DOIAbstract
AbstractWe determine the asymptotic average sizes of the class numbers of indefinite binary quadratic forms when ordered by the sizes of their corresponding fundamental units. The proofs make use of the Selberg trace formula
AbstractWe determine the asymptotic average sizes of the class numbers of indefinite binary quadratic forms when ordered by the sizes of their corresponding fundamental units. The proofs make use of the Selberg trace formula
Improving a result of Montgomery and Weinberger, we establish the existence of infinitely many real ...
AbstractLet H(t) be the number of conjugacy classes of elements in SL(2, L) with trace t, and let h(...
The aim of this work is to study the number of variables of universal quadratic forms in number fiel...
AbstractWe determine the asymptotic average sizes of the class numbers of indefinite binary quadrati...
Much is known about the statistical distribution of class numbers of binary quadratic forms and quad...
[1], 92-197 p., 1 L. 26 cm."Reprinted from Dickson's History of the theory of numbers, vol. III, ch...
Abstract. We use geometric algebra and the theory of automorphic forms to realize the theta series a...
AbstractAn estimate for the class number of certain quadratic orders from below is given. The method...
AbstractIn [P. Sarnak, Class numbers of indefinite binary quadratic forms, J. Number Theory 15 (1982...
AbstractThe study of the minima of indefinite binary quadratic forms has a long history and the clas...
In the present paper we give explicit upper bounds for the number of equivalence classes of binary f...
In a little-known paper Hurwitz gave an infinite series representation of the class number for posit...
It is well known how to find the formulae for the number of representations of positive integers by ...
Class numbers of algebraic number fields are central invariants. Once the underlying field has an in...
The book highlights the connection between Gauss�s theory of binary forms and the arithmetic of quad...
Improving a result of Montgomery and Weinberger, we establish the existence of infinitely many real ...
AbstractLet H(t) be the number of conjugacy classes of elements in SL(2, L) with trace t, and let h(...
The aim of this work is to study the number of variables of universal quadratic forms in number fiel...
AbstractWe determine the asymptotic average sizes of the class numbers of indefinite binary quadrati...
Much is known about the statistical distribution of class numbers of binary quadratic forms and quad...
[1], 92-197 p., 1 L. 26 cm."Reprinted from Dickson's History of the theory of numbers, vol. III, ch...
Abstract. We use geometric algebra and the theory of automorphic forms to realize the theta series a...
AbstractAn estimate for the class number of certain quadratic orders from below is given. The method...
AbstractIn [P. Sarnak, Class numbers of indefinite binary quadratic forms, J. Number Theory 15 (1982...
AbstractThe study of the minima of indefinite binary quadratic forms has a long history and the clas...
In the present paper we give explicit upper bounds for the number of equivalence classes of binary f...
In a little-known paper Hurwitz gave an infinite series representation of the class number for posit...
It is well known how to find the formulae for the number of representations of positive integers by ...
Class numbers of algebraic number fields are central invariants. Once the underlying field has an in...
The book highlights the connection between Gauss�s theory of binary forms and the arithmetic of quad...
Improving a result of Montgomery and Weinberger, we establish the existence of infinitely many real ...
AbstractLet H(t) be the number of conjugacy classes of elements in SL(2, L) with trace t, and let h(...
The aim of this work is to study the number of variables of universal quadratic forms in number fiel...
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