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 ...

Prof. Dr. Wendland is well known for her work on the relations between geometry and quantum field theory, in particular singularity theory and conformal field theory. In recent work she has ...

Recently, Bruinier, Kohnen and Ono obtained an explicit description of the action of the theta-operator on meromorphic modular forms f on SL₂(Z) in terms of the values of modular functions at points ...

In this paper, we prove that if the Fourier coefficients of a vector-valued modular form satisfy the Hecke bound, then it is cuspidal. Furthermore, we obtain an analogous result with regard to Jacobi ...

In his proof of Fermat’s Last Theorem, Wiles pioneered a method for relating two disparate collections of objects, namely Galois representations and modular forms. He parameterizes each collection by ...

When I search for newform spaces by entering the data on http://www.lmfdb.org/ModularForm/GL2/Q/holomorphic/ and clicking on "List of forms", I get what I expect ...