International audienceThis paper studies geometric and spectral properties of $S$-adic shifts and their relation to continued fraction algorithms. These shifts are symbolic dynamical systems obtained by iterating infinitely many substitutions. Pure discrete spectrum for $S$-adic shifts and tiling properties of associated Rauzy fractals are established under a generalized Pisot assumption together with a geometric coincidence condition. These general results extend the scope of the Pisot substitution conjecture to the $S$-adic framework. They are applied to families of $S$-adic shifts generated by Arnoux-Rauzy as well as Brun substitutions. It is shown that almost all of these shifts have pure discrete spectrum. Using $S$-adic words r...
For a Pisot primitive unimodular substitution over the alphabet A with d letters, a substitution dyn...
We give a sufficient geometric condition for a subshift to be measurably isomorphic to a domain exch...
International audienceWe set up a geometrical theory for the study of the dynamics of reducible Piso...
"Natural extension of arithmetic algorithms and S-adic system". July 20~24, 2015. edited by Shigeki ...
International audienceWe prove that the symbolic dynamical system generated by a purely substitutive...
International audienceWe prove an extension of the well-known Pisot substitution conjecture to the S...
We provide a proof of Pisot conjecture, a classification problem in Ergodic Theory on recurrent sequ...
International audienceIn this paper, we will first formulate and prove some equivalent sufficient co...
International audienceWe define a generic algorithmic framework to prove a pure discrete spectrum fo...
An S-adic expansion of an infinite word is a way of writing it as the limit of an infinite product o...
AbstractLet (N̄n,(+1)n) be the adic system associated to the substitution: 1 → 12,…,(n − 1) → 1n, n ...
In this thesis, I develop a semi-algorithm consisting of an automaton, or rather, an ever-building f...
International audienceIn this talk we will survey several decidability and undecidability results on...
International audienceIt has been a long standing problem to find good symbolic codings for translat...
For a Pisot primitive unimodular substitution over the alphabet A with d letters, a substitution dyn...
We give a sufficient geometric condition for a subshift to be measurably isomorphic to a domain exch...
International audienceWe set up a geometrical theory for the study of the dynamics of reducible Piso...
"Natural extension of arithmetic algorithms and S-adic system". July 20~24, 2015. edited by Shigeki ...
International audienceWe prove that the symbolic dynamical system generated by a purely substitutive...
International audienceWe prove an extension of the well-known Pisot substitution conjecture to the S...
We provide a proof of Pisot conjecture, a classification problem in Ergodic Theory on recurrent sequ...
International audienceIn this paper, we will first formulate and prove some equivalent sufficient co...
International audienceWe define a generic algorithmic framework to prove a pure discrete spectrum fo...
An S-adic expansion of an infinite word is a way of writing it as the limit of an infinite product o...
AbstractLet (N̄n,(+1)n) be the adic system associated to the substitution: 1 → 12,…,(n − 1) → 1n, n ...
In this thesis, I develop a semi-algorithm consisting of an automaton, or rather, an ever-building f...
International audienceIn this talk we will survey several decidability and undecidability results on...
International audienceIt has been a long standing problem to find good symbolic codings for translat...
For a Pisot primitive unimodular substitution over the alphabet A with d letters, a substitution dyn...
We give a sufficient geometric condition for a subshift to be measurably isomorphic to a domain exch...
International audienceWe set up a geometrical theory for the study of the dynamics of reducible Piso...