Geometric-progression-free sets over quadratic number fields

Abstract: In Ramsey theory one wishes to know how large a collection of objects can be while avoiding a particular substructure. A problem of recent interest has been to study how large subsets of the natural numbers can be while avoiding 3-term geometric progressions. Building on recent progress on this problem, we consider the analogous problem over quadratic number fields.We first construct high-density subsets of the algebraic integers of an imaginary quadratic number field that avoid 3-term geometric progressions. … Show more

“…It seems possible that a similar construction might yield a set with higher asymptotic density in F q [x]. In previous work, [Mc,Section 4], [BHMMPTW,Section 4.2] in different rings, improved upper bounds for the upper density were obtained by considering progressions among the smooth integers. Thus far this technique has not proven to be as useful in this ring, however it may just be that more work and computation are required.…”

Subsets of Fq[x] free of 3-term geometric progressions

“…It seems possible that a similar construction might yield a set with higher asymptotic density in F q [x]. In previous work, [Mc,Section 4], [BHMMPTW,Section 4.2] in different rings, improved upper bounds for the upper density were obtained by considering progressions among the smooth integers. Thus far this technique has not proven to be as useful in this ring, however it may just be that more work and computation are required.…”

Subsets of Fq[x] free of 3-term geometric progressions

Avoiding 3-Term Geometric Progressions in Non-Commutative Settings