AbstractA classic theorem of van der Waerden asserts that for any positive integer k, there is an integer W(k) with the property that if W⩾W(k) and the set {1, 2,…, W} is partitioned into r classes C1, C2,…, Cr, then some Ci will always contain a k-term arithmetic progression. Let us abbreviate this assertion by saying that {1, 2,…, W}arrows AP(k) (written {1, 2,…, W} → AP(k)). Further, we say that a set Xcritically arrows AP(k) if:(i) X arrows AP(k); (ii) for any proper subset X′ ⊂ X, X′ does not arrow AP(k). The main result of this note shows that for any given k there exist arbitrarily large sets X which critically arrow AP(k)
Abstract. This is a short exposition of the dynamical approach to the proof of van der Waerden’s the...
In 1936, Erdős–Turán conjectured that any set of integers with positive upper density contains arbit...
AbstractDesignate by W(k; t0, t1,…, tk−1) the smallest number m, such that if all the integers in th...
AbstractA classic theorem of van der Waerden asserts that for any positive integer k, there is an in...
A classic theorem of van der Waerden asserts that for any positive integer k, there is an integer W(...
AbstractA particularly well suited induction hypothesis is employed to give a short and relatively d...
integers is arbitrarily partitioned into two classes then at least one class contains arbitrarily lo...
AbstractF. Cohen raised the following question: Determine or estimate a function F(d) so that if we ...
AbstractDenote by B(k, l) the least integer such that, if the numbers 1, 2, 3,…, B(k, l) + 1 are par...
Analogues of van der Waerden’s theorem on arithmetic progressions are considered where the family of...
AbstractGiven a density 0<σ⩽1, we show for all sufficiently large primes p that if S⊆Z/pZ has the le...
Followed two different proofs of van der Waerden\u27s theorem. Found that the two proofs yield impo...
Let f_(s, k)(n) be the maximum possible number of s‐term arithmetic progressions in a set of n integ...
We construct for every integer $k\geq 3$ and every real $\mu\in(0, \frac{k-1}{k})$ a set of integers...
H.Furstenberg and E.Glasner proved that for an arbitrary $k\in\mathbb{N}$, any piecewise syndetic se...
Abstract. This is a short exposition of the dynamical approach to the proof of van der Waerden’s the...
In 1936, Erdős–Turán conjectured that any set of integers with positive upper density contains arbit...
AbstractDesignate by W(k; t0, t1,…, tk−1) the smallest number m, such that if all the integers in th...
AbstractA classic theorem of van der Waerden asserts that for any positive integer k, there is an in...
A classic theorem of van der Waerden asserts that for any positive integer k, there is an integer W(...
AbstractA particularly well suited induction hypothesis is employed to give a short and relatively d...
integers is arbitrarily partitioned into two classes then at least one class contains arbitrarily lo...
AbstractF. Cohen raised the following question: Determine or estimate a function F(d) so that if we ...
AbstractDenote by B(k, l) the least integer such that, if the numbers 1, 2, 3,…, B(k, l) + 1 are par...
Analogues of van der Waerden’s theorem on arithmetic progressions are considered where the family of...
AbstractGiven a density 0<σ⩽1, we show for all sufficiently large primes p that if S⊆Z/pZ has the le...
Followed two different proofs of van der Waerden\u27s theorem. Found that the two proofs yield impo...
Let f_(s, k)(n) be the maximum possible number of s‐term arithmetic progressions in a set of n integ...
We construct for every integer $k\geq 3$ and every real $\mu\in(0, \frac{k-1}{k})$ a set of integers...
H.Furstenberg and E.Glasner proved that for an arbitrary $k\in\mathbb{N}$, any piecewise syndetic se...
Abstract. This is a short exposition of the dynamical approach to the proof of van der Waerden’s the...
In 1936, Erdős–Turán conjectured that any set of integers with positive upper density contains arbit...
AbstractDesignate by W(k; t0, t1,…, tk−1) the smallest number m, such that if all the integers in th...