Add to ORKGIn one of his papers, Zagier defined a family of functions as sums of powers of quadratic polynomials. He showed that these functions have many surprising properties and are related to modular forms of integral weight and half integral weight, certain values of Dedekind zeta functions, Diophantine approximation, continued fractions, and Dedekind sums. He used the theory of periods of modular forms to explain the behavior of these functions. We study a similar family of functions, defining them using binary Hermitian forms. We show that this family of functions also have similar properties
This dissertation treats various topics in the theory of Siegel modular forms on congruence subgroup...
Higher Green functions are real-valued functions of two variables on the upper half plane which are ...
The study of binary quadratic forms arose as a natural generalization of questions about the integer...
In one of his papers, Zagier defined a family of functions as sums of powers of quadratic polynomial...
In the first part of this thesis, we prove an explicit formula for the average of a Borcherds form o...
For an imaginary quadratic field $K$ of discriminant $-D$, let $\chi = \chi_K$ be the associated qua...
We give an in depth description of indefinite binary quadratic forms with a particular emphasis on Z...
This thesis studies Grothendieck-Witt spectra of quadric hypersurfaces. In particular, we compute Wi...
For a prime p and a positive integer n, the standard zeta function L_F (s) is considered, attachedto...
In the theory of modular forms it is desired to be able to validate the linear independance of modul...
AbstractHecke's correspondence between modular forms and Dirichlet series is put into a quantitative...
For non-negative integers r we examine four families of alternating and non-alternating sign closed...
We investigate the arithmetic properties of coefficients of Maass forms in three contexts. First, we...
AbstractWe associate zeta functions in two variables with the vector space of binary hermitian forms...
AbstractIn this paper we determine the principal part of the adjusted zeta function for the space of...
This dissertation treats various topics in the theory of Siegel modular forms on congruence subgroup...
Higher Green functions are real-valued functions of two variables on the upper half plane which are ...
The study of binary quadratic forms arose as a natural generalization of questions about the integer...
In one of his papers, Zagier defined a family of functions as sums of powers of quadratic polynomial...
In the first part of this thesis, we prove an explicit formula for the average of a Borcherds form o...
For an imaginary quadratic field $K$ of discriminant $-D$, let $\chi = \chi_K$ be the associated qua...
We give an in depth description of indefinite binary quadratic forms with a particular emphasis on Z...
This thesis studies Grothendieck-Witt spectra of quadric hypersurfaces. In particular, we compute Wi...
For a prime p and a positive integer n, the standard zeta function L_F (s) is considered, attachedto...
In the theory of modular forms it is desired to be able to validate the linear independance of modul...
AbstractHecke's correspondence between modular forms and Dirichlet series is put into a quantitative...
For non-negative integers r we examine four families of alternating and non-alternating sign closed...
We investigate the arithmetic properties of coefficients of Maass forms in three contexts. First, we...
AbstractWe associate zeta functions in two variables with the vector space of binary hermitian forms...
AbstractIn this paper we determine the principal part of the adjusted zeta function for the space of...
This dissertation treats various topics in the theory of Siegel modular forms on congruence subgroup...
Higher Green functions are real-valued functions of two variables on the upper half plane which are ...
The study of binary quadratic forms arose as a natural generalization of questions about the integer...