Conrey, J. B.
Overview
Works:  10 works in 21 publications in 2 languages and 386 library holdings 

Genres:  Conference papers and proceedings 
Roles:  Editor, Contributor, Author, Thesis advisor 
Publication Timeline
.
Most widely held works by
J. B Conrey
Ranks of elliptic curves and random matrix theory(
Book
)
9 editions published in 2007 in English and Spanish and held by 266 WorldCat member libraries worldwide
9 editions published in 2007 in English and Spanish and held by 266 WorldCat member libraries worldwide
Analytic number theory and diophantine problems : proceedings of a conference at Oklahoma State University, 1984 by
A. C Adolphson(
)
3 editions published in 1987 in English and held by 66 WorldCat member libraries worldwide
A conference on Analytic Number Theory and Diophantine Problems was held from June 24 to July 3, 1984 at the Oklahoma State University in Stillwater. The conference was funded by the National Science Foundation, the College of Arts and Sciences and the Department of Mathematics at Oklahoma State University. The papers in this volume represent only a portion of the many talks given at the conference. The principal speakers were Professors E. Bombieri, P.X. Gallagher, D. Goldfeld, S. Graham, R. Greenberg, H. Halberstam, C. Hooley, H. Iwaniec, D.J. Lewis, D.W. Masser, H.L. Montgomery, A. Selberg, and R.C. Vaughan. Of these, Professors Bombieri, Goldfeld, Masser, and Vaughan gave three lectures each, while Professor Hooley gave two. Special sessions were also held and most participants gave talks of at least twenty minutes each. Prof. P. Sarnak was unable to attend but a paper based on his intended talk is included in this volume. We take this opportunity to thank all participants for their (enthusiastic) support for the conference. Judging from the response, it was deemed a success. As for this volume, I take responsibility for any typographical errors that may occur in the final print. I also apologize for the delay (which was due to the many problems incurred while retyping all the papers). A. special thanks to Dollee Walker for retyping the papers and to Prof. W.H. Jaco for his support, encouragement and hard work in bringing the idea of the conference to fruition
3 editions published in 1987 in English and held by 66 WorldCat member libraries worldwide
A conference on Analytic Number Theory and Diophantine Problems was held from June 24 to July 3, 1984 at the Oklahoma State University in Stillwater. The conference was funded by the National Science Foundation, the College of Arts and Sciences and the Department of Mathematics at Oklahoma State University. The papers in this volume represent only a portion of the many talks given at the conference. The principal speakers were Professors E. Bombieri, P.X. Gallagher, D. Goldfeld, S. Graham, R. Greenberg, H. Halberstam, C. Hooley, H. Iwaniec, D.J. Lewis, D.W. Masser, H.L. Montgomery, A. Selberg, and R.C. Vaughan. Of these, Professors Bombieri, Goldfeld, Masser, and Vaughan gave three lectures each, while Professor Hooley gave two. Special sessions were also held and most participants gave talks of at least twenty minutes each. Prof. P. Sarnak was unable to attend but a paper based on his intended talk is included in this volume. We take this opportunity to thank all participants for their (enthusiastic) support for the conference. Judging from the response, it was deemed a success. As for this volume, I take responsibility for any typographical errors that may occur in the final print. I also apologize for the delay (which was due to the many problems incurred while retyping all the papers). A. special thanks to Dollee Walker for retyping the papers and to Prof. W.H. Jaco for his support, encouragement and hard work in bringing the idea of the conference to fruition
Ranks of Elliptic Curves and Random Matrix Theory(
)
2 editions published in 2007 in English and held by 44 WorldCat member libraries worldwide
This comprehensive volume introduces elliptic curves and the fundamentals of modeling by a family of random matrices
2 editions published in 2007 in English and held by 44 WorldCat member libraries worldwide
This comprehensive volume introduces elliptic curves and the fundamentals of modeling by a family of random matrices
Number theory, analysis, and combinatorics : proceedings of the Paul Tuŕan Memorial Conference held August 2226, 2011 in
Budapest by
Kálmán Györy(
Book
)
1 edition published in 2013 in English and held by 4 WorldCat member libraries worldwide
Main description: Paul Turán, one of the greatest Hungarian mathematicians, was born 100 years ago, on August 18, 1910. To celebrate this occasion the Hungarian Academy of Sciences, the Alfréd Rényi Institute of Mathematics, the János Bolyai Mathematical Society and the Mathematical Institute of Eötvös Loránd University organized an international conference devoted to Paul Turán's main areas of interest: number theory, selected branches of analysis, and selected branches of combinatorics. The conference was held in Budapest, August 2226, 2011. Some of the invited lectures reviewed different aspects of Paul Turán's work and influence. Most of the lectures allowed participants to report about their own work in the above mentioned areas of mathematics
1 edition published in 2013 in English and held by 4 WorldCat member libraries worldwide
Main description: Paul Turán, one of the greatest Hungarian mathematicians, was born 100 years ago, on August 18, 1910. To celebrate this occasion the Hungarian Academy of Sciences, the Alfréd Rényi Institute of Mathematics, the János Bolyai Mathematical Society and the Mathematical Institute of Eötvös Loránd University organized an international conference devoted to Paul Turán's main areas of interest: number theory, selected branches of analysis, and selected branches of combinatorics. The conference was held in Budapest, August 2226, 2011. Some of the invited lectures reviewed different aspects of Paul Turán's work and influence. Most of the lectures allowed participants to report about their own work in the above mentioned areas of mathematics
Zeroes of derivatives of riemann's xi function on the critical line by
JOHN BRIAN CONREY(
)
1 edition published in 1980 in English and held by 1 WorldCat member library worldwide
1 edition published in 1980 in English and held by 1 WorldCat member library worldwide
An extension of Hecke's converse theorem by
J. B Conrey(
Book
)
1 edition published in 1995 in English and held by 1 WorldCat member library worldwide
1 edition published in 1995 in English and held by 1 WorldCat member library worldwide
On the frequency of vanishing of quadratic twists of modular Lfunctions by
J. B Conrey(
Book
)
1 edition published in 2000 in English and held by 1 WorldCat member library worldwide
1 edition published in 2000 in English and held by 1 WorldCat member library worldwide
Remarks on the generalized Lindelöf Hypothesis by
J. Brian Conrey(
)
1 edition published in 2006 in English and held by 1 WorldCat member library worldwide
1 edition published in 2006 in English and held by 1 WorldCat member library worldwide
Moments of automorphic Lfunctions and related problems by Ian Petrow(
)
1 edition published in 2013 in English and held by 1 WorldCat member library worldwide
We present in this dissertation several theorems on the subject of moments of automorphic Lfunctions. In chapter 1 we give an overview of this area of research and summarize our results. In chapter 2 we give asymptotic main term estimates for several different moments of central values of Lfunctions of a fixed GL_2 holomorphic cusp form f twisted by quadratic characters. When the sign of the functional equation of the twist L(s, f \otimes \chi_d) is 1, the central value vanishes and one instead studies the derivative L'(1/2, f \otimes \chi_d). We prove two theorems in the root number 1 case which are completely out of reach when the root number is +1. In chapter 3 we turn to an average of GL_2 objects. We study the family of cusp forms of level q^2 which are given by f \otimes \chi, where f is a modular form of prime level q and \chi is the quadratic character modulo q. We prove a precise asymptotic estimate uniform in shifts for the second moment with the purpose of understanding the offdiagonal main terms which arise in this family. In chapter 4 we prove an precise asymptotic estimate for averages of shifted convolution sums of Fourier coefficients of fulllevel GL_2 cusp forms over shifts. We find that there is a transition region which occurs when the square of the average over shifts is proportional to the length of the shifted sum. The asymptotic in this range depends very delicately on the constant of proportionality: its second derivative seems to be a continuous but nowhere differentiable function. We relate this phenomenon to periods of automorphic forms, multiple Dirichlet series, automorphic distributions, and moments of RankinSelberg Lfunctions
1 edition published in 2013 in English and held by 1 WorldCat member library worldwide
We present in this dissertation several theorems on the subject of moments of automorphic Lfunctions. In chapter 1 we give an overview of this area of research and summarize our results. In chapter 2 we give asymptotic main term estimates for several different moments of central values of Lfunctions of a fixed GL_2 holomorphic cusp form f twisted by quadratic characters. When the sign of the functional equation of the twist L(s, f \otimes \chi_d) is 1, the central value vanishes and one instead studies the derivative L'(1/2, f \otimes \chi_d). We prove two theorems in the root number 1 case which are completely out of reach when the root number is +1. In chapter 3 we turn to an average of GL_2 objects. We study the family of cusp forms of level q^2 which are given by f \otimes \chi, where f is a modular form of prime level q and \chi is the quadratic character modulo q. We prove a precise asymptotic estimate uniform in shifts for the second moment with the purpose of understanding the offdiagonal main terms which arise in this family. In chapter 4 we prove an precise asymptotic estimate for averages of shifted convolution sums of Fourier coefficients of fulllevel GL_2 cusp forms over shifts. We find that there is a transition region which occurs when the square of the average over shifts is proportional to the length of the shifted sum. The asymptotic in this range depends very delicately on the constant of proportionality: its second derivative seems to be a continuous but nowhere differentiable function. We relate this phenomenon to periods of automorphic forms, multiple Dirichlet series, automorphic distributions, and moments of RankinSelberg Lfunctions
An extension of Hecke's converse theorem by
Calif.) Mathematical Sciences Research Institute (Berkeley(
Book
)
1 edition published in 1995 in English and held by 1 WorldCat member library worldwide
1 edition published in 1995 in English and held by 1 WorldCat member library worldwide
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Related Identities
 Clay Mathematics Institute
 Isaac Newton Institute for Mathematical Sciences
 Ghosh, A. Editor
 Adolphson, A. C. Author
 Yager, R. I. Editor
 Farmer, D. W.
 Snaith, N. C. Editor
 Mezzadri, F. Editor
 Montgomery, Hugh L. Contributor
 Friedlander, John Contributor
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Alternative Names
Brian Conrey Amerikaans wiskundige
Brian Conrey amerikansk matematikar
Brian Conrey amerikansk matematiker
Brian Conrey matemàtic estatunidenc
Brian Conrey matemático estadounidense
Brian Conrey mathématicien américain
Conrey, Brian
Conrey, J. B.
Conrey, John Brian
J. Brian Conrey USamerikanischer Mathematiker
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