International Conference on Algebraic Structures and Their Applications (ICASTA - 26)

This track focuses on recent developments in abstract algebra, including new theories and applications. Participants are encouraged to present their findings on structures such as groups, rings, and fields.

This session will explore the latest research in group theory and its diverse applications across various fields. Contributions may include theoretical advancements as well as practical implementations of group-theoretic concepts.

This track invites discussions on novel approaches and findings in ring theory, emphasizing both commutative and noncommutative rings. Researchers are encouraged to share insights into the implications of ring structures in mathematical contexts.

Focusing on module theory, this session aims to highlight recent advancements and their implications in algebra. Presentations may cover both theoretical frameworks and practical applications of modules in various mathematical settings.

This track will delve into the intricacies of field theory, examining both classical and contemporary topics. Participants are invited to discuss the role of fields in algebraic structures and their applications in other mathematical disciplines.

This session will focus on the techniques and applications of homological algebra, exploring its relevance in various mathematical theories. Researchers are encouraged to present their work on derived categories, spectral sequences, and related concepts.

This track will investigate recent developments in lattice theory and its connections to other areas of mathematics. Contributions may include theoretical advancements as well as applications in computer science and logic.

Focusing on the concept of symmetry within algebraic structures, this session will explore both theoretical and applied aspects. Researchers are invited to present their findings on symmetry groups and their implications in various mathematical contexts.

This track will examine current trends and breakthroughs in representation theory, with a focus on its applications in algebra and beyond. Participants are encouraged to share their research on representations of groups and algebras.

This session aims to bridge the gap between algebra and geometry through the lens of algebraic geometry. Researchers are invited to discuss new findings and methodologies that connect these two fundamental areas of mathematics.

This track will focus on the advancements in noncommutative algebra, exploring its theoretical foundations and applications. Contributions may include studies on noncommutative rings, algebras, and their relevance in various mathematical frameworks.