Axioms: Comparison
Please note this is a comparison between Version 3 by Catherine Yang and Version 4 by Catherine Yang.

Axioms (ISSN 2075-1680) is an international, peer-reviewed, open access journal of mathematics, mathematical logic and mathematical physics, published quarterly online by MDPI. It's now indexed within SCIE (Web of Science), Scopus, dblp, and other databases.

  • mathematical analysis
  • mathematical physics
  • mathematical logic
  • fuzzy logic
  • number theory
  • graph theory
  • differential equation
  • probability theory
  • information theory
  • quantum theory

Axioms is dedicated to the foundations (structure and axiomatic basis, in particular) of mathematical theories, not only from a crisp or strictly classical sense, but also from a fuzzy and generalized sense. This includes the more innovative current scientific trends, devoted to discover and solve new challenging problems. The prime goal of Axioms is to publish first-class, original research articles under an open access policy with minimal fees for the authors. We would be pleased to welcome you as one of our authors.

Subject Areas

  • Axiomatic theories in physics and in mathematics (for example, axiomatic theory of thermodynamics, and also either the axiomatic classical set theory or the axiomatic fuzzy set theory)

  • Axiomatization, axiomatic methods, theorems, mathematical proofs

  • Algebraic structures, field theory, group theory, topology, vector spaces

  • Mathematical analysis

  • Mathematical physics

  • Mathematical logic, and non-classical logics, such as fuzzy logic, modal logic, non-monotonic logic. etc.

  • Classical and fuzzy set theories

  • Number theory

  • Systems theory

  • Classical measures, fuzzy measures, representation theory, and probability theory

  • Graph theory

  • Information theory

  • Entropy

  • Symmetry

  • Differential equations and dynamical systems

  • Relativity and quantum theories

  • Mathematical chemistry

  • Automata theory

  • Mathematical problems of artificial intelligence

  • Complex networks from a mathematical viewpoint

  • Reasoning under uncertainty

  • Interdisciplinary applications of mathematical theory

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