Abstract matrix spaces and their generalisation Orawan Tripak Joint work with Martin Lindsay.

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Presentation transcript:

Abstract matrix spaces and their generalisation Orawan Tripak Joint work with Martin Lindsay

Outline of the talk Background & Definitions - Operator spaces - h-k-matrix spaces - Two topologies on h-k-matrix spaces Main results - Abstract description of h-k-matrix spaces Generalisation - Matrix space tensor products - Ampliation 2

Concrete Operator Space Definition. A closed subspace of for some Hilbert spaces and. We speak of an operator space in 3

Abstract Operator Space Definition. A vector space, with complete norms on, satisfying (R1) (R2) Denote, for resulting Banach spaces. 4

Ruan’s consistent conditions Let,, and. Then and 5

Completely Boundedness Lemma. [Smith]. For 6

Completely Boundedness(cont.) 7

O.S. structure on mapping spaces Linear isomorphisms give norms on matrices over and respectively. These satisfy (R1) and (R2). 8

Useful Identifications Remark. When the target is 9

The right &left h-k-matrix spaces Definitions. Let be an o.s. in Notation: 10

The right & left h-k-matrix spaces Theorem. Let V be an operator space in and let h and k be Hilbert spaces. Then 1. is an o.s. in 2. The natural isomorphism restrict to 11

Properties of h-k-matrix spaces (cont.) is u.w.closed is u.w.closed 5. 12

h-k-matrix space lifting Theorem. Let for concrete operator spaces and. Then 1. such that “Called h-k-matrix space lifting” 13

h-k-matrix space lifting (cont.) if is CI then is CI too. In particular, if is CII then so is 14

Topologies on Weak h-k-matrix topology is the locally convex topology generated by seminorms Ultraweak h-k-matrix topology is the locally convex topology generated by seminorms 15

Topologies on (cont.) Theorem. The weak h-k-matrix topology and the ultraweak h-k-matrix topology coincide on bounded subsets of 16

Topologies on (cont.) Theorem. For is continuous in both weak and ultraweak h-k-matrix topologies. 17

Seeking abstract description of h-k-matrix space Properties required of an abstract description. 1.When is concrete it must be completely isometric to 2. It must be defined for abstract operator space. 18

Seeking abstract description of h-k-matrix space (cont.) Theorem. For a concrete o.s., the map defined by is completely isometric isomorphism. 19

The proof : step 1 of 4 Lemma. [Lindsay&Wills] The map where is completely isometric isomorphism. 20

The proof : step 1 of 4 (cont.) Special case: when we have a map where which is completely isometric isomorphism. 21

The proof : step 2 of 4 Lemma. The map where is completely isometric isomorphism. 22

The proof : step 3 of 4 Lemma. The map where is a completely isometric isomorphism. 23

The proof : step 4 of 4 Theorem. The map where is a completely isometric isomorphism. 24

The proof : step 4 of 4 (cont.) The commutative diagram: 25

Matrix space lifting = left multiplication 26

Topologies on Pointwise-norm topology is the locally convex topology generated by seminorms Restricted pointwise-norm topology is the locally convex topology generated by seminorms 27

Topologies on (cont.) Theorem. For the left multiplication is continuous in both pointwise-norm topology and restricted pointedwise-norm topologies. 28

Matrix space tensor product Definitions. Let be an o.s. in and be an ultraweakly closed concrete o.s. The right matrix space tensor product is defined by The left matrix space tensor product is defined by 29

Matrix space tensor product Lemma. The map where is completely isometric isomorphism. 30

Matrix space tensor product (cont.) Theorem. The map where is completely isometric isomorphism. 31

Normal Fubini Theorem. Let and be ultraweakly closed o.s’s in and respeectively. Then 32

Normal Fubini Corollary is ultraweakly closed in For von Neumann algebras and 33

Matrix space tensor products lifting Observation. For, an inclusion induces a CB map 34

Matrix space tensor products lifting Theorem. Let and be an u.w. closed concrete o.s. Then such that 35

Matrix space tensor products lifting Definition. For and we define a map as 36

Matrix space tensor products lifting Theorem. The map corresponds to the composition of maps and where and (under the natural isomorphism ). 37

Matrix space tensor products of maps 38

Acknowledgements I would like to thank Prince of Songkla University, THAILAND for financial support during my research and for this trip. Special thanks to Professor Martin Lindsay for his kindness, support and helpful suggestions.

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