Your search keyword '"Choi, Dohoon"' showing total 2 results

1. Limits of traces of singular moduli.

Author

Choi, Dohoon and Lim, Subong

Subjects

*RATIONAL numbers, *MODULAR functions, *FUNCTIONAL equations, *L-functions, *COHOMOLOGY theory

Abstract

Let ƒ and g be weakly holomorphic modular functions on Γ0(N) with the trivial character. For an integer d, let Trd(ƒ) denote the modular trace of ƒ of index d. Let r be a rational number equivalent to i ∞ under the action of Γ0(4N). In this paper, we prove that when z goes radially to r, the limit QH(ƒ)(r) of the sum H(ƒ)(z) = ∑d>0 Trd(ƒ)e2πidz is a special value of a regularized twisted L-function defined by Trd(ƒ) for d ≤ 0. It is proved that the regularized L-function is meromorphic on C and satisfies a certain functional equation. Finally, under the assumption that N is square free, we prove that if QH(ƒ)(r) = QH(g)(r) for all r equivalent to i ∞ under the action of Γ0(4N), then Trd(ƒ) = Trd(g) for all integers d. [ABSTRACT FROM AUTHOR]

Published

2020

2. MOCK MODULAR FORMS AND QUANTUM MODULAR FORMS.

Author

CHOI, DOHOON, LIM, SUBONG, and RHOADES, ROBERT C.

Subjects

*MODULAR forms, *THETA functions, *MODULAR groups, *HOLOMORPHIC functions, *CUSP forms (Mathematics)

Abstract

In his last letter to Hardy, Ramanujan introduced mock theta functions. For each of his examples f(q), Ramanujan claimed that there is a collection {Gj} of modular forms such that for each root of unity ζ, there is a j such that.....Moreover, Ramanujan claimed that this collection must have size larger than 1. In his 2001 PhD thesis, Zwegers showed that the mock theta functions are the holomorphic parts of harmonic weak Maass forms. In this paper, we prove that there must exist such a collection by establishing a more general result for all holomorphic parts of harmonic Maass forms. This complements the result of Griffin, Ono and Rolen that shows such a collection cannot have size 1. These results arise within the context of Zagier's theory of quantum modular forms. A linear injective map is given from the space of mock modular forms to quantum modular forms. Additionally, we provide expressions for "Ramanujan's radial limits" as L-values. [ABSTRACT FROM AUTHOR]

Published

2016