We introduce a new and extensive theory of noncommutative convexity along with a corresponding theory of noncommutative functions. We establish noncommutative analogues of the fundamental results from classical convexity theory, and apply these ideas to develop a noncommutative Choquet theory that generalizes much of classical Choquet theory. The central objects of interest in noncommutative convexity are noncommutative convex sets. The category of compact noncommutative sets is dual to the category of operator systems, and there is a robust notion of extreme point for a noncommutative convex set that is dual to Arveson's notion of boundary representation for an operator system. We identify the C*-algebra of continuous noncommutative fu...
The talk concerns inequalities for functions having matrix variables. The functions are typically (n...
AbstractThe principal result is a new proof, independent of complex function theory, that the spectr...
Following work of Kavruk et al. on tensor products of operator systems, we discuss the tensor theor...
Since seminal work of Stinespring, Arveson, and others, dilation theory has been an indispensable to...
This project is a literature survey of various theorems and their applications in Choquet theory. Fo...
© 2016, Allerton Press, Inc.We establish monotonicity and convexity criteria for a continuous functi...
In free noncommutative function theory one replaces functions between vector spaces by functions bet...
We introduce the notion of trace convexity for functions and respectively, for subsets of a compact ...
The generalized state space of a commutative C*-algebra, denoted SH(C(X)), is the set of positive un...
This is a pre-copyedited, author-produced PDF of an article accepted for publication in Quarterly Jo...
This talk will discuss matrix convex sets and their tracial analogs which we call contractively tra...
We present a Choquet-Deny-type theorem for downward filtering convex sets of continuous functions an...
The Bishop-de Leeuw theorem asserts the equivalence of various sort of peaking phenomena for functio...
AbstractRecently the study of completely positive maps has become important to the results of Brown,...
Abstract. We show that every operator system (and hence every unital operator algebra) has sufficien...
The talk concerns inequalities for functions having matrix variables. The functions are typically (n...
AbstractThe principal result is a new proof, independent of complex function theory, that the spectr...
Following work of Kavruk et al. on tensor products of operator systems, we discuss the tensor theor...
Since seminal work of Stinespring, Arveson, and others, dilation theory has been an indispensable to...
This project is a literature survey of various theorems and their applications in Choquet theory. Fo...
© 2016, Allerton Press, Inc.We establish monotonicity and convexity criteria for a continuous functi...
In free noncommutative function theory one replaces functions between vector spaces by functions bet...
We introduce the notion of trace convexity for functions and respectively, for subsets of a compact ...
The generalized state space of a commutative C*-algebra, denoted SH(C(X)), is the set of positive un...
This is a pre-copyedited, author-produced PDF of an article accepted for publication in Quarterly Jo...
This talk will discuss matrix convex sets and their tracial analogs which we call contractively tra...
We present a Choquet-Deny-type theorem for downward filtering convex sets of continuous functions an...
The Bishop-de Leeuw theorem asserts the equivalence of various sort of peaking phenomena for functio...
AbstractRecently the study of completely positive maps has become important to the results of Brown,...
Abstract. We show that every operator system (and hence every unital operator algebra) has sufficien...
The talk concerns inequalities for functions having matrix variables. The functions are typically (n...
AbstractThe principal result is a new proof, independent of complex function theory, that the spectr...
Following work of Kavruk et al. on tensor products of operator systems, we discuss the tensor theor...