On the asymptotic minimum number of monochromatic 3-term arithmetic progressions
arXiv:math/0609532 · doi:10.1016/j.jcta.2007.03.006
Abstract
Let V(n) be the minimum number of monochromatic 3-term arithmetic progressions in any 2-coloring of {1,2,...,n}. We show that (1675/32768) n^2 (1+o(1)) <= V(n) <= (117/2192) n^2(1+o(1)). As a consequence, we find that V(n) is strictly greater than the corresponding number for Schur triples (which is (1/22) n^2 (1+o(1)). Additionally, we disprove the conjecture that V(n) = (1/16) n^2(1+o(1)), as well as a more general conjecture.
9 pages. Revised version fixes formatting errors (same text)