AbstractThe process of proving some mathematical theorems can be greatly reduced by relying on numerically-intensive computations with a certified arithmetic. This article presents a formalization of floating-point arithmetic that makes it possible to efficiently compute inside the proofs of the Coq system. This certified library is a multi-radix and multi-precision implementation free from underflow and overflow. It provides the basic arithmetic operators and a few elementary functions
International audienceFloating-point numbers are limited both in range and in precision, yet they ar...
Some mathematical proofs involve intensive computations, for instance: the four-color theorem, Hales...
Abstract. Floating point operations are fast, but require continuous ef-fort on the part of the user...
International audienceThe process of proving some mathematical theorems can be greatly reduced by re...
International audienceFloating-point arithmetic is a well-known and extremely efficient way of perfo...
International audienceFloating-point arithmetic is ubiquitous in modern computing, as it is the tool...
Several formalizations of floating-point arithmetic have been designed for the Coq system, a generic...
International audienceSome mathematical proofs involve intensive computations, for instance: the fou...
Abstract. In this paper we present a general library to reason about floating-point numbers within t...
International audienceFormal verification of numerical programs is notoriously difficult. On the one...
International audienceFloating-point numbers are limited both in range and in precision, yet they ar...
Some mathematical proofs involve intensive computations, for instance: the four-color theorem, Hales...
Abstract. Floating point operations are fast, but require continuous ef-fort on the part of the user...
International audienceThe process of proving some mathematical theorems can be greatly reduced by re...
International audienceFloating-point arithmetic is a well-known and extremely efficient way of perfo...
International audienceFloating-point arithmetic is ubiquitous in modern computing, as it is the tool...
Several formalizations of floating-point arithmetic have been designed for the Coq system, a generic...
International audienceSome mathematical proofs involve intensive computations, for instance: the fou...
Abstract. In this paper we present a general library to reason about floating-point numbers within t...
International audienceFormal verification of numerical programs is notoriously difficult. On the one...
International audienceFloating-point numbers are limited both in range and in precision, yet they ar...
Some mathematical proofs involve intensive computations, for instance: the four-color theorem, Hales...
Abstract. Floating point operations are fast, but require continuous ef-fort on the part of the user...