论文信息 - On additive and multiplicative Hilbert cubes

On additive and multiplicative Hilbert cubes

Given subset E of natural numbers FS(E) is defined as the collection of all sums of elements of finite subsets of E and any translation of FS(E) is said to be Hilbert cube. We can define the multiplicative analog of Hilbert cube as well. E.G. Strauss proved that for every @e>0 there exists a sequence with density >1-@e which does not contain an infinite Hilbert cube. On the other hand, Nathanson showed that any set of density 1 contains an infinite Hilbert cube. In the present note we estimate the density of Hilbert cubes which can be found avoiding sufficiently sparse (in particular, zero density) sequences. As a consequence we derive a result in which we ensure a dense additive Hilbert cube which avoids a multiplicative one.

Norbert Hegyvári

[1] Vojtech Rödl,et al. Extremal Problems for Affine Cubes of Integers , 1998, Comb. Probab. Comput..

[2] David S. Gunderson. An alternate proof of Szemer , 1995 .

[3] Neil Hindman,et al. Ultrafilters and combinatorial number theory , 1979 .

[4] N. Hegyvári. On the Dimension of the Hilbert Cubes , 1999 .

[5] Melvyn B. Nathanson,et al. Elementary Methods in Number Theory , 1999 .

[6] E. Szemerédi,et al. Finite and infinite arithmetic progressions in sumsets , 2006 .

[7] N. Hegyvári. IP sets, Hilbert cubes , 2008 .

[8] Melvyn B Nathanson. Sumsets Contained in Infinite Sets of Integers , 1980, J. Comb. Theory, Ser. A.

[9] B. Bollobás,et al. Combinatorics, Probability and Computing , 2006 .