International audiencePrimitive recursion can be defined on words instead of natural numbers. Up to usual encoding, primitive recursive functions coincide. Working with words allows to address words directly and not through some integer encoding (of exponential size). Considering alphabets with at least two symbols allows to relate simply and naturally to complexity theory. Indeed, the polynomial-time complexity class (as well as and exponential time) corresponds to delayed and dynamical evaluation with a polynomial bound on the size of the trace of the computation as a direct acyclic graph.Primitive recursion in the absence of concatenation (or successor for numbers) is investigated. Since only suffixes of an input can be output, computati...
AbstractResults are presented which show precise ways in which recursion rests on very simple comput...
International audienceWhat can be decided or semidecided about a primitive recursive function, given...
Abstract. Recursive analysis is the most classical approach to model and discuss compu-tations over ...
International audiencePrimitive recursion can be defined on words instead of natural numbers. Up to ...
International audienceRecursive analysis was introduced by A. Turing [1936], A. Grzegorczyk [1955], ...
The SAGE Encyclopedia of Human Communication Sciences and DisordersRecursion is a mathematical princ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Considering the Blum, Shub, and Smale computational model for real numbers, extended by Poizat to ge...
AbstractIn the past few years, there has been a growing interest in the application of proof-theoret...
Abstract. We introduce the concepts of complex and autocomplex sets, where a set A is complex if the...
The purpose of this thesis is to give a "foundational" characterization of some common com...
We provide a resource-free characterization of register machines that computes their output within p...
AbstractConsidering the Blum, Shub, and Smale computational model for real numbers, extended by Poiz...
AbstractRecursive analysis, the theory of computation of functions on real numbers, has been studied...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbi...
AbstractResults are presented which show precise ways in which recursion rests on very simple comput...
International audienceWhat can be decided or semidecided about a primitive recursive function, given...
Abstract. Recursive analysis is the most classical approach to model and discuss compu-tations over ...
International audiencePrimitive recursion can be defined on words instead of natural numbers. Up to ...
International audienceRecursive analysis was introduced by A. Turing [1936], A. Grzegorczyk [1955], ...
The SAGE Encyclopedia of Human Communication Sciences and DisordersRecursion is a mathematical princ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Considering the Blum, Shub, and Smale computational model for real numbers, extended by Poizat to ge...
AbstractIn the past few years, there has been a growing interest in the application of proof-theoret...
Abstract. We introduce the concepts of complex and autocomplex sets, where a set A is complex if the...
The purpose of this thesis is to give a "foundational" characterization of some common com...
We provide a resource-free characterization of register machines that computes their output within p...
AbstractConsidering the Blum, Shub, and Smale computational model for real numbers, extended by Poiz...
AbstractRecursive analysis, the theory of computation of functions on real numbers, has been studied...
We define polynomial time computable operator. Our definition generalizes Cook's definition to arbi...
AbstractResults are presented which show precise ways in which recursion rests on very simple comput...
International audienceWhat can be decided or semidecided about a primitive recursive function, given...
Abstract. Recursive analysis is the most classical approach to model and discuss compu-tations over ...