The notion of a real-valued function is central to mathematics, computer science, and many other scientific fields. Despite this importance, there are hardly any positive results on decision procedures for predicate logical theories that reason about real-valued functions. This paper defines a first-order predicate language for reasoning about multi-dimensional smooth real-valued functions and their derivatives, and demonstrates that - despite the obvious undecidability barriers - certain positive decidability results for such a language are indeed possible
We initiate the study of regular real analysis, or the analysis of real functions that can be encode...
We present a formal first-order theory of arbitrary dimensional real vector spaces in ACL2(r). This ...
International audienceThis paper describes a formalization of discrete real closed fields in the Coq...
AbstractIn this paper we address the decision problem for a fragment of unquantified formulae of rea...
AbstractThis paper studies decidable fragments of predicate calculus. We will focus on the structure...
This paper studies decidable fragments of the predicate calculus. We will focus on the structure of ...
We develop a theory of higher-order exact real number computation based on Scott domain theory. Our ...
AbstractWe describe a decision procedure for what we call direct predicate calculus. This fragment o...
The aim of these lectures is to give a clear and explicit overview of the most important decidable a...
We survey two series of results concerning the decidability of fragments of Tarksi's elementary alge...
Real-valued logics underlie an increasing number of neuro-symbolic approaches, though typically thei...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
Colloque avec actes et comité de lecture. internationale.International audienceThis paper presents a...
We present a framework for validated numerical computations with real functions. The framework is ba...
Given any collection F of computable functions over the reals, we show that there exists an algorith...
We initiate the study of regular real analysis, or the analysis of real functions that can be encode...
We present a formal first-order theory of arbitrary dimensional real vector spaces in ACL2(r). This ...
International audienceThis paper describes a formalization of discrete real closed fields in the Coq...
AbstractIn this paper we address the decision problem for a fragment of unquantified formulae of rea...
AbstractThis paper studies decidable fragments of predicate calculus. We will focus on the structure...
This paper studies decidable fragments of the predicate calculus. We will focus on the structure of ...
We develop a theory of higher-order exact real number computation based on Scott domain theory. Our ...
AbstractWe describe a decision procedure for what we call direct predicate calculus. This fragment o...
The aim of these lectures is to give a clear and explicit overview of the most important decidable a...
We survey two series of results concerning the decidability of fragments of Tarksi's elementary alge...
Real-valued logics underlie an increasing number of neuro-symbolic approaches, though typically thei...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
Colloque avec actes et comité de lecture. internationale.International audienceThis paper presents a...
We present a framework for validated numerical computations with real functions. The framework is ba...
Given any collection F of computable functions over the reals, we show that there exists an algorith...
We initiate the study of regular real analysis, or the analysis of real functions that can be encode...
We present a formal first-order theory of arbitrary dimensional real vector spaces in ACL2(r). This ...
International audienceThis paper describes a formalization of discrete real closed fields in the Coq...