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1st Joint International Meeting between the American Mathematical Society and the New Zealand Mathematical Society
December 12-15, 2007
Victoria University of Wellington
Wellington, New Zealand

Organizers
Peter Donelan (VUW, co-convener), Matt Miller (South Carolina, co-convener), Jeff Cheeger (Courant/NYU), Rod Downey (VUW), Peter Jones (Yale), Vaughan Jones (UC Berkeley), Gaven Martin (Massey, Albany)

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Effective Randomness and Continuous Measures
by
Theodore A Slaman
University of California, Berkeley

In joint work with Jan Reimann, we study the question, "For which reals x does there exist a measure m such that x is random relative to m?” We show that for every nonrecursive x, there is a measure which makes x random without concentrating on x. We give several conditions on x equivalent to there being continuous measure which makes x random. We show that for all but countably many reals x these conditions apply, so there is a continuous measure which makes x random. There is a meta-mathematical aspect of this investigation. As one requires higher arithmetic levels in the degree of randomness, one must make use of more iterates of the power set of the continuum to show that for all but countably many x’s there is a continuous m which makes x random to that degree.

Date received: August 28, 2007

Copyright © 2007 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # catm-39.