Add to ORKGIn this article I will survey some relatively recent joint work with S.Rallis, in which we extend the classical formula of Siegel and Weil. In the classical case, this formula identifies a special value of a certain Eisenstein series as an integral of a theta function. Our extension identifies the residues of the (normalized) Eisenstei
An explicit formula for the Fourier coefficients of Siegel-Eisenstein series(Researches on automorph...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
Kazhdan and Patterson constructed generalized theta functions on covers of general linear groups as ...
In this article I will survey some relatively recent joint work with S.Rallis, in which we extend th...
Introduction. In this article I will survey some relatively recent joint work with S.Rallis, in whic...
The Weil-Siegel formula, in the form developed by Weil, asserts the equality of a special value of a...
AbstractIn this paper we prove a theta function identity of degree eight using the theory of ellipti...
Abstract. Combining induction formulas for local densities with a functional equation for the Siegel...
AbstractWe introduce a formula for the p-adic Siegel–Eisenstein series which demonstrates a connecti...
AbstractIn this paper, we discuss the generalization of the Hecke's integration formula for the Epst...
A further simplification of the form of the extended Riemann Siegel Theta function<br
In this paper we will use one well-known modular equation of seventh order, one theta function ident...
In this paper we will use one well-known modular equation of seventh order, one theta function ident...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
The aim of this article is to prove the Siegel-Weil formula over function fields for the dual reduct...
An explicit formula for the Fourier coefficients of Siegel-Eisenstein series(Researches on automorph...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
Kazhdan and Patterson constructed generalized theta functions on covers of general linear groups as ...
In this article I will survey some relatively recent joint work with S.Rallis, in which we extend th...
Introduction. In this article I will survey some relatively recent joint work with S.Rallis, in whic...
The Weil-Siegel formula, in the form developed by Weil, asserts the equality of a special value of a...
AbstractIn this paper we prove a theta function identity of degree eight using the theory of ellipti...
Abstract. Combining induction formulas for local densities with a functional equation for the Siegel...
AbstractWe introduce a formula for the p-adic Siegel–Eisenstein series which demonstrates a connecti...
AbstractIn this paper, we discuss the generalization of the Hecke's integration formula for the Epst...
A further simplification of the form of the extended Riemann Siegel Theta function<br
In this paper we will use one well-known modular equation of seventh order, one theta function ident...
In this paper we will use one well-known modular equation of seventh order, one theta function ident...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
The aim of this article is to prove the Siegel-Weil formula over function fields for the dual reduct...
An explicit formula for the Fourier coefficients of Siegel-Eisenstein series(Researches on automorph...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
Kazhdan and Patterson constructed generalized theta functions on covers of general linear groups as ...