In a recent paper, Girard proposes to use his recent construction of a geometry of interaction in the hyperfinite factor in an innovative way to characterize complexity classes. We begin by giving a detailed explanation of both the choices and the motivations of Girard's definitions. We then provide a complete proof that the complexity class co-NL can be characterized using this new approach. We introduce as a technical tool the non-deterministic pointer machine, a concrete model to computes algorithms. ; Comment: To appear in Mathematical Structures in Computer Scienc
My research interest lies in complexity theory, with an emphasis on its interaction with group the-o...
Continuous complexity theory gets its name from the model of mathematical computation on which it is...
In this note we propose a model for unbounded nondeterministic computation which provides a very nat...
In a recent paper (Girard 2011b), Girard uses the geometry of interaction in the hyperfinite factor ...
International audienceIn a recent paper, Girard proposes to use his recent construction of a geometr...
AbstractIn this primarily expository article, I describe geometric approaches to variants of P versu...
The most celebrated open problem in theoretical computer science is, undoubtedly, the problem of whe...
The formal study of algorithms arises with the definition of the Turing machine in a context which i...
Motivated by the question of how to define an analog of interactive proofs in the setting of logarit...
In a recent paper, the author has shown how Interaction Graphs models for linear logic can be used t...
We explain the essence of K. Mulmuley and M. Sohoni, \Geometric Complexity Theory I: An Approach to ...
This material was written for Chapter 29 of the CRC Handbook of Algorithms and Theory of Computation...
Investigating Logics for Feasible Computation The most celebrated open problem in theoretical comput...
(eng) Model theory has lately become a domain of interest to computer scientists. The reason is that...
Contains fulltext : 72913.pdf (publisher's version ) (Closed access)Leech, Maresch...
My research interest lies in complexity theory, with an emphasis on its interaction with group the-o...
Continuous complexity theory gets its name from the model of mathematical computation on which it is...
In this note we propose a model for unbounded nondeterministic computation which provides a very nat...
In a recent paper (Girard 2011b), Girard uses the geometry of interaction in the hyperfinite factor ...
International audienceIn a recent paper, Girard proposes to use his recent construction of a geometr...
AbstractIn this primarily expository article, I describe geometric approaches to variants of P versu...
The most celebrated open problem in theoretical computer science is, undoubtedly, the problem of whe...
The formal study of algorithms arises with the definition of the Turing machine in a context which i...
Motivated by the question of how to define an analog of interactive proofs in the setting of logarit...
In a recent paper, the author has shown how Interaction Graphs models for linear logic can be used t...
We explain the essence of K. Mulmuley and M. Sohoni, \Geometric Complexity Theory I: An Approach to ...
This material was written for Chapter 29 of the CRC Handbook of Algorithms and Theory of Computation...
Investigating Logics for Feasible Computation The most celebrated open problem in theoretical comput...
(eng) Model theory has lately become a domain of interest to computer scientists. The reason is that...
Contains fulltext : 72913.pdf (publisher's version ) (Closed access)Leech, Maresch...
My research interest lies in complexity theory, with an emphasis on its interaction with group the-o...
Continuous complexity theory gets its name from the model of mathematical computation on which it is...
In this note we propose a model for unbounded nondeterministic computation which provides a very nat...