Differential Geometry and its Applications - Impact Factor

Differential Geometry and its Applications - Elsevier | 2024 Impact Factor:0.7 | Cite Score:1.3 | Q2

Differential Geometry and its Applications Journal

Impact Factor and Journal Rank of Differential Geometry and its Applications

About: Differential Geometry and its Applications is a premier academic journal dedicated to the publication of high-quality research in the field of differential geometry and its diverse applications. The journal serves as a crucial platform for the dissemination of both theoretical advancements and practical implementations, bridging the gap between abstract mathematical concepts and real-world problems.
Objective
The primary objective of Differential Geometry and its Applications is to promote and facilitate the exchange of knowledge among researchers, educators, and practitioners. The journal aims to advance the understanding of differential geometry and to highlight its importance and utility in various scientific and engineering disciplines.
Interdisciplinary Approach
Recognizing the broad scope and interdisciplinary nature of differential geometry, the journal welcomes contributions from a wide range of fields, including but not limited to:
Mathematics: Advancements in the theory of differential geometry, including studies on curvature, topology, and geometric structures.
Physics: Applications in general relativity, string theory, and quantum field theory.
Engineering: Utilization of differential geometry in robotics, control theory, and material science.
Computer Science: Contributions to computer graphics, computer vision, and machine learning.
Biology: Understanding biological shapes, morphogenesis, and the geometry of biological networks.
By integrating insights from these diverse disciplines, the journal aims to foster a comprehensive understanding of differential geometry and its far-reaching applications.
Impact
Differential Geometry and its Applications seeks to make a substantial impact by:
Publishing innovative research that contributes to both the theoretical and applied aspects of differential geometry.
Encouraging interdisciplinary collaborations that lead to new insights and advancements.
Providing a platform for the dissemination of research findings to a global audience.
Influencing the development of new technologies and methodologies through the application of differential geometry.
Significance
The study of differential geometry is critical to understanding and solving complex problems in various scientific and engineering fields. From the curvature of spacetime in general relativity to the optimization of shapes in computer graphics, differential geometry plays a pivotal role. Differential Geometry and its Applications is committed to advancing this field by providing researchers with the resources and platform needed to share their discoveries and drive innovation.

Journal Home: Journal Homepage

Editor-in-Chief: Jan SlovÃ¡k

Scope: The Differential Geometry and its Applications Journal is a prestigious peer-reviewed scientific journal focused on the field of differential geometry and its various applications. Here is a detailed scope of what this journal typically includes:
Pure Differential Geometry:
Riemannian Geometry: Study of Riemannian manifolds, curvature, geodesics, and related structures.
Symplectic Geometry: Research on symplectic manifolds, Hamiltonian systems, and symplectic topology.
Complex Geometry: Examination of complex manifolds, complex differential forms, and complex algebraic geometry.
Geometric Analysis: Intersection of differential geometry and analysis, including techniques like harmonic maps and minimal surfaces.
Applications in Theoretical Physics:
General Relativity: Applications of differential geometry in understanding spacetime, black holes, and cosmology.
Gauge Theory: Differential geometric methods in the study of gauge fields and connections.
String Theory: Geometric structures arising in string theory and related physical theories.
Applications in Other Sciences:
Mathematical Biology: Use of differential geometry in modeling biological systems, such as protein folding and neural networks.
Robotics and Control Theory: Application of geometric methods in the study of robotic motion and control systems.
Computer Vision and Graphics: Utilization of differential geometry in image processing, shape analysis, and computer graphics.
Geometric Topology:
Manifold Theory: Study of the properties and structures of manifolds, including their classification and invariants.
Topological Groups and Lie Groups: Research on the geometric aspects of topological and Lie groups.
Low-Dimensional Topology: Examination of 3-manifolds, knot theory, and related areas.
Geometric Structures:
Foliations and Laminations: Study of foliations on manifolds and their geometric properties.
Bundle Theory: Research on fiber bundles, vector bundles, and principal bundles.
KÃ¤hler Geometry: Exploration of KÃ¤hler manifolds and their applications in various fields.
Mathematical Methods and Techniques:
Differential Operators: Study of Laplacians, Dirac operators, and other differential operators on manifolds.
Metric Geometry: Research on metric spaces, including Alexandrov spaces and Gromov-Hausdorff distance.
Variational Methods: Application of variational principles in differential geometry.
Types of Contributions
Research Articles: Original research papers presenting significant advances in differential geometry and its applications.
Survey Articles: Comprehensive reviews of current research trends and significant topics in differential geometry.
Short Communications: Brief reports on recent developments, new techniques, or preliminary results.
Special Issues: Collections of articles focused on specific themes or topics within differential geometry.
Audience
Academics and Researchers: Mathematicians and scientists working in differential geometry, geometric analysis, and related fields.
Graduate Students: Students specializing in differential geometry or looking to understand its applications in various scientific domains.
Theoretical Physicists: Researchers interested in the geometric aspects of physical theories.