About the Journal
Aims and Scope:
Mongolian Mathematical Journal (MMJ) is a peer-reviewed journal for publishing research and review papers on all areas of pure and applied mathematics, edited and published by the Mongolian Mathematical Society.
We welcome the submission of high-quality research and review papers in all areas of mainstream mathematics.
The topics include, but are not limited to the following topics:
- Analysis: Operator Theory, Real Analysis, Complex Analysis, Functional
Analysis, Harmonic Analysis etc.
- Algebra: Group Theory, Ring Theory, Advanced Linear Algebra, and Matrix
Analysis, Algebraic Geometry, Analytic Number Theory, K- theory, Radical Theory etc.
- Graph and Combinatorics: Extremal Graph Theory, Combinatorics, Coding
Theory, Cryptography, etc.
- Applied Mathematics and Computation: Optimizations, Approximation,
- Probability and Statistics: Financial Mathematics, Stochastic Processes
Peer Review Process:
All papers are refereed through a double-blind process. All submitted manuscripts will be peer-reviewed by at least two appropriately qualified experts in the field. One of them may be a member of the Editorial Board. The Editor
in chief will decide whether to accept, reject or request revisions based on the reviews
and comments received. If a manuscript is accepted for publication, authors will be
requested to submit a LaTeX file based on the template provided by the publisher.
Publication Frequency: The journal is published once a year.
Copyright and License: Copyright on any research article in the
Mongolian Mathematical Journal is retained by the author(s). The authors grant the
Mongolian Mathematical Journal a license to publish the article and identify itself as
the original publisher. Creative Commons Licence Articles in the Mongolian
Mathematical Journal are Open Access articles published under a Creative Commons
Attribution-Noncommercial 4.0 International License CC BY NC. This license permits
noncommercial use, distribution, and reproduction in any medium, provided the
original work is properly cited.