Martingales for quasisymmetric systems and complex manifold structures

Abstract: Abstract. We construct an infinite martingale sequence on the dual symbolic space from a uniformly quasisymmetric circle endomorphism preserving the Lebesgue measure. This infinite martingale sequence is uniformly bounded. Thus from the martingale convergence theorem, there is a limiting martingale which is the unique L 1 limit of this uniformly bounded infinite martingale sequence. Moreover, we prove that the classical Hilbert transform gives an almost complex structure on the space of all uniformly quasisymm… Show more

“…Assume we have a partition interval I wn such that I wn ∩X = ∅. Then we can find a number D < Φ such that (7) |h(I)| |I| ≤ D for all I ⊂ I wn . Since X = ∅, we have an interval…”

“…However, as long as at least one of the maps is not in UQCE(d), the conjugacy h may not be quasisymmetric. Refer to [1,5,7,10,11].…”

Symmetric Rigidity for Circle Endomorphisms with Bounded Geometry

“…Assume we have a partition interval I wn such that I wn ∩X = ∅. Then we can find a number D < Φ such that (7) |h(I)| |I| ≤ D for all I ⊂ I wn . Since X = ∅, we have an interval…”

“…However, as long as at least one of the maps is not in UQCE(d), the conjugacy h may not be quasisymmetric. Refer to [1,5,7,10,11].…”

Symmetric Rigidity for Circle Endomorphisms with Bounded Geometry

Markov partitions, Martingale and symmetric conjugacy of circle endomorphisms

Symmetric rigidity for circle endomorphisms having bounded geometry