Update: Some new results on lower bounds on (n,r)-arcs in PG(2,q) for q 31

Abstract

An (n,r)-arc in PG(2,q) is a set B of points in PG(2,q) such that each line in PG(2,q) contains at most r elements of B and such that there is at least one line containing exactly r elements of B. The value mr(2,q) denotes the maximal number n of points in the projective geometry PG(2,q) for which an (n,r)-arc exists. By explicitly constructing (n,r)-arcs using prescribed automorphisms and integer linear programming we obtain some improved lower bounds for mr(2,q): m10(2,16) 144, m3(2,25) 39, m18(2,25) 418, m9(2,27) 201, m14(2,29) 364, m25(2,29) 697, m25(2,31) 734. Furthermore, we show by systematically excluding possible automorphisms that putative (44,5)-arcs, (90,9)-arcs in PG(2,11), and (39,4)-arcs in PG(2,13) -- in case of their existence -- are rigid, i.e. they all would only admit the trivial automorphism group of order 1. In addition, putative (50,5)-arcs, (65,6)-arcs, (119,10)-arcs, (133,11)-arcs, and (146,12)-arcs in PG(2,13) would be rigid or would admit a unique automorphism group (up to conjugation) of order 2.

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