International Conference on Symplectic Geometry and Topological Methods (ICSGTM - 26)

This track focuses on the fundamental principles and structures of symplectic geometry. It aims to explore the theoretical underpinnings and key results that define this area of mathematics.

This session will investigate the interplay between topology and differential geometry, emphasizing innovative techniques and applications. Participants are encouraged to present novel approaches that bridge these two fields.

This track will delve into the concepts and tools of algebraic topology, highlighting their relevance in various mathematical contexts. Contributions that demonstrate practical applications of algebraic topology in other areas are particularly welcome.

Focusing on complex geometry, this session will explore its relationships with symplectic and differential geometry. Researchers are invited to discuss recent advancements and their implications for geometric structures.

This track will examine Hamiltonian systems from both theoretical and applied perspectives. Topics may include stability, bifurcations, and the role of symplectic structures in dynamical systems.

This session will highlight the role of variational methods in the study of geometric structures. Presentations may cover both classical and modern approaches to variational problems in geometry.

This track will focus on the study of topological invariants and their significance in understanding geometric properties. Contributions that explore new invariants or apply existing ones in innovative ways are encouraged.

This session will investigate various geometric structures and their applications across mathematics and physics. Participants are invited to present research that demonstrates the utility of these structures in solving complex problems.

Focusing on geometric analysis, this track will cover techniques used to study geometric problems through analytical methods. Contributions that highlight the interplay between analysis and geometry are particularly welcome.

This session will explore the emerging field of quantum geometry and its implications for both mathematics and theoretical physics. Researchers are encouraged to present their findings on the geometric aspects of quantum theories.

This track will examine the mathematical foundations of topological dynamics, focusing on its applications in various areas of mathematics. Contributions that explore the connections between dynamics and topology are highly encouraged.