Add to ORKGThis thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provides a quantitative description of the fact that two relatively prime polynomials in Z[x] cannot both have very small absolute values (in terms of their degrees and heights) in an interval unless that interval is extremely short. Bernik\u27s result was presented for intervals in R and has the restriction that the polynomials being considered must have small modulus. In this thesis the result is extended to a cuboid in R3 and, in fact, it is clear from the proof that the result holds in Rn. Furthermore the restriction that the polynomials must have small modulus is removed. This is the first extension of Bernik\u27s result to consider polynomials...
In the p-adic integers, congruences are approximations: for a and b in Zp, a ≡ b mod pn is the same ...
In many areas ofmathematics problems of small divisors, or exceptional sets on which certain desired...
AbstractWe investigate rational approximations (r/p,q/p) or (r/p,q/r) to points on the curve (α,ατ) ...
This thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provid...
This thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provid...
This thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provid...
In this paper, we are able to prove that almost all integers n satisfying some necessary congruence ...
This thesis is concerned with the theory of Diophantine approximation from the point of view of mea...
This thesis is concerned with the theory of Diophantine approximation from the point of view of mea...
The theory of metric Diophantine approximation can be studied from many dierent perspectives. The p...
The theory of metric Diophantine approximation can be studied from many dierent perspectives. The p...
In this thesis we consider three different issues of analytic number theory. Firstly, we investigate...
In this thesis we consider three different issues of analytic number theory. Firstly, we investigate...
The theory of metric Diophantine approximation can be studied from many dierent perspectives. The p...
In the p-adic integers, congruences are approximations: for a and b in Zp, a ≡ b mod pn is the same ...
In the p-adic integers, congruences are approximations: for a and b in Zp, a ≡ b mod pn is the same ...
In many areas ofmathematics problems of small divisors, or exceptional sets on which certain desired...
AbstractWe investigate rational approximations (r/p,q/p) or (r/p,q/r) to points on the curve (α,ατ) ...
This thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provid...
This thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provid...
This thesis is concerned with two extensions to a result of V. I Bernik [23] from 1983 which provid...
In this paper, we are able to prove that almost all integers n satisfying some necessary congruence ...
This thesis is concerned with the theory of Diophantine approximation from the point of view of mea...
This thesis is concerned with the theory of Diophantine approximation from the point of view of mea...
The theory of metric Diophantine approximation can be studied from many dierent perspectives. The p...
The theory of metric Diophantine approximation can be studied from many dierent perspectives. The p...
In this thesis we consider three different issues of analytic number theory. Firstly, we investigate...
In this thesis we consider three different issues of analytic number theory. Firstly, we investigate...
The theory of metric Diophantine approximation can be studied from many dierent perspectives. The p...
In the p-adic integers, congruences are approximations: for a and b in Zp, a ≡ b mod pn is the same ...
In the p-adic integers, congruences are approximations: for a and b in Zp, a ≡ b mod pn is the same ...
In many areas ofmathematics problems of small divisors, or exceptional sets on which certain desired...
AbstractWe investigate rational approximations (r/p,q/p) or (r/p,q/r) to points on the curve (α,ατ) ...