International Conference on Number Theory and Its Modern Applications (ICNTMA - 26)

This track focuses on recent breakthroughs in the understanding of prime numbers, including distribution, density, and the implications of prime gaps. Researchers are invited to present novel results and methodologies that enhance our comprehension of prime-related phenomena.

This session explores the rich interplay between modular forms and various areas of mathematics, including number theory and algebraic geometry. Contributions that highlight new applications or theoretical advancements in modular forms are particularly welcome.

This track delves into the techniques of arithmetic geometry and their applications in solving Diophantine equations. Participants are encouraged to share innovative approaches and results that bridge algebraic geometry with number theory.

This session invites discussions on recent developments in the theory of Diophantine equations, including both classical and modern techniques. Papers that present new solutions or theoretical frameworks are highly encouraged.

This track examines the foundational role of number theory in modern cryptographic systems. Researchers are invited to present work that explores new cryptographic protocols, security analyses, and the underlying mathematical principles.

This session focuses on the theory of elliptic curves and their applications in number theory and cryptography. Contributions that discuss new results, computational techniques, or applications in related fields are welcome.

This track highlights recent advancements in algebraic number theory, including class field theory and the study of algebraic integers. Participants are encouraged to share their findings and methodologies that contribute to this evolving field.

This session explores the techniques of analytic number theory, including sieve methods and the distribution of primes. Researchers are invited to present new results that advance the understanding of classical and modern problems.

This track focuses on the challenges and breakthroughs in transcendental number theory, including the study of transcendental numbers and their properties. Contributions that propose new methods or results in this area are particularly encouraged.

This session examines advancements in primality testing algorithms and their implications for computational number theory. Researchers are invited to present novel algorithms, complexity analyses, and practical applications in this field.

This track explores the intersection of mathematical modeling and number theory, focusing on applications that utilize number-theoretic concepts in real-world scenarios. Contributions that demonstrate innovative modeling techniques or applications are highly encouraged.