On the Nth linear complexity of automatic sequences

Abstract

The Nth linear complexity of a sequence is a measure of predictability. Any unpredictable sequence must have large Nth linear complexity. However, in this paper we show that for q-automatic sequences over Fq the converse is not true. We prove that any (not ultimately periodic) q-automatic sequence over Fq has Nth linear complexity of order of magnitude N. For some famous sequences including the Thue--Morse and Rudin--Shapiro sequence we determine the exact values of their Nth linear complexities. These are non-trivial examples of predictable sequences with Nth linear complexity of largest possible order of magnitude.