International Conference on Topological Groups and Manifolds (ICTGM - 26)

This track focuses on the fundamental properties and structures of topological groups, exploring their algebraic and topological aspects. Contributions may include new results, applications, and connections to other areas of mathematics.

This session will delve into the study of manifolds, emphasizing their geometric and topological properties. Papers may address both theoretical developments and practical applications in various fields.

This track is dedicated to the exploration of Lie groups, their algebraic structures, and representation theory. Submissions may include innovative approaches to understanding symmetries and transformations.

Focusing on the tools and methods of algebraic topology, this session invites contributions that highlight both classical and contemporary techniques. Applications to other mathematical disciplines are particularly encouraged.

This track will examine the interplay between differential topology and differential geometry, emphasizing their foundational principles and applications. Researchers are invited to present new findings or theoretical advancements.

This session aims to present recent advancements in homotopy theory, including new techniques and applications. Papers may explore both foundational aspects and innovative applications in related fields.

This track will investigate the role of symmetry in various mathematical contexts, including group actions and geometric structures. Contributions may include theoretical explorations and practical implications.

Focusing on the connections between algebraic geometry and topology, this session invites papers that explore their interactions and mutual influences. Topics may include schemes, varieties, and topological invariants.

This track will explore the dynamics of topological groups and their actions on various spaces. Submissions may include theoretical developments and applications to dynamical systems.

This session will focus on the study of metric spaces, examining their topological properties and implications in pure mathematics. Contributions may include both foundational research and novel applications.

This track is dedicated to the exploration of operator algebras and their connections to abstract algebraic structures. Papers may address theoretical advancements and their implications in other mathematical domains.