International Conference on Complex Analysis and Potential Theory (ICCAPTY - 26)

This track focuses on recent developments in complex analysis, emphasizing new techniques and results in the study of analytic functions. Contributions may include theoretical advancements and applications across various fields of mathematics.

This session will explore the fundamental principles of potential theory and its applications in various mathematical contexts. Topics may include the study of harmonic functions and their role in solving boundary value problems.

This track will delve into the theory and applications of conformal mappings, highlighting their significance in complex analysis and geometric function theory. Participants are encouraged to present innovative applications in both pure and applied mathematics.

This session will address the study of Riemann surfaces, focusing on their complex structures and topological properties. Contributions may include both theoretical insights and applications in algebraic geometry and mathematical physics.

This track will investigate the properties and applications of meromorphic functions within complex analysis. Topics may include their role in complex dynamics and analytic number theory.

This session will explore the field of complex dynamics, focusing on the behavior of iterated functions in the complex plane. Participants are invited to discuss recent findings and their implications for both theory and applications.

This track will highlight recent advancements in analytic number theory, particularly in relation to complex analysis. Contributions may include novel approaches to classical problems and the exploration of new conjectures.

This session will focus on the theory of functions in several complex variables, examining both classical results and contemporary developments. Participants are encouraged to present research that bridges theory with practical applications.

This track will explore recent trends in geometric function theory, emphasizing the interplay between geometric properties and analytic functions. Contributions may include new results on distortion theorems and univalent functions.

This session will investigate the application of potential methods in various areas of mathematical physics. Topics may include the use of harmonic functions and potential theory in solving physical problems.

This track will focus on boundary value problems related to complex analysis, exploring both classical and modern approaches. Participants are invited to discuss methods for solving these problems and their implications in various mathematical contexts.