# Longest constrained sequences

From Polymath Wiki

The numbers in square brackets show (what we know of) the length of the longest sequence of discrepancy 2 satisfying the given constraints exactly. The notation [math]a=b[/math] is shorthand for [math]T_a(x) = T_b(x)[/math], and [math]a=-b[/math] for [math]T_a(x) = -T_b(x)[/math].

1 = +2 : [170] 1 = -2 : [>=974] 1 = -2, 1 = +3 : [188] 1 = -2, 1 = -3 : [470] 1 = -2, 1 = +5 : [356] 1 = -2, 1 = -5 : [>=974] 1 = -2, 1 = -5, 1 = +7 : [>=566] 1 = -2, 1 = -5, 1 = -7 : [284] 1 = -2, 1 = -5, 11 = -13 : [>=974] 1 = -2, 1 = -5, 11 = -13, 17 = -19 : [974] 1 = -2, 1 = -5, 11 = -13, 17 = -19, 23 = +29 : [974] 1 = -2, 1 = -5, 11 = -13, 17 = -19, 23 = +29, 23 = -31 : [854] 1 = +3 : [188] 1 = -3 : [>=575] 1 = -3, 1 = -5 : [>=476] 1 = -3, 1 = +5 : [>=376] 1 = -3, 2 = +5 : [>=506] 1 = -3, 2 = +5, 1 = -11 : [506] 1 = +32 : [>=417] 2 = +3 : [>=549*] 2 = -3 : [>=641]

- Asterisk means that a depth-first search with a little look-ahead showed that the maximum is finite, but the actual maximum may be slightly above that shown.