with the dimensions depending on a small parameter is studied, and error estimates are proved by using a boundary layer method.