We consider homogeneous multidimensional continued fraction algorithms, in
particular a family of maps which was introduced by F. Schweiger. We prove his
conjecture regarding the existence of an absorbing set for those maps. We also
establish that their renormalisations are nonergodic which disproves another
conjecture due to Schweiger. Other homogeneous algorithms are also analysed
including ones which are ergodic

Miernowski, Tomasz

Nogueira, Arnaldo

English

arXiv

We consider homogeneous multidimensional continued fraction algorithms, in partic-ular a family of maps which was introduced by F. Schweiger. We prove his conjecture regarding the existence of an absorbing set for those maps. We also establish that their renormalisations are nonergodic which disproves another conjecture due to Schweiger. Other homogeneous algorithms are also analysed including ones which are ergodic. 

Absorbing sets of homogeneous subtractive algorithms

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