skip to main content
Caltech

Logic Seminar

Wednesday, May 1, 2024
12:00pm to 1:00pm
Add to Cal
Online Event
Paradoxical decompositions and colouring rules
Robert Simon, Department of Mathematics, London School of Economics and Political Science,

Please note that the time is PST

A colouring rule is a way to colour the points x of a probability space according to the colours of finitely many measures preserving tranformations of x. The rule is paradoxical if the rule can be satisfied a.e. by some colourings, but by none whose inverse images are measurable with respect to any finitely additive extension for which the transformations remain measure preserving. We demonstrate paradoxical colouring rules defined via u.s.c. convex valued correspondences (if the colours b and c are acceptable by the rule than so are all convex combinations of b and c). This connects measure theoretic paradoxes to problems of optimization and shows that there is a continuous mapping from bounded group-invariant measurable functions to itself that doesn't have a fixed point (but does has a fixed point in non-measurable functions).

For more information, please contact Math Dept. by phone at 626-395-4335 or by email at [email protected].