Detail Page

Item Picture
written by Kostas Papamichalis
A collection of N cells placed at the vertices of a 2d lattice, is considered. Each individual cell can contain no more than one particle. Every particle can emerge from an infinite reservoir of particles or get eliminated into it.  At any given moment t, every cell is possible to exist in one of two distinct states A (unoccupied ) or B (occupied). If at time t a cell is in A, the probability of transitioning to B within the infinitesimal interval [t,t+Dt) equals wABDt. Conversely, if at time t it is in B, then the probability of transitioning back to state A equals wBADt.

In this work, the following topics are studied:
1) A master equation that describes the evolution of each cell is derived and the limiting behaviour of its solution is obtained.
2) A Lyapunov function that corresponds to the master equation is constructed.

It is demonstrated and confirmed experimentally that, regardless of its initial state, the system converges towards its equilibrium state. It is confirmed that the stationary state of the system is described by a Poisson distribution.
Subjects Levels Resource Types
Mathematical Tools
- Statistics
Thermo & Stat Mech
- Probability
= Poisson Distribution
- Upper Undergraduate
- Graduate/Professional
- Instructional Material
= Interactive Simulation
Intended Users Formats Ratings
- Learners
- text/html
  • Currently 0.0/5

Want to rate this material?
Login here!


Access Rights:
Free access
License:
This material is released under a Creative Commons Attribution-Share Alike 4.0 license.
Rights Holder:
Kostas Papamichalis
Record Creator:
Metadata instance created June 7, 2024 by kostas papamichalis
Record Updated:
June 13, 2024 by Lyle Barbato
Other Collections:

ComPADRE is beta testing Citation Styles!

Record Link
AIP Format
K. Papamichalis, (2024), WWW Document, (http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html).
AJP/PRST-PER
K. Papamichalis, Birth-Decay Process Model (2024), <http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html>.
APA Format
Papamichalis, K. (2024). Birth-Decay Process Model. Retrieved December 3, 2024, from http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html
Chicago Format
Papamichalis, Kostas. Birth-Decay Process Model. 2024. http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html (accessed 3 December 2024).
MLA Format
Papamichalis, Kostas. Birth-Decay Process Model. 2024. 3 Dec. 2024 <http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html>.
BibTeX Export Format
@misc{ Author = "Kostas Papamichalis", Title = {Birth-Decay Process Model}, Volume = {2024}, Number = {3 December 2024}, Year = {2024} }
Refer Export Format

%A Kostas Papamichalis %T Birth-Decay Process Model %D 2024 %U http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html %O text/html

EndNote Export Format

%0 Electronic Source %A Papamichalis, Kostas %D 2024 %T Birth-Decay Process Model %V 2024 %N 3 December 2024 %9 text/html %U http://users.sch.gr/kostaspapamichalis/webejs_birthDecayModel_kpm/index.html


Disclaimer: ComPADRE offers citation styles as a guide only. We cannot offer interpretations about citations as this is an automated procedure. Please refer to the style manuals in the Citation Source Information area for clarifications.

Citation Source Information

The AIP Style presented is based on information from the AIP Style Manual.

The APA Style presented is based on information from APA Style.org: Electronic References.

The Chicago Style presented is based on information from Examples of Chicago-Style Documentation.

The MLA Style presented is based on information from the MLA FAQ.

Birth-Decay Process Model:

Is Based On Easy Java Simulations Modeling and Authoring Tool

Use the Easy Java Simulations Modeling and Authoring Tool to edit and to explore the source code for the Birth-Decaay Process Model.

relation by Wolfgang Christian

Know of another related resource? Login to relate this resource to it.
Save to my folders

Contribute

Related Materials

Similar Materials