Modular forms provide a powerful mathematical framework for understanding symmetry in two-dimensional quantum field theories. In conformal field theory (CFT), these holomorphic functions obey ...
Quantum modular forms have emerged as a versatile framework that bridges classical analytic number theory with quantum topology and mathematical physics. Initially inspired by the pioneering work on ...
The journal publishes original papers in all areas of pure and applied mathematics. Publisher Information Consists of six departments and provides education in the fields of physics, mathematics, ...
A nonholomorphic modular form is one of the many types of objects in the LMFDB. Disclaimer: AAAS and EurekAlert! are not responsible for the accuracy of news releases posted to EurekAlert! by ...
A type of symmetry so unusual that it was called a “pariah” turns out to have deep connections to number theory. In 1892, the mathematician Otto Hölder posed a question that would occupy the field for ...
In 1994, an earthquake of a proof shook up the mathematical world. The mathematician Andrew Wiles had finally settled Fermat’s Last Theorem, a central problem in number theory that had remained open ...
Enabling new capabilities not previously available in analog, digital, RF, microwave, and lightwave test, 46 new PXI and AXIe products offer advanced measurement software and high-performance hardware ...
As the AI fervor continues to reshape how people see the world, 2025 looms as yet another year in the march toward technological advancement. While some worry about the dominance of technology in ...
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