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Publicações

Publicações por Sandra Alves

2022

Structural Rules and Algebraic Properties of Intersection Types

Autores
Alves, S; Florido, M;

Publicação
Theoretical Aspects of Computing - ICTAC 2022 - 19th International Colloquium, Tbilisi, Georgia, September 27-29, 2022, Proceedings

Abstract
In this paper we define several notions of term expansion, used to define terms with less sharing, but with the same computational properties of terms typable in an intersection type system. Expansion relates terms typed by associative, commutative and idempotent intersections with terms typed in the Curry type system and the relevant type system; terms typed by non-idempotent intersections with terms typed in the affine and linear type systems; and terms typed by non-idempotent and non-commutative intersections with terms typed in an ordered type system. © 2022, The Author(s), under exclusive license to Springer Nature Switzerland AG.

2012

Proceedings 2nd International Workshop on Linearity, LINEARITY 2012, Tallinn, Estonia, 1 April 2012

Autores
Alves, S; Mackie, I;

Publicação
LINEARITY

Abstract

2002

On the Relation between Rank 2 Intersection Types and Simple Types

Autores
Alves, S; Florido, M;

Publicação
AGP 2002: Proceedings of the Joint Conference on Declarative Programming, APPIA-GULP-PRODE, Madrid, Spain, September 16-18, 2002.

Abstract

2010

Linear Recursion

Autores
Alves, Sandra; Fernández, Maribel; Florido, Mario; Mackie, Ian;

Publicação
CoRR

Abstract

2011

A new graphical calculus of proofs

Autores
Alves, S; Fernández, M; Mackie, I;

Publicação
Proceedings 6th International Workshop on Computing with Terms and Graphs, TERMGRAPH 2011, Saarbrücken, Germany, 2nd April 2011.

Abstract

2010

Godel's system T revisited

Autores
Alves, S; Fernandez, M; Florido, M; Mackie, I;

Publicação
THEORETICAL COMPUTER SCIENCE

Abstract
The linear lambda calculus, where variables are restricted to occur in terms exactly once, has a very weak expressive power: in particular, all functions terminate in linear time. In this paper we consider a simple extension with natural numbers and a restricted iterator: only closed linear functions can be iterated. We show properties of this linear version of Godel's T using a closed reduction strategy, and study the class of functions that can be represented. Surprisingly, this linear calculus offers a huge increase in expressive power over previous linear versions of T, which are 'closed at construction' rather than 'closed at reduction'. We show that a linear T with closed reduction is as powerful as T.

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