A survey on local and 2-local derivations on C*- and von Neuman algebras

Abstract: Abstract. We survey the results on local and 2-local derivations on C * -algebras, von Neumann algebras and JB * -triples.

“…As in previous studies on 2-local derivations and * -homomorphisms (cf. [1,13,5,6] and [2]), the techniques in this paper rely on the Bunce-Wright-Mackey-Gleason theorem [4], however, certain subtle circumstances and pathologies, which are intrinsical to the lattice P(M n ) of all projections in M n , increase the difficulties with respect to previous contributions. More concretely, the just mentioned Bunce-Wright-Mackey-Gleason theorem asserts that every bounded, finitely additive (vector) measure on the set of projections of a von Neumann algebra M with no direct summand of Type I 2 extends (uniquely) to a bounded linear operator defined on M .…”

Weak-2-local derivations on Mn

“…As in previous studies on 2-local derivations and * -homomorphisms (cf. [1,13,5,6] and [2]), the techniques in this paper rely on the Bunce-Wright-Mackey-Gleason theorem [4], however, certain subtle circumstances and pathologies, which are intrinsical to the lattice P(M n ) of all projections in M n , increase the difficulties with respect to previous contributions. More concretely, the just mentioned Bunce-Wright-Mackey-Gleason theorem asserts that every bounded, finitely additive (vector) measure on the set of projections of a von Neumann algebra M with no direct summand of Type I 2 extends (uniquely) to a bounded linear operator defined on M .…”

Weak-2-local derivations on Mn

“…Applications can be found in quantum physics and quantum information (cf. [18], [43], [37], [36], [22,Chapter 7], and [16], among many others), and in functional analysis with studies on vector-valued measures on von Neumann algebras and 2-local maps on von Neumann algebras, JBW * -algebras and JBW * -triples (see [20], [3], [4], [13] [14] and [32]).…”

“…For an elaboration of the above summary, see the forthcoming survey of Ayupov, Kudaybergenov, and Peralta, [4]. Local and 2-local derivations have also been considered on algebras of measurable operators associated with von Neumann algebras.…”

Boundedness of completely additive measures with application to 2-local triple derivations

“…In general, there are two directions in the study of the local actions of mappings of operator algebras. One is the well-known local mappings problem, such as local derivations and local automorphisms (for example, see [10][11][12][13] and references therein). Motivated by local derivations and local isomorphisms, we call a linear mapping a local left centralizer of A, if for each A ∈ A there is a left centralizer A of A such that (A) = A (A).…”

Characterization of centralizers on nest subalgebras of von Neumann algebras by local action