De Computability.
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| - | This informal reading group aims at providing a forum for exchange of ideas on a certain number of topics, in particular:
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| - | * computability theory
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| - | * models of computation
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| - | * algorithmic complexity
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| - | * algorithmic randomness (Kolmogorov complexity, Martin Löf randomness, etc)
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| - | * pseudo-randomness theory (expanders, extractors, etc)
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| - | * any topic related to the one of the above
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| - | As opposed to a "standard" seminar, speakers are encouraged to present one or several theorems (with their proofs!), a classical technique, an important idea (not necessarily from their own work) rather than give an overview of their last technical paper. There is not strict time limit for talks, even though it would be preferable to not go over the hour and a half (if a talk is taking too long, it can be continued the following week). A shorter talk can also be followed by a discussion between participants, either on the topic of the talk or on any other topic.
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| - | =Time and place=
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| - | The reading group takes place on Wednesdays starting from 4pm, in room 5C12 (5th floor) at 175 rue du Chevaleret, 75013 Paris ([http://www.liafa.jussieu.fr/web9/acces/acces_fr.php click here for directions LIAFA]). | + | |
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| - | =Upcoming talks=
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| - | * '''November 17, 2010: The entropy compression argument, Lovasz local lemma and Kolmogorov complexity - Infinite Case'''
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| - | :'''''Speaker: Alexander Shen (LIF, Marseille)'''''
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| - | :One of the classical applications of Kolmogorov comlexity to computational complexity and algorithms is the so called ''incompressibility method''. This method is useful to prove lower bounds on the complexity of a problem by considering an instance of high Kolmogorov complexity and argue that for that particular instance the problem is "hard". In this talk, we present a recent new application of Kolmogorov complexity: the ''entropy reduction method'' due to Moser and Tardos. This technique is used to prove the termination of a randomized algorithm when the algorithm is "reversible" in a weak sense. This powerful technique can be applied to prove a constructive version of Lovasz local lemma (a central theorem in combinatorics), which we will discuss if time permits.
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| - | =Recent talks=
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| - | *[[Recent talks |Click here for the recent talks.]]
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| - | =Contact=
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| - | * [http://www.liafa.jussieu.fr/~lbienven/ Laurent Bienvenu]
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| - | * [http://www.liafa.jussieu.fr/~taveneaux/ Antoine Taveneaux]
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Version actuelle en date du 7 octobre 2011 à 12:49
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