News
22 Apr, 2016. The slide file was uploaded
Title
Berry’s paradox
Type
Freshman seminar at math department of Meiji University
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Slide in Japanese
Berry’s paradox
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Random numbers
News
22 Apr, 2016. The slide file was uploaded
Title
Random numbers
Type
A talk at a high school
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Slide (in Japanese)
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Can one compute a more random set uniformly?
News
24 Mar, 2016. The slide file was uploaded
Title
Can one compute a more random set uniformly?
Type
A talk at a meeting of Mathematical Society of Japan
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mathsoc
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An Introduction to statistics
News
24 Mar, 2016. The slide file was uploaded
Title
An Introduction to statistics
Type
A talk to junior-high students
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junior
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Randomness of randomness deficiency
News
26 Feb, 2016. The slide file was uploaded
Title
Randomness of randomness deficiency
Type
A talk in a seminar with Suzuki lab
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slide
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Randomness notions in Muchnik and Medvedev degrees
News
26 Feb, 2016. The slide file was uploaded
Title
Randomness notions in Muchnik and Medvedev degrees
Type
A talk in Dagstuhl seminar on “Computability Theory”
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slide
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Coherence of reducibilities with randomness notions
News
1 Feb 2016, accepted by TOCS
Title
Coherence of reducibilities with randomness notions
Type
Full paper
Journal
TOCS, post proceedings of CCR2016
Abstract
Loosely speaking, when $A$ is “more random” than $B$ and $B$ is “random”,
then $A$ should be random.
The theory of algorithmic randomness has some formulations of “random” sets
and “more random” sets.
In this paper, we study which pairs $(R,r)$ of randomness notions $R$
and reducibilities $r$ have the follwing property:
if $A$ is $r$-reducible to $B$ and $A$ is $R$-random,
then $B$ should be $R$-random.
The answer depends on the notions $R$ and $r$.
The implications hold for most pairs, but not for some.
We also give characterizations of $n$-randomness via complexity.
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preprint
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A way to judge using probability
News
13 Dec, 2016 the slide file was uploaded
Title
A way to judge using probability
Type
A lecture in a high school
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slide in Japanese
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Using Almost-Everywhere Theorems from Analysis to Study Randomness
News
10 Oct 2016, published online
29 Feb 2016, Accepted by BSL
May 2015, Resubmitted.
3 Nov 2014. Submitted
Title
Using Almost-Everywhere Theorems from Analysis to Study Randomness
(with Jing Zhang and Andre Nies)
Type
Full paper
Journal
The Bulletin of Symbolic Logic, Volume 22, Issue 3
September 2016, pp. 305-331
arXiv
The latest version is here.
Abstract
We study algorithmic randomness notions via effective versions of almost-everywhere theorems from analysis and ergodic theory. The effectivization is in terms of objects described by a computably enumerable set, such as lower semicomputable functions. The corresponding randomness notions are slightly stronger than Martin-Lo ̈f (ML) randomness. We establish several equivalences. Given a ML-random real z, the additional randomness strengths needed for the following are equivalent.
(1) all effectively closed classes containing z have density 1 at z.
(2) all nondecreasing functions with uniformly left-c.e. increments are differentiable at z.
(3) z is a Lebesgue point of each lower semicomputable integrable function.
We also consider convergence of left-c.e. martingales, and convergence in the sense of Birkhoff’s pointwise ergodic theorem. Lastly we study randomness notions for density of $\Pi^0_n$ and $\Sigma^1_1$ classes.
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Randomness notions in Muchnik and Medvedev degrees
News
20 Sep, 2016, the slide file was uploaded
Title
Randomness notions in Muchnik and Medvedev degrees
Type
Talk at a meeting of CTFM2016
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