Global and local minima of α-Brjuno functions

Abstract

The main goal of this article is to analyze some peculiar features of the global (and local) minima of α-Brjuno functions Bα where α∈(0,1]. Our starting point is the result by Balazard--Martin (2020), who showed that the minimum of B1 is attained at g:= 5 -12; analyzing the scaling properties of B1 near g we shall deduce that all preimages of g under the Gauss map are also local minima for B1. Next we consider the problem of characterizing global and local minima of Bα for other values of α: we show that for α∈ (g,1) the global minimum is again attained at g, while for α in a neighbourhood of 1/2 the function Bα attains its minimum at γ:=2-1. The fact that the minimum of Bα is attained when α ranges a whole interval of parameters is non trivial. Indeed, we prove that Bα is lower semicontinuous for all rational α, but we also exhibit an irrational α for which Bα is not lower semicontinuous. %We also prove that if α is rational then Bα is lower semicontinuous. This property does not hold in general, in fact we show that Bα is not lower semicontinuous for a suitable irrational α.