International Conference on Integral Equations and Operator Analysis (ICIEOA - 26)

This track focuses on the latest developments in the theory and applications of integral equations. Contributions may include novel techniques, solutions, and methodologies for both linear and nonlinear integral equations.

This session will explore the fundamental aspects of operator theory, emphasizing both linear and nonlinear operators. Papers that discuss applications in various fields, including mathematical physics, are particularly encouraged.

This track aims to present contemporary approaches in functional analysis, highlighting new results and techniques. Contributions that bridge functional analysis with other mathematical disciplines are welcome.

This session will delve into the spectral theory associated with linear operators, discussing both theoretical and practical implications. Researchers are invited to present their findings on eigenvalues, eigenvectors, and spectral properties.

This track is dedicated to the study of nonlinear operators, focusing on their theoretical foundations and practical applications. Submissions that address challenges and solutions in this area are highly encouraged.

This session will cover the theory and applications of Fredholm and Volterra equations, including their numerical solutions. Researchers are invited to share innovative methods and case studies that illustrate their significance.

This track will explore recent advancements in the theory of Hilbert and Banach spaces. Contributions that discuss their applications in various mathematical contexts are particularly welcome.

This session focuses on the development and analysis of numerical methods for solving integral equations. Papers that present new algorithms or improvements to existing methods are encouraged.

This track will examine the role of operator analysis in mathematical physics, highlighting its applications in various physical theories. Researchers are invited to present interdisciplinary work that connects these fields.

This session aims to highlight recent trends and emerging topics in mathematical research related to integral equations and operator analysis. Contributions that offer novel insights or methodologies are encouraged.

This track seeks to foster discussions on interdisciplinary approaches that integrate mathematics with other scientific fields. Papers that demonstrate the impact of mathematical techniques on diverse applications are welcome.