About Geometry

Aims

Geometry (ISSN 3042-402X) is an international, peer-reviewed, open access journal on geometry. It publishes reviews, research papers, and short communications in all areas of geometry theory and applications. The journal may be of special interest in Euclidean geometry, differential geometry, algebraic geometry, complex geometry, discrete geometry, computational geometry, geometric group theory, and convex geometry.

Our aim is to encourage scientists to publish their experimental and theoretical results in as much detail as possible. There is no restriction on the maximum length of the papers. A full account of the research must be provided so that the results can be reproduced. Electronic files or software which provide the full details of the calculations, proof, and experimental procedures can be uploaded as supplementary material (if unable to be published in a normal way).

Scope

The main topics include, but are not limited to, the following:

  • Absolute geometry;
  • Affine geometry;
  • Algebraic geometry;
  • Analytic geometry;
  • Birational geometry;
  • Complex geometry;
  • Combinatorial geometry;
  • Computational geometry;
  • Conformal geometry;
  • Constructive solid geometry;
  • Contact geometry;
  • Convex geometry;
  • Curves and surfaces;
  • Descriptive geometry;
  • Differential geometry;
  • Digital geometry;
  • Discrete geometry;
  • Distance geometry;
  • Elliptic geometry;
  • Enumerative geometry;
  • Epipolar geometry;
  • Euclidean geometry;
  • Finite geometry;
  • Fractal geometry;
  • Geometric algorithms;
  • Geometry and physics;
  • Geometry of numbers;
  • Geometric measure theory;
  • Hyperbolic geometry;
  • Incidence geometry;
  • Information geometry;
  • Integral geometry;
  • Inversive geometry;
  • Inversive ring geometry;
  • Klein geometry;
  • Lie sphere geometry;
  • Manifolds;
  • Non-Euclidean geometry;
  • Noncommutative algebraic geometry;
  • Noncommutative geometry;
  • Numerical geometry;
  • Ordered geometry;
  • Parabolic geometry;
  • Plane geometry;
  • Projective geometry;
  • Quantum geometry;
  • Riemannian geometry;
  • Ruppeiner geometry;
  • Spherical geometry;
  • Symplectic geometry;
  • Synthetic geometry;
  • Systolic geometry;
  • Taxicab geometry;
  • Topological geometry;
  • Toric geometry;
  • Transformation geometry;
  • Tropical geometry.

MDPI Publication Ethics Statement

MDPI is a member of the Committee on Publication Ethics (COPE). MDPI takes the responsibility to enforce a rigorous peer-review together with strict ethical policies and standards to ensure to add high quality scientific works to the field of scholarly publication. Unfortunately, cases of plagiarism, data falsification, inappropriate authorship credit, and the like, do arise. MDPI takes such publishing ethics issues very seriously and our editors are trained to proceed in such cases with a zero tolerance policy. To verify the originality of content submitted to our journals, we use iThenticate to check submissions against previous publications.

Book Reviews

Authors and publishers are encouraged to send review copies of their recent related books to the following address. Received books will be listed as Books Received within the journal's News & Announcements section.

MDPI
Grosspeteranlage 5
CH-4052 Basel
Switzerland

Copyright / Open Access

Articles published in Geometry will be Open-Access articles distributed under the terms and conditions of the Creative Commons Attribution License (CC BY). The copyright is retained by the author(s). MDPI will insert the following note at the end of the published text:

© 2024 by the authors. Licensee MDPI, Basel, Switzerland. This article is an open access article distributed under the terms and conditions of the Creative Commons Attribution (CC BY) license (https://creativecommons.org/licenses/by/4.0/).

Reprints

Reprints may be ordered. Please contact for more information on how to order reprints.

Announcement and Advertisement

Announcements regarding academic activities such as conferences are published for free in the News & Announcements section of the journal. Advertisement can be either published or placed on the pertinent website. Contact e-mail address is .

Editorial Office

Contact us

For further MDPI contacts, see here.

Back to TopTop