[1XReferences[0X [[20XAle83[15X] [16XAleshin, S. V.[15X, [17XA free group of finite automata[15X, [18XVestnik Moskov. Univ. Ser. I Mat. Mekh.[15X, 4 (1983), 12-14. [[20XBac07[15X] [16XBacher, R.[15X, [17XDeterminants related to binomial coefficients modulo 2 and 4[15X (2007), ((arXiv:math/0708.1430)). [[20XBar03a[15X] [16XBartholdi, L.[15X, [17XA Wilson group of non-uniformly exponential growth[15X, [18XC. R. Math. Acad. Sci. Paris[15X, [19X336[15X, 7 (2003), 549--554. [[20XBar03b[15X] [16XBartholdi, L.[15X, [17XEndomorphic presentations of branch groups[15X, [18XJ. Algebra[15X, [19X268[15X, 2 (2003), 419--443. [[20XBG02[15X] [16XBartholdi, L. and Grigorchuk, R. I.[15X, [17XOn parabolic subgroups and Hecke algebras of some fractal groups[15X, [18XSerdica Math. J.[15X, [19X28[15X, 1 (2002), 47--90. [[20XBGN03[15X] [16XBartholdi, L., Grigorchuk, R. and Nekrashevych, V.[15X, [17XFrom fractal groups to fractal sets[15X, in Fractals in Graz 2001, Birkhäuser, Trends Math., Basel (2003), 25--118. [[20XBGÅ 03[15X] [16XBartholdi, L., Grigorchuk, R. I. and Å uniḱ, Z.[15X, [17XBranch groups[15X, in Handbook of algebra, Vol. 3, North-Holland, Amsterdam (2003), 989--1112. [[20XBR05[15X] [16XBartholdi, L. and Reznykov, I. I.[15X, [17XA Mealy machine of growth n^2.4401[15X (2005), ((arXiv:math.GR/0506203)). [[20XBRS06[15X] [16XBartholdi, L., Reznykov, I. I. and Sushchansky, V. I.[15X, [17XThe smallest Mealy automaton of intermediate growth[15X, [18XJ. Algebra[15X, [19X295[15X, 2 (2006), 387--414. [[20XBÅ 01[15X] [16XBartholdi, L. and Å uniḱ, Z.[15X, [17XOn the word and period growth of some groups of tree automorphisms[15X, [18XComm. Algebra[15X, [19X29[15X, 11 (2001), 4923--4964. [[20XBV05[15X] [16XBartholdi, L. and Virág, B.[15X, [17XAmenability via random walks[15X, [18XDuke Math. J.[15X, [19X130[15X, 1 (2005), 39--56. [[20XBS62[15X] [16XBaumslag, G. and Solitar, D.[15X, [17XSome two-generator one-relator non-Hopfian groups[15X, [18XBull. Amer. Math. Soc.[15X, [19X68[15X (1962), 199--201. [[20XBel04[15X] [16XBellingeri, P.[15X, [17XOn presentations of surface braid groups[15X, [18XJ. Algebra[15X, [19X274[15X, 2 (2004), 543--563. [[20XBFH92[15X] [16XBielefeld, B., Fisher, Y. and Hubbard, J.[15X, [17XThe classification of critically preperiodic polynomials as dynamical systems[15X, [18XJ. Amer. Math. Soc.[15X, [19X5[15X, 4 (1992), 721--762. [[20XBSV99[15X] [16XBrunner, A. M., Sidki, S. and Vieira, A. C.[15X, [17XA just nonsolvable torsion-free group defined on the binary tree[15X, [18XJ. Algebra[15X, [19X211[15X, 1 (1999), 99--114. [[20XBM97[15X] [16XBurger, M. and Mozes, S.[15X, [17XFinitely presented simple groups and products of trees[15X, [18XC. R. Acad. Sci. Paris Sér. I Math.[15X, [19X324[15X, 7 (1997), 747--752. [[20XBM00a[15X] [16XBurger, M. and Mozes, S.[15X, [17XGroups acting on trees: from local to global structure[15X, [18XInst. Hautes Ãtudes Sci. Publ. Math.[15X, 92 (2000), 113--150 (2001). [[20XBM00b[15X] [16XBurger, M. and Mozes, S.[15X, [17XLattices in product of trees[15X, [18XInst. Hautes Ãtudes Sci. Publ. Math.[15X, 92 (2000), 151--194 (2001). [[20XCha95[15X] [16XCharney, R.[15X, [17XGeodesic automation and growth functions for Artin groups of finite type[15X, [18XMath. Ann.[15X, [19X301[15X, 2 (1995), 307--324. [[20XDah05[15X] [16XDahmani, F.[15X, [17XAn example of non-contracting weakly branch automaton group[15X, in Geometric methods in group theory, Amer. Math. Soc., Contemp. Math., [19X372[15X, Providence, RI (2005), 219--224. [[20XDH84[15X] [16XDouady, A. and Hubbard, J. H.[15X, [17XÃtude dynamique des polynômes complexes. Partie I[15X, Université de Paris-Sud, Département de Mathématiques, Orsay, Publications Mathématiques d'Orsay [Mathematical Publications of Orsay], [19X84[15X (1984), 75 pages. [[20XDH85[15X] [16XDouady, A. and Hubbard, J. H.[15X, [17XÃtude dynamique des polynômes complexes. Partie II[15X, Université de Paris-Sud, Département de Mathématiques, Orsay, Publications Mathématiques d'Orsay [Mathematical Publications of Orsay], [19X85[15X (1985), v+154 pages, ((With the collaboration of P. Lavaurs, Tan Lei and P. Sentenac)). [[20XEH07[15X] [16XEick, B. and Hartung, R.[15X, [17XA nilpotent quotient algorithm for L-presented groups[15X (2007), ((submitted)). [[20XErs04[15X] [16XErschler, A.[15X, [17XBoundary behavior for groups of subexponential growth[15X, [18XAnn. of Math. (2)[15X, [19X160[15X, 3 (2004), 1183--1210. [[20XFG85[15X] [16XFabrykowski, J. and Gupta, N.[15X, [17XOn groups with sub-exponential growth functions[15X, [18XJ. Indian Math. Soc. (N.S.)[15X, [19X49[15X, 3-4 (1985), 249--256 (1987). [[20XFG91[15X] [16XFabrykowski, J. and Gupta, N.[15X, [17XOn groups with sub-exponential growth functions. II[15X, [18XJ. Indian Math. Soc. (N.S.)[15X, [19X56[15X, 1-4 (1991), 217--228. [[20XGM05[15X] [16XGlasner, Y. and Mozes, S.[15X, [17XAutomata and square complexes[15X, [18XGeom. Dedicata[15X, [19X111[15X (2005), 43--64. [[20XGri84[15X] [16XGrigorchuk, R. I.[15X, [17XDegrees of growth of finitely generated groups and the theory of invariant means[15X, [18XIzv. Akad. Nauk SSSR Ser. Mat.[15X, [19X48[15X, 5 (1984), 939--985. [[20XGÅ 06[15X] [16XGrigorchuk, R. and Å uniḱ, Z.[15X, [17XAsymptotic aspects of Schreier graphs and Hanoi Towers groups[15X, [18XC. R. Math. Acad. Sci. Paris[15X, [19X342[15X, 8 (2006), 545--550. [[20XGÅ»02a[15X] [16XGrigorchuk, R. I. and Å»uk, A.[15X, [17XOn a torsion-free weakly branch group defined by a three state automaton[15X, [18XInternat. J. Algebra Comput.[15X, [19X12[15X, 1-2 (2002), 223--246, ((International Conference on Geometric and Combinatorial Methods in Group Theory and Semigroup Theory (Lincoln, NE, 2000))). [[20XGÅ»02b[15X] [16XGrigorchuk, R. I. and Å»uk, A.[15X, [17XOn a torsion-free weakly branch group defined by a three state automaton[15X, [18XInternat. J. Algebra Comput.[15X, [19X12[15X, 1-2 (2002), 223--246, ((International Conference on Geometric and Combinatorial Methods in Group Theory and Semigroup Theory (Lincoln, NE, 2000))). [[20XGri80[15X] [16XGrigorÄuk, R. I.[15X, [17XOn Burnside's problem on periodic groups[15X, [18XFunktsional. Anal. i Prilozhen.[15X, [19X14[15X, 1 (1980), 53--54. [[20XGS83[15X] [16XGupta, N. and Sidki, S.[15X, [17XOn the Burnside problem for periodic groups[15X, [18XMath. Z.[15X, [19X182[15X, 3 (1983), 385--388. [[20XLys85[15X] [16XLysënok, I. G.[15X, [17XA set of defining relations for the Grigorchuk group[15X, [18XMat. Zametki[15X, [19X38[15X, 4 (1985), 503--516, 634. [[20XMNS00[15X] [16XMacedoÅska, O., Nekrashevych, V. and Sushchansky, V.[15X, [17XCommensurators of groups and reversible automata[15X, [18XDopov. Nats. Akad. Nauk Ukr. Mat. Prirodozn. Tekh. Nauki[15X, 12 (2000), 36--39. [[20XMam03[15X] [16XMamaghani, M. J.[15X, [17XA fractal non-contracting class of automata groups[15X, [18XBull. Iranian Math. Soc.[15X, [19X29[15X, 2 (2003), 51--64, 92. [[20XNek05[15X] [16XNekrashevych, V.[15X, [17XSelf-similar groups[15X, American Mathematical Society, Mathematical Surveys and Monographs, [19X117[15X, Providence, RI (2005), xii+231 pages. [[20XNeu86[15X] [16XNeumann, P. M.[15X, [17XSome questions of Edjvet and Pride about infinite groups[15X, [18XIllinois J. Math.[15X, [19X30[15X, 2 (1986), 301--316. [[20XPet06[15X] [16XPetrogradsky, V. M.[15X, [17XExamples of self-iterating Lie algebras[15X, [18XJ. Algebra[15X, [19X302[15X, 2 (2006), 881--886. [[20XPoi[15X] [16XPoirier, A.[15X, [17XOn postcritically finite polynomials, part 1: critical portraits[15X, Stony Brook IMS 1993/5. [[20XSZ08[15X] [16XShestakov, I. P. and Zelmanov, E.[15X, [17XSome examples of nil Lie algebras[15X, [18XJ. Eur. Math. Soc. (JEMS)[15X, [19X10[15X, 2 (2008), 391--398. [[20XSid00[15X] [16XSidki, S.[15X, [17XAutomorphisms of one-rooted trees: growth, circuit structure, and acyclicity[15X, [18XJ. Math. Sci. (New York)[15X, [19X100[15X, 1 (2000), 1925--1943, ((Algebra, 12)). [[20XSid05[15X] [16XSidki, S.[15X, [17XTree-wreathing applied to generation of groups by finite automata[15X, [18XInternat. J. Algebra Comput.[15X, [19X15[15X, 5-6 (2005), 1205--1212. [[20XSW03[15X] [16XSidki, S. and Wilson, J. S.[15X, [17XFree subgroups of branch groups[15X, [18XArch. Math. (Basel)[15X, [19X80[15X, 5 (2003), 458--463. [[20XSS05[15X] [16XSilva, P. V. and Steinberg, B.[15X, [17XOn a class of automata groups generalizing lamplighter groups[15X, [18XInternat. J. Algebra Comput.[15X, [19X15[15X, 5-6 (2005), 1213--1234. [[20XSVV06[15X] [16XSteinberg, B., Vorobets, M. and Vorobets, Y.[15X, [17XAutomata over a binary alphabet generating free groups of even rank[15X (2006), ((arXiv:math.GR/0610033)). [[20XÅ un07[15X] [16XÅ uniÄ, Z.[15X, [17XHausdorff dimension in a family of self-similar groups[15X, [18XGeom. Dedicata[15X, [19X124[15X (2007), 213--236. [[20XTan02[15X] [16XTan, D. T.[15X, [17XQuadratische Morphismen[15X (2002), ((Diplomarbeit at ETHZ, under the supervision of R. Pink)). [[20XvN29[15X] [16Xvon Neumann, J.[15X, [17XZur allgemeinen Theorie des Masses[15X, [18XFund. Math.[15X, [19X13[15X (1929), 73--116 and 333, (((= Collected works, vol. I, pages 599--643))). [[20XVV06[15X] [16XVorobets, M. and Vorobets, Y.[15X, [17XOn a series of finite automata defining free transformation groups[15X (2006), ((arXiv:math.GR/0604328)). -------------------------------------------------------