ASYMPTOTIC LOCALIZATION IN MULTICOMPONENT MASS CONSERVING COAGULATION EQUATIONS

Marina A. Ferreira; Jani Lukkarinen; Alessia Nota; Juan J. L. Velázquez

doi:10.2140/paa.2024.6.731

ASYMPTOTIC LOCALIZATION IN MULTICOMPONENT MASS CONSERVING COAGULATION EQUATIONS

Marina A. Ferreira, Jani Lukkarinen, Alessia Nota, Juan J. L. Velázquez

Tutkimustuotos: Artikkelijulkaisu › Artikkeli › Tieteellinen › vertaisarvioitu

Abstrakti

We prove that the time-dependent solutions of a large class of Smoluchowski coagulation equations for multicomponent systems concentrate along a particular direction of the space of cluster compositions for long times. The direction of concentration is determined by the initial distribution of clusters. These results allow to prove the uniqueness and global stability of the self-similar profile with finite mass in the case of coagulation kernels which are not identically constant, but are constant along any direction of the space of cluster compositions.

Alkuperäiskieli	englanti
Lehti	Pure and applied analysis
Vuosikerta	6
Numero	3
Sivut	731-764
Sivumäärä	34
ISSN	2578-5893
DOI - pysyväislinkit	https://doi.org/10.2140/paa.2024.6.731
Tila	Julkaistu - 2024
OKM-julkaisutyyppi	A1 Alkuperäisartikkeli tieteellisessä aikakauslehdessä, vertaisarvioitu

Lisätietoja

Publisher Copyright:
© 2024 The Authors, under license to MSP (Mathematical Sciences Publishers).

Tieteenalat

111 Matematiikka

Pääsy asiakirjaan

10.2140/paa.2024.6.731

Siteeraa tätä

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title = "ASYMPTOTIC LOCALIZATION IN MULTICOMPONENT MASS CONSERVING COAGULATION EQUATIONS",

abstract = "We prove that the time-dependent solutions of a large class of Smoluchowski coagulation equations for multicomponent systems concentrate along a particular direction of the space of cluster compositions for long times. The direction of concentration is determined by the initial distribution of clusters. These results allow to prove the uniqueness and global stability of the self-similar profile with finite mass in the case of coagulation kernels which are not identically constant, but are constant along any direction of the space of cluster compositions.",

keywords = "localization, multicomponent Smoluchowski{\textquoteright}s equation, self-similarity, stability, time-dependent solutions, 111 Mathematics",

author = "Ferreira, {Marina A.} and Jani Lukkarinen and Alessia Nota and Vel{\'a}zquez, {Juan J. L.}",

note = "Publisher Copyright: {\textcopyright} 2024 The Authors, under license to MSP (Mathematical Sciences Publishers).",

year = "2024",

doi = "10.2140/paa.2024.6.731",

language = "English",

volume = "6",

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journal = " Pure and applied analysis",

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TY - JOUR

T1 - ASYMPTOTIC LOCALIZATION IN MULTICOMPONENT MASS CONSERVING COAGULATION EQUATIONS

AU - Ferreira, Marina A.

AU - Lukkarinen, Jani

AU - Nota, Alessia

AU - Velázquez, Juan J. L.

PY - 2024

Y1 - 2024

N2 - We prove that the time-dependent solutions of a large class of Smoluchowski coagulation equations for multicomponent systems concentrate along a particular direction of the space of cluster compositions for long times. The direction of concentration is determined by the initial distribution of clusters. These results allow to prove the uniqueness and global stability of the self-similar profile with finite mass in the case of coagulation kernels which are not identically constant, but are constant along any direction of the space of cluster compositions.

AB - We prove that the time-dependent solutions of a large class of Smoluchowski coagulation equations for multicomponent systems concentrate along a particular direction of the space of cluster compositions for long times. The direction of concentration is determined by the initial distribution of clusters. These results allow to prove the uniqueness and global stability of the self-similar profile with finite mass in the case of coagulation kernels which are not identically constant, but are constant along any direction of the space of cluster compositions.

KW - localization

KW - multicomponent Smoluchowski’s equation

KW - self-similarity

KW - stability

KW - time-dependent solutions

KW - 111 Mathematics

U2 - 10.2140/paa.2024.6.731

DO - 10.2140/paa.2024.6.731

M3 - Article

AN - SCOPUS:85206931723

SN - 2578-5893

VL - 6

SP - 731

EP - 764

JO - Pure and applied analysis

JF - Pure and applied analysis

IS - 3

ER -