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Publications

Publications by Renato Jorge Neves

2023

The syntactic side of autonomous categories enriched over generalised metric spaces

Authors
Dahlqvist, F; Neves, R;

Publication
Log. Methods Comput. Sci.

Abstract

2021

An Internal Language for Categories Enriched over Generalised Metric Spaces

Authors
Dahlqvist, F; Neves, R;

Publication
CoRR

Abstract

2019

An Adequate While-Language for Hybrid Computation

Authors
Goncharov, S; Neves, R;

Publication
CoRR

Abstract

2018

A Semantics for Hybrid Iteration

Authors
Goncharov, S; Jakob, J; Neves, R;

Publication
CoRR

Abstract

2018

Compositional semantics for new paradigms: probabilistic, hybrid and beyond

Authors
Dahlqvist, F; Neves, R;

Publication
CoRR

Abstract

2023

THE SYNTACTIC SIDE OF AUTONOMOUS CATEGORIES ENRICHED OVER GENERALISED METRIC SPACES

Authors
Dahlqvist, F; Neves, R;

Publication
LOGICAL METHODS IN COMPUTER SCIENCE

Abstract
Programs with a continuous state space or that interact with physical processes often require notions of equivalence going beyond the standard binary setting in which equivalence either holds or does not hold. In this paper we explore the idea of equivalence taking values in a quantale V, which covers the cases of (in)equations and (ultra)metric equations among others.Our main result is the introduction of a V-equational deductive system for linear lambda-calculus together with a proof that it is sound and complete. In fact we go further than this, by showing that linear lambda-theories based on this V-equational system form a category equivalent to a category of autonomous categories enriched over 'generalised metric spaces'. If we instantiate this result to inequations, we get an equivalence with autonomous categories enriched over partial orders. In the case of (ultra)metric equations, we get an equivalence with autonomous categories enriched over (ultra)metric spaces. Additionally, we show that this syntax-semantics correspondence extends to the affine setting.We use our results to develop examples of inequational and metric equational systems for higher-order programming in the setting of real-time, probabilistic, and quantum computing.

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