- ON COMMON VALUES OF (n) AND (m), II KEVIN FORD AND PAUL POLLACK
- arXiv:math/0610450v4[math.PR]12Jul2008 SHARP PROBABILITY ESTIMATES FOR RANDOM WALKS WITH BARRIERS
- THE DISTRIBUTION OF INTEGERS WITH AT LEAST TWO DIVISORS IN A SHORT INTERVAL
- THE BRUN-HOOLEY SIEVE K. Ford and H. Halberstam
- On Curves over Finite Fields with Jacobians of Small Exponent
- CHEBYSHEV'S BIAS FOR PRODUCTS OF TWO PRIMES KEVIN FORD AND JASON SNEED
- On two conjectures of Sierpi'nski concerning the
- THE REPRESENTATION OF NUMBERS AS SUMS OF UNLIKE POWERS, II
- Annals of Mathematics, 150 (1999), 129 The number of solutions of (x) = m
- EXPLICIT CONSTRUCTIONS OF RIP MATRICES AND RELATED JEAN BOURGAIN, S. J. DILWORTH, KEVIN FORD, SERGEI KONYAGIN,
- ADDENDUM AND CORRIGENDUM TO "THE REPRESENTATION OF NUMBERS
- On two conjectures of Sierpinski concerning the
- Localized large sums of random variables Kevin Ford 1,
- SHARP PROBABILITY ESTIMATES FOR GENERALIZED SMIRNOV Dedicated to the memory of Walter Philipp
- Annals of Mathematics, 168 (2008), 367433 The distribution of integers with a divisor
- INTEGERS WITH A DIVISOR IN (y, 2y] Abstract. We determine, up to multiplicative constants, how many integers n x have
- Math. Proc. Camb. Phil. Soc. (2008), 145, 1 Printed in the United Kingdom c 2008 Cambridge Philosophical Society
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- On the largest prime factor of the Mersenne Department of Mathematics
- DIOPHANTINE APPROXIMATION WITH ARITHMETIC FUNCTIONS, II
- GEOMETRIC PROPERTIES OF POINTS ON MODULAR KEVIN FORD, MIZAN R. KHAN, AND IGOR E. SHPARLINSKI
- ON COMMON VALUES OF (n) AND (m), I KEVIN FORD AND PAUL POLLACK
- POISSON-DIRICHLET BRANCHING RANDOM WALKS LOUIGI ADDARIO-BERRY, KEVIN FORD
- NEW ESTIMATES FOR MEAN VALUES OF WEYL SUMS Kevin B. Ford
- PRIME CHAINS AND PRATT TREES KEVIN FORD, SERGEI V. KONYAGIN AND FLORIAN LUCA
- SUMS AND PRODUCTS FROM A FINITE SET OF REAL NUMBERS
- Residue classes free of values of Euler's function
- THE DISTRIBUTION OF TOTIENTS Dedicated to the memory of Paul Erdos
- AN EXPLICIT SIEVE BOUND AND SMALL VALUES OF ((m)) Abstract. We prove an explicit sieve upper bound based on the large sieve of
- THE NUMBER OF SOLUTIONS OF (x) = n KEVIN FORD AND FLORIAN LUCA
- THE REPRESENTATION OF NUMBERS AS SUMS OF UNLIKE POWERS
- SIEVING BY LARGE INTEGERS AND COVERING SYSTEMS OF CONGRUENCES
- Divisors of the Euler and Carmichael functions Kevin Ford and Yong Hu
- On the Divisibility of Fermat Quotients Jean Bourgain
- GENERALIZED SMIRNOV STATISTICS AND THE DISTRIBUTION OF PRIME FACTORS
- THE DISTRIBUTION OF TOTIENTS Kevin Ford
- arXiv:0805.2745v3[math.NT]10Jan2009 Mathematische Annalen manuscript No.
- RESIDUE CLASSES FREE OF VALUES OF EULER'S FUNCTION Kevin Ford, Sergei Konyagin and Carl Pomerance
- Annals of Mathematics, 150 (1999), 1-29 The number of solutions of OE(x) = m
- THE PRIME NUMBER RACE AND ZEROS OF L-FUNCTIONS OFF THE CRITICAL LINE
- SOME INFINITE SERIES IDENTITIES Kevin B. Ford
- THE NORMAL BEHAVIOR OF THE SMARANDACHE FUNCTION
- THE REPRESENTATION OF NUMBERS AS SUMS OF UNLIKE POWERS, II
- THE REPRESENTATION OF NUMBERS AS SUMS OF UNLIKE POWERS
- THE NORMAL BEHAVIOR OF THE SMARANDACHE FUNCTION
- WARING'S PROBLEM WITH POLYNOMIAL SUMMANDS Kevin Ford
- [Page * On two conjectures of
- 1 Kolmogorov and number theory 3 1.1 Introduction . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 3
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