Continuum Model of the Two-Component Becker-Döring Equations

Soheili, Ali Reza

doi:10.1155/S0161171204304084

Resource type

Article

Date created

2004

Authors/Contributors

Author: Soheili, Ali Reza

Abstract

The process of collision between particles is a subject of interest in many fields of physics, astronomy, polymer physics, atmospheric physics, and colloid chemistry. If two types of particles are allowed to participate in the cluster coalescence, then the time evolution of the cluster distribution has been described by an infinite system of ordinary differential equations. In this paper, we describe the model with a second-order two-dimensional partial differential equation, as a continuum model.

Published as

International Journal of Mathematics and Mathematical Sciences
Volume 2004 (2004), Issue 49, Pages 2641-2648
http://dx.doi.org/10.1155/S0161171204304084

Publication details

Publication title

International Journal of Mathematics and Mathematical Sciences

Document title

Continuum Model of the Two-Component Becker-Döring Equations

Date

2004

Volume

2004

Issue

49

First page

2641

Last page

2648

Publisher DOI

10.1155/S0161171204304084

Copyright statement

Copyright is held by the author(s).

Permissions

You are free to copy, distribute and transmit this work under the following conditions: You must give attribution to the work (but not in any way that suggests that the author endorses you or your use of the work); You may not use this work for commercial purposes.

Scholarly level

Faculty/Staff

Peer reviewed?

Yes

Language

English

Member of collection

Mathematics

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Continuum Model of the Two-Component Becker-Döring Equations

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