News
9 Dec 2013, the slide file was uploaded.
2 Dec 2013, the talk was given.
Title
Variants of Layerwise Computability
Type
ARGENTINA-JAPAN-NEW ZEALAND WORKSHOP, UNIVERSITY OF AUCKLAND
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Variants of Layerwise Computability
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Uniform Kurtz randomness
News
4 Nov 2013, Published online
16 May 2013, Submitted to a Journal
Title
Uniform Kurtz randomness
(with Takayuki Kihara)
Type
Fullpaper
Journal
To appear in Journal of Logic and Computation
doi: 10.1093/logcom/ext054
Abstract
We propose studying uniform Kurtz randomness, which is the uni- form relativization of Kurtz randomness. This notion has more natural properties than the usual relativization. For instance, van Lambalgen’s theorem holds for uniform Kurtz randomness while not for (the usual relativization of) Kurtz randomness. Another advantage is that lowness for uniform Kurtz randomness has many characterizations, such as those via complexity, martingales, Kurtz tt-traceability, and Kurtz dimensional measure.
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An optimal superfarthingale and its convergence over a computable topological space
News
Oct, 2013. Online
Sep 3, 2011. Accepted
June 7, 2011. Submitted
Title
An optimal superfarthingale and its convergence over a computable topological space
Type
Conference paper
Conference
Solomonoff 85th Memorial Conference at Melbourne, Australia.
Lecture Notes in Computer Science
Volume 7070 2013
Algorithmic Probability and Friends. Bayesian Prediction and Artificial Intelligence
Papers from the Ray Solomonoff 85th Memorial Conference, Melbourne, VIC, Australia, November 30 – December 2, 2011
http://link.springer.com/book/10.1007/978-3-642-44958-1
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Abstract
We generalize the convergenece of an optimal semimeasure
to a real probability in algorithmic probability by using game-theoretic
probability theory and the theory of computable topology. Two lemmas
in the proof give as corollary the existence of an optimal test and an
optimal integral test, which are important from the point of view of
algorithmic randomness. We only consider an SCT3 space, where we
can approximate the measure of an open set. Our proof of almost-sure
convergence to the real probability by a superfarthingale indicates why
the convergence in Martin-L¨of sense does not hold.
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Almost uniform weak n-randomness
News
27 Sep 2013, the slide file was uploaded.
Title
Almost uniform weak n-randomness
Type
Eighth International Conference on Computability, Complexity and Randomness (CCR 2013)
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Being a Lebesgue point for integral tests
News
18 Sep 2013, the slide file was uploaded.
Title
Being a Lebesgue point for integral tests
Type
Asian Logic Conference 2013
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Schnorr triviality and its equivalent notions
News
13 Sep 2013, Accepted by TOCS
23 Mar 2013, Submitted
Title
Schnorr triviality and its equivalent notions
Type
Full paper
Journal
To appear in TOCS
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$L^1$-computability and Schnorr randomness
News
26 August 2013, the slide file was uploaded.
Title
$L^1$-computability and Schnorr randomness
Type
In a seminar at Universität der Bundeswehr München
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The emergence of probability from randomness and games
News
22 August 2013, the slides were uploaded.
Title
The emergence of probability from randomness and games
(with A. Takemura)
Type
Invited talk at Modeling Market Dynamics and Equilibrium – New Challenges, New Horizons
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$L^1$-computability, layerwise computability and Solovay reducibility
News
17 July 2013, published
27 Mar 2013, accepted
19 Sep 2012, submitted
Title
L1-computability, layerwise computability and Solovay reducibility
Type
Full paper
Journal
Computability, 2:15-29, 2013.
Abstract
We propose a hierarchy of classes of functions that corresponds to the hierarchy of randomness notions. Each class of functions converges at the corresponding random points. We give various characterizations of the classes, that is, characterizations via integral tests, L1-computability and layerwise computability. Furthermore, the relation among these classes is formulated using Solovay reducibility for lower semicomputable functions.
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