March 27, 2014, 1115, room 105: Cristobal Rodriguez (Paris 7):
Fragments of the paper "On isomorphisms of Banach spaces of continuous functions" (To appear in Israel J. Math)
by G. Plebanek will be presented. The paper contains new insights into the structure of the above isomorphisms
and embeddings of C(K)s.
March 20, 2014, 1115, room 408: Leandro Candido (USP/IM PAN):
A Banach-Stone type theorem by Cambern will be presented with the proof.
It says that if T is an ismorphism between C(K) and C(L) such that
||T||||T-1||<2, then K and L are homeomorphic.
March 6, 13. 2014, 1115, room 105,
Damian Sobota (WCMCS/PWr)
During the next two meetings of the seminar I would like to present the relations between the Grothendieck property of Banach spaces and the Nikodym property of non-sigma-complete Boolean algebras. A Banach space X has the Grothendieck property (G) if every weak* null sequence in X* is weakly null. A Boolean algebra B has the Nikodym property (N) if every pointwise bounded sequence of finitely additive measures on B is uniformly bounded.
The plan is as follows. First, I will show what properties of Banach spaces are implied by (G) and what the most interesting examples of such spaces are. Especially, I focus on Banach spaces C(K) of continuous functions over some compact Hausdorff space K. The spaces with (G) in such a case naturally appear when K is a Stone space of a Boolean algebra with some additional property. E.g. the Grothendieck theorem states that C(K) has (G) when K is extremely disconnected, i.e. the Boolean algebra Clopen(K) of clopen subsets of K is complete. In case Clopen(K) is not complete, for C(K) to be Grothendieck we need some separation or interpolation properties of Clopen(K), e.g. Haydon's Subsequential Separation Property or Freniche's Subsequential Interpolation Property.
During the second lecture I will talk why the Nikodym property of Boolean algebras is important. I will show what separation or completeness properties of Boolean algebras cause them having (N). Finally, I plan to prove that the algebra of Jordan-measurable subsets of [0,1] has (N) but its C(K) lacks (G) (the result due to Schachermayer). This was the first example of such an algebra; now thanks to Graves and Wheeler we know more of them. However little is still known in the case of the opposite issue, i.e. whether there exists a Boolean algebra without (N) but such that its C(K) has (G) -- the only positive result in this matter is a difficult construction under CH due to Talagrand.
Talks in the first semester of 2013-14.
Talks in the second semester of 2012-13.
Talks in the first semester of 2012-13.
Talks in the second semester of 2011-12.
Talks in the first semester of 2011-12.