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|Title:||Analysis of Smoluchowski’s Coagulation Equation with Injection|
|Authors:||Makoveeva, E. V.|
Alexandrov, D. V.
Fedotov, S. P.
|Citation:||Makoveeva E. V. Analysis of Smoluchowski’s Coagulation Equation with Injection / E. V. Makoveeva, D. V. Alexandrov, S. P. Fedotov // Crystals. — 2022. — Vol. 12. — Iss. 8. — 1159.|
|Abstract:||The stationary solution of Smoluchowski’s coagulation equation with injection is found analytically with different exponentially decaying source terms. The latter involve a factor in the form of a power law function that plays a decisive role in forming the steady-state particle distribution shape. An unsteady analytical solution to the coagulation equation is obtained for the exponentially decaying initial distribution without injection. An approximate unsteady solution is constructed by stitching the initial and final (steady-state) distributions. The obtained solutions are in good agreement with experimental data for the distributions of endocytosed low-density lipoproteins. © 2022 by the authors.|
SMOLUCHOWSKI’S EQUATION WITH INJECTION
|metadata.dc.description.sponsorship:||Ministry of Science and Higher Education of the Russian Federation|
The research funding from the Ministry of Science and High Education of the Russian Federation (Ural Federal University Program of Development within the Priority-2030 Program) is gratefully acknowledged.
|Appears in Collections:||Научные публикации, проиндексированные в SCOPUS и WoS CC|
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