AbstractLet P be a polynomial. We find a necessary and sufficient condition for some subsequences of (P(n)) to be uniformly distributed modulo one. These subsequences are defined by properties of the q-adic expansion of n
AbstractWe show that the new pseudo-random number function, introduced recently by M. Naor and O. Re...
AbstractLet p be a prime, u be a linear recurring sequence of integers of order d and let S=3d2+9d2+...
The generalisation of questions of the classic arithmetic has long been of interest. One line of que...
AbstractLet P be a polynomial. As in the article [J. Coquet, J. Number Theory 10 (1978), 291–296], w...
AbstractLet P be a polynomial. As in the article [J. Coquet, J. Number Theory 10 (1978), 291–296], w...
AbstractLet P be a polynomial. We find a necessary and sufficient condition for some subsequences of...
AbstractGeneralized polynomials form a natural family of functions which are obtained from polynomia...
AbstractGeneralized polynomials form a natural family of functions which are obtained from polynomia...
AbstractA sequence (aj) of integers is α-good (α real) if the sequence (ajα) of real numbers is unif...
AbstractLet Q={Qj}∞j=0 be a strictly increasing sequence of integers with Q0=1 and such that each Qj...
Suppose (k(n))(n >= 1) is Hartman uniformly distributed and good universal. Also suppose psi is a po...
In this thesis we use modern developments in ergodic theory and uniform distribution theory to inves...
http://www.math.missouri.edu/~bbanks/papers/index.htmlLet P(n) denote the largest prime factor of an...
Let H be a Hardy field (a field consisting of germs of real-valued functions at infinity that is clo...
AbstractIf (xn) is a monotone sequence of reals that is uniformly distributed mod 1, then it is show...
AbstractWe show that the new pseudo-random number function, introduced recently by M. Naor and O. Re...
AbstractLet p be a prime, u be a linear recurring sequence of integers of order d and let S=3d2+9d2+...
The generalisation of questions of the classic arithmetic has long been of interest. One line of que...
AbstractLet P be a polynomial. As in the article [J. Coquet, J. Number Theory 10 (1978), 291–296], w...
AbstractLet P be a polynomial. As in the article [J. Coquet, J. Number Theory 10 (1978), 291–296], w...
AbstractLet P be a polynomial. We find a necessary and sufficient condition for some subsequences of...
AbstractGeneralized polynomials form a natural family of functions which are obtained from polynomia...
AbstractGeneralized polynomials form a natural family of functions which are obtained from polynomia...
AbstractA sequence (aj) of integers is α-good (α real) if the sequence (ajα) of real numbers is unif...
AbstractLet Q={Qj}∞j=0 be a strictly increasing sequence of integers with Q0=1 and such that each Qj...
Suppose (k(n))(n >= 1) is Hartman uniformly distributed and good universal. Also suppose psi is a po...
In this thesis we use modern developments in ergodic theory and uniform distribution theory to inves...
http://www.math.missouri.edu/~bbanks/papers/index.htmlLet P(n) denote the largest prime factor of an...
Let H be a Hardy field (a field consisting of germs of real-valued functions at infinity that is clo...
AbstractIf (xn) is a monotone sequence of reals that is uniformly distributed mod 1, then it is show...
AbstractWe show that the new pseudo-random number function, introduced recently by M. Naor and O. Re...
AbstractLet p be a prime, u be a linear recurring sequence of integers of order d and let S=3d2+9d2+...
The generalisation of questions of the classic arithmetic has long been of interest. One line of que...
DOI
Add to ORKG