G. Carinci, J. -R. Chazottes, C. Giardina, F. Redig
Published 2011-10-11, updated 2012-05-08Version 3
We study the so-called nonconventional averages in the context of lattice spin systems, or equivalently random colourings of the integers. For i.i.d. colourings, we prove a large deviation principle for the number of monochromatic arithmetic progressions of size two in the box $[1,N]\cap \N$, as $N\to\infty$, with an explicit rate function related to the one-dimensional Ising model. For more general colourings, we prove some bounds for the number of monochromatic arithmetic progressions of arbitrary size, as well as for the maximal progression inside the box $[1,N]\cap \N$. Finally, we relate nonconventional sums along arithmetic progressions of size greater than two to statistical mechanics models in dimension larger than one.
Comments: 18 pages, 3 figures. A new section was added on arithmetic progressions of length larger than 2 and statistical mechanics models on Z^d, d>1. To appear in Indagationes Mathematicae (2012)
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