Partially Positive Semidefinite Maps on $*$-Semigroupoids and Linearisations

Motivated by Cuntz-Krieger-Toeplitz systems associated to undirected graphs and representations of groupoids, we obtain a generalisation of the Sz-Nagy's Dilation Theorem for operator valued partially positive semidefinite maps on $*$-semigroupoids with unit, with varying degrees of aggregation, firstly by $*$-representations with unbounded operators and then we characterise the existence of the corresponding $*$-representations by bounded operators. By linearisation of these constructions, we obtain similar results for operator valued partially positive semidefinite maps on $*$-algebroids with unit and then, for the special case of $B^*$-algebroids with unit, we obtain a generalisation of the Stinespring's Dilation Theorem. As an application of the generalisation of the Stinespring's Dilation Theorem, we show that some natural questions on $C^*$-algebroids are equivalent.

[1]  P. M. Hajac,et al.  Graph algebras , 2019, 1912.05136.

[2]  Dana P. Williams A Tool Kit for Groupoid 𝐶*-Algebras , 2019, Mathematical Surveys and Monographs.

[3]  Adam Dor-On,et al.  Full Cuntz–Krieger dilations via non‐commutative boundaries , 2017, J. Lond. Math. Soc..

[4]  O. Lombardi,et al.  What is quantum information , 2016 .

[5]  A. Gheondea,et al.  On Two Equivalent Dilation Theorems in VH-Spaces , 2012 .

[6]  W. Arveson Dilation Theory Yesterday and Today , 2009, 0902.3989.

[7]  R. Exel Semigroupoid C⁎-algebras , 2006, math/0611929.

[8]  Michael A. Dritschel,et al.  Interpolation in semigroupoid algebras , 2005, math/0507083.

[9]  D. Kribs,et al.  Applications of the wold decomposition to the study of row contractions associated with directed graphs , 2003, math/0311178.

[10]  D. Kribs,et al.  Partially isometric dilations of noncommuting N-tuples of operators , 2003, math/0309398.

[11]  S. Power,et al.  Free Semigroupoid Algebras , 2003, math/0309394.

[12]  V. Paulsen Completely Bounded Maps and Operator Algebras: Contents , 2003 .

[13]  William Arveson,et al.  A Short Course on Spectral Theory , 2001 .

[14]  Michael A. Dritschel,et al.  A COURSE IN OPERATOR THEORY (Graduate Studies in Mathematics 21) , 2001 .

[15]  J. Conway A course in operator theory , 1999 .

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

[17]  I. Raeburn,et al.  CUNTZ-KRIEGER ALGEBRAS OF DIRECTED GRAPHS , 1998 .

[18]  J. Renault,et al.  Graphs, Groupoids, and Cuntz–Krieger Algebras , 1997 .

[19]  Gelu Popescu,et al.  Isometric dilations for infinite sequences of noncommuting operators , 1989 .

[20]  Bret Tilson,et al.  Categories as algebra: An essential ingredient in the theory of monoids , 1987 .

[21]  Wolfgang Krieger,et al.  A class ofC*-algebras and topological Markov chains , 1980 .

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

[23]  H. Brandt Über eine Verallgemeinerung des Gruppenbegriffes , 1927 .

[24]  Sammie Bae,et al.  Graphs , 2020, Algorithms.

[25]  K. Schmüdgen An Invitation to Unbounded Representations of ∗-Algebras on Hilbert Space , 2020 .

[26]  Veny Liu Free inverse semigroupoids and their inverse subsemigroupoids , 2016 .

[27]  W. Stinespring POSITIVE FUNCTIONS ON C*-ALGEBRAS , 2010 .

[28]  Masahito Hayashi Quantum information : an introduction , 2006 .