ON A CLASS OF COUNTABLE BOOLEAN INVERSE MONOIDS AND MATUI'S SPATIAL REALIZATION THEOREM

We introduce a class of inverse monoids that can be regarded as non-commutative generalizations of Boolean algebras. These inverse monoids are related to a class ofetale topological groupoids, under a non-commutative generalization of classical Stone duality. Furthermore, and significantly for this paper, they arise naturally in the theory of dynamical systems as developed by Matui. We are thereby able to reinterpret a theorem of Matui on a class of ´ groupoids, in the spirit of Rubin's theorem, as an equivalent theorem about a class of inverse monoids. The inverse monoids in question may be viewed as the countably infinite generalizations of finite symmetric inverse monoids. Their groups of units therefore generalize the finite symmetric groups and include amongst their number the Thompson groups Gn,1.

[1]  T. Jech Measure Algebras , 2017, 1705.01000.

[2]  M. Lawson,et al.  A perspective on non-commutative frame theory , 2014, 1404.6516.

[3]  M. Lawson,et al.  DISTRIBUTIVE INVERSE SEMIGROUPS AND NON-COMMUTATIVE STONE DUALITIES , 2013, 1302.3032.

[4]  H. Matui Topological full groups of one-sided shifts of finite type , 2012, 1210.5800.

[5]  M. Lawson,et al.  Pseudogroups and their étale groupoids , 2011, 1107.5511.

[6]  S. Margolis,et al.  THE ÉTALE GROUPOID OF AN INVERSE SEMIGROUP AS A GROUPOID OF FILTERS , 2011, Journal of the Australian Mathematical Society.

[7]  David G. Jones,et al.  Graph inverse semigroups: their characterization and completion , 2011, 1106.3644.

[8]  Mark V. Lawson,et al.  Non-Commutative Stone duality: Inverse Semigroups, Topological Groupoids and C*-Algebras , 2011, Int. J. Algebra Comput..

[9]  M. Lawson Compactable semilattices , 2010, 1003.1925.

[10]  Mark V Lawson,et al.  A NONCOMMUTATIVE GENERALIZATION OF STONE DUALITY , 2009, Journal of the Australian Mathematical Society.

[11]  H. Matui Homology and topological full groups of étale groupoids on totally disconnected spaces , 2009, 0909.1624.

[12]  Steven Givant,et al.  Introduction to Boolean Algebras , 2008 .

[13]  D. Lenz ON AN ORDER-BASED CONSTRUCTION OF A TOPOLOGICAL GROUPOID FROM AN INVERSE SEMIGROUP , 2008, Proceedings of the Edinburgh Mathematical Society.

[14]  Mark V. Lawson,et al.  The Polycyclic Monoids P n and the Thompson Groups V n,1 , 2007 .

[15]  Mark V. Lawson,et al.  Orthogonal Completions of the Polycyclic Monoids , 2007 .

[16]  R. Exel Tight representations of semilattices and inverse semigroups , 2007, math/0703401.

[17]  R. Exel Inverse semigroups and combinatorial C*-algebras , 2007, math/0703182.

[18]  Bruce Hughes Trees, Ultrametrics, and Noncommutative Geometry , 2006, math/0605131.

[19]  P. Resende A Note on Infinitely Distributive Inverse Semigroups , 2005, math/0506454.

[20]  P. Resende Étale groupoids and their quantales , 2004, math/0412478.

[21]  J. Birget The Groups of Richard Thompson and Complexity , 2002, Int. J. Algebra Comput..

[22]  M. Lawson Inverse Semigroups, the Theory of Partial Symmetries , 1998 .

[23]  A. Paterson,et al.  Groupoids, Inverse Semigroups, and their Operator Algebras , 1998 .

[24]  J. Kellendonk Topological equivalence of tilings , 1996, cond-mat/9609254.

[25]  J. Kellendonk The Local Structure of Tilings and Their Integer Group of Coinvariants , 1995, cond-mat/9508010.

[26]  M. Rubin On the reconstruction of topological spaces from their groups of homeomorphisms , 1989 .

[27]  A. Kumjian On localizations and simple $C^{\ast}$-algebras. , 1984 .

[28]  J. Renault A Groupoid Approach to C*-Algebras , 1980 .

[29]  Pedro Resende,et al.  Lectures on etale groupoids, inverse semigroups and quantales , 2010 .

[30]  Jonathan Leech INVERSE MONOIDS WITH A NATURAL SEMILATTICE ORDERING , 1995 .

[31]  Mario Petrich,et al.  Inverse semigroups , 1985 .

[32]  Charles Ehresmann,et al.  Cahiers de topologie et géometrie différentielle , 1982 .

[33]  J. R. Buzeman Introduction To Boolean Algebras , 1961 .