Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Lyall, Neil - Department of Mathematics, University of Georgia
STRONGLY SINGULAR INTEGRALS ALONG CURVES NORBERTO LAGHI NEIL LYALL
STRONGLY SINGULAR INTEGRAL OPERATORS ASSOCIATED TO DIFFERENT QUASI-NORMS ON THE HEISENBERG GROUP
ASYMPTOTIC PROPERTIES OF LAGUERRE FUNCTIONS Recall that Laguerre functions of type , > -1, form an orthonormal basis for L2
THE WEYL INEQUALITY FOR QUADRATIC POLYNOMIALS A Weyl sum is an exponential sums of the form
A CLASS OF STRONGLY SINGULAR RADON TRANSFORMS ON THE HEISENBERG GROUP
POLYNOMIAL DIFFERENCES IN THE PRIMES NEIL LYALL ALEX RICE
BEHREND'S EXAMPLE Behrend's Theorem1
SARKOZY'S THEOREM 1. Introduction
THE HEISENBERG GROUP FOURIER TRANSFORM 1. Fourier transform on Rn 1
AN OPTIMAL VERSION OF SARKOZY'S THEOREM NEIL LYALL AKOS MAGYAR
ARITHMETIC STRUCTURE IN SPARSE DIFFERENCE SETS MARIAH HAMEL NEIL LYALL KATHERINE THOMPSON NATHAN WALTERS
POLYNOMIAL CONFIGURATIONS IN DIFFERENCE SETS (REVISED VERSION)
THE DETERMINANT II -KORANYI NORM Abstract. In this wee note we calculate the determinant of the usual (non-vector field) mixed Hessian of
TWO-WEIGHT ESTIMATES FOR SINGULAR AND STRONGLY SINGULAR INTEGRAL OPERATORS
STRONGLY SINGULAR CONVOLUTION OPERATORS ON THE HEISENBERG GROUP
THE HARDY-LITTLEWOOD METHOD AND SUMS OF SQUARES 1. Introduction
Math 4900 / 6900 Spring 2007 ROTH'S THEOREM
ROTH'S THEOREM THE FOURIER ANALYTIC APPROACH
NOTES ON THE ALMOST EVERYWHERE CONVERGENCE OF BOCHNERRIESZ MEANS IN Rn
THE WEYL INEQUALITY AND SARKOZY'S THEOREM 1. The Weyl Inequality
OPTIMAL POLYNOMIAL RECURRENCE NEIL LYALL AKOS MAGYAR
A SIMPLE PROOF OF SARKOZY'S THEOREM Abstract. It is a striking and elegant fact (proved independently by Furstenberg and Sarkozy) that in any
Math 8440 -Arithmetic Combinatorics -Spring 2011 RAMSEY THEORY
OPTIMAL POLYNOMIAL RECURRENCE NEIL LYALL AKOS MAGYAR
A NEW PROOF OF SARKOZY'S THEOREM Abstract. It is a striking and elegant fact (proved independently by Furstenberg and Sarkozy) that in any
IMPROVED BOUNDS ON SARKOZY'S THEOREM FOR QUADRATIC POLYNOMIALS
IMPROVED BOUNDS ON SARKOZY'S THEOREM FOR QUADRATIC POLYNOMIALS
