Special Issue: 63
Mathematical Modelling using differential Equations
for the journal WSEAS Transactions on Mathematics (Scopus indexed)
Organizer:
Dr. Papiya Debnath (Ph.D, M. Phil, University of Calcutta)
Assistant Professor, Mathematics Techno International New Town
Kolkata- 700156
Mob: 9674947712
Email: debpapiya@gmail.com, papiya.debnath@tict.edu.in
Aim:
The theory of difference equations, the methods used and their wide applications have advanced beyond their adolescent stage to occupy a central position in Applicable Analysis. In this special issue, Emphasis are placed on developments in the theory of population problem, resonance and chaos analysis, delay differential model, integro-differential, impulsive differential and difference equations and their applications. The aim of the special issue is to report new developments in the field of difference equations, and their applications in all fields. This Journal will accept high quality papers containing original research results and survey articles of exceptional merit. The keywords of the special issues (but not limited to) are given below.
Topics:
- Boundary Value Problems and Nonlinear boundary-value problems
- ODE and PDE
- Fractional differential equations
- Approximation theory
- Polynomial interpolation, Spectral problems
- Evolution operators
- Dynamical systems
- Regular and Singular Perturbations
- Resonance, Chaos and Asymptotic Analysis
- Stability theory
How to submit:
You can upload your paper via the web site of the particular
WSEAS journal indicating in the Field: "Notes" the title of the Special Issue
Note that the Deadline for Paper submission is 31st December of 2021.
However the organizers review the papers and publish them in a continuous flow. You do not need to wait the acceptance of the other papers in your session to publish your paper. In case that your paper passes the first round of review (some times the second round of review), it can be published if you satisfy the reviewers' comments and remarks and the Editor-in-Chief decides that your paper You do not have to wait the peer review of the other papers in your Session.