Isomorphic embeddings of Banach spaces and universality questions
- Speaker(s)
- Mirna Dzamonja
- Affiliation
- University of East Anglia
- Date
- April 17, 2012, 4:15 p.m.
- Room
- room 4060
- Seminar
- Topology and Set Theory Seminar
Universality questions abound in mathematics. In the most general form they
are formulated as follows: given a class C of objects and a notion of quasi-order <= between them, find a subclass D of smallest cardinality
which has the property that every element of C is <= an element of D. An example of this in the theory of Banach spaces is the search for an
isomorphically or an isometrically universal element in the class of Banach spaces in a given density. There are interesting independence
results in the theory of isomorphically universal Banach spaces (see the work of
Brech and Koszmider) and on the other hand, model theoretic results (Shelah and
Usvyatsob) in the theory of isometrically universal spaces. The latter have the
advantage that in a certain sense they are absolute, specifically, they depend
only on cardinal arithmetic and not on the set-theoretic universe, but a disadvantage that they cannot talk about isomorphism, only about
isometry.
We would like to have means to obtain similar "semi-absolute" results in
the isomorphic theory, and we present some initial results in this
direction.