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W2771239960 endingPage "191" @default.
W2771239960 startingPage "97" @default.
W2771239960 abstract "A Sturmian sequence is an infinite nonperiodic string over two letters with minimal subword complexity. In two papers, the first written by Morse and Hedlund in 1940 and the second by Coven and Hedlund in 1973, a surprising correspondence was established between Sturmian sequences on one side and rotations by an irrational number on the unit circle on the other. In 1991 Arnoux and Rauzy observed that an induction process (invented by Rauzy in the late 1970s), related with the classical continued fraction algorithm, can be used to give a very elegant proof of this correspondence. This process, known as the Rauzy induction, extends naturally to interval exchange transformations (this is the setting in which it was first formalized). It has been conjectured since the early 1990s that these correspondences carry over to rotations on higher dimensional tori, generalized continued fraction algorithms, and so-called S-adic sequences generated by substitutions. The idea of working towards such a generalization is known as Rauzy’s program. Recently Berthé, Steiner, and Thuswaldner made some progress on Rauzy’s program and were indeed able to set up the conjectured generalization of the above correspondences. Using a generalization of Rauzy’s induction process in which generalized continued fraction algorithms show up, they proved that under certain natural conditions an S-adic sequence gives rise to a dynamical system which is measurably conjugate to a rotation on a higher dimensional torus. Moreover, they established a metric theory which shows that counterexamples like the one constructed in 2000 by Cassaigne, Ferenczi, and Zamboni are rare. It is the aim of the present chapter to survey all these ideas and results." @default.
W2771239960 created "2017-12-22" @default.
W2771239960 creator A5020243260 @default.
W2771239960 date "2020-01-01" @default.
W2771239960 modified "2023-09-30" @default.
W2771239960 title "S-adic Sequences: A Bridge Between Dynamics, Arithmetic, and Geometry" @default.
W2771239960 cites W146629828 @default.
W2771239960 cites W1524337875 @default.
W2771239960 cites W1527236515 @default.
W2771239960 cites W1538608183 @default.
W2771239960 cites W1633035226 @default.
W2771239960 cites W1716517579 @default.
W2771239960 cites W1915727915 @default.
W2771239960 cites W194037683 @default.
W2771239960 cites W1973422585 @default.
W2771239960 cites W1976512427 @default.
W2771239960 cites W1978666516 @default.
W2771239960 cites W1979109450 @default.
W2771239960 cites W1979347334 @default.
W2771239960 cites W1984528804 @default.
W2771239960 cites W1991234871 @default.
W2771239960 cites W1991274124 @default.
W2771239960 cites W1991987591 @default.
W2771239960 cites W1995104324 @default.
W2771239960 cites W1998980189 @default.
W2771239960 cites W2005714434 @default.
W2771239960 cites W2008175767 @default.
W2771239960 cites W2009146694 @default.
W2771239960 cites W2011201107 @default.
W2771239960 cites W2017294692 @default.
W2771239960 cites W2020565995 @default.
W2771239960 cites W2025774179 @default.
W2771239960 cites W2027575955 @default.
W2771239960 cites W2028740471 @default.
W2771239960 cites W2034185554 @default.
W2771239960 cites W2034936330 @default.
W2771239960 cites W2036436993 @default.
W2771239960 cites W2041136798 @default.
W2771239960 cites W2041727055 @default.
W2771239960 cites W2046689970 @default.
W2771239960 cites W2050250729 @default.
W2771239960 cites W2052495301 @default.
W2771239960 cites W2056797397 @default.
W2771239960 cites W2068598840 @default.
W2771239960 cites W2074138263 @default.
W2771239960 cites W2076032753 @default.
W2771239960 cites W2080253405 @default.
W2771239960 cites W2087876932 @default.
W2771239960 cites W2091724388 @default.
W2771239960 cites W2100881369 @default.
W2771239960 cites W2100975307 @default.
W2771239960 cites W2109551969 @default.
W2771239960 cites W2120096817 @default.
W2771239960 cites W2136939022 @default.
W2771239960 cites W2144756825 @default.
W2771239960 cites W2145172749 @default.
W2771239960 cites W2146909040 @default.
W2771239960 cites W2151956918 @default.
W2771239960 cites W2153295092 @default.
W2771239960 cites W2172152577 @default.
W2771239960 cites W2187202169 @default.
W2771239960 cites W2247002827 @default.
W2771239960 cites W2262768638 @default.
W2771239960 cites W2317201179 @default.
W2771239960 cites W2331228503 @default.
W2771239960 cites W2462122667 @default.
W2771239960 cites W2504406012 @default.
W2771239960 cites W2509973786 @default.
W2771239960 cites W2566326075 @default.
W2771239960 cites W270574226 @default.
W2771239960 cites W292434172 @default.
W2771239960 cites W2962767164 @default.
W2771239960 cites W2962814574 @default.
W2771239960 cites W2963213370 @default.
W2771239960 cites W2963491477 @default.
W2771239960 cites W2963526220 @default.
W2771239960 cites W2963681966 @default.
W2771239960 cites W2963749927 @default.
W2771239960 cites W2963778519 @default.
W2771239960 cites W3098832789 @default.
W2771239960 cites W3101218601 @default.
W2771239960 cites W3102310371 @default.
W2771239960 cites W3102426279 @default.
W2771239960 cites W3104476033 @default.
W2771239960 cites W3106358809 @default.
W2771239960 cites W3121286321 @default.
W2771239960 cites W3204164517 @default.
W2771239960 cites W4214649372 @default.
W2771239960 cites W4231009334 @default.
W2771239960 cites W4238159413 @default.
W2771239960 cites W4244795967 @default.
W2771239960 cites W4247766333 @default.
W2771239960 cites W4292366057 @default.
W2771239960 cites W4293517843 @default.
W2771239960 cites W55066096 @default.
W2771239960 cites W584208200 @default.
W2771239960 cites W590026092 @default.
W2771239960 cites W63379236 @default.