278 research outputs found

    Trees from Functions as Processes

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    Levy-Longo Trees and Bohm Trees are the best known tree structures on the {\lambda}-calculus. We give general conditions under which an encoding of the {\lambda}-calculus into the {\pi}-calculus is sound and complete with respect to such trees. We apply these conditions to various encodings of the call-by-name {\lambda}-calculus, showing how the two kinds of tree can be obtained by varying the behavioural equivalence adopted in the {\pi}-calculus and/or the encoding

    Session types revisited

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    Session types are a formalism used to model structured communication-based programming. A binary session type describes communication by specifying the type and direction of data exchanged between two parties. When session types and session processes are added to the syntax of standard π-calculus they give rise to additional separate syntactic categories. As a consequence, when new type features are added, there is duplication of effort in the theory: the proofs of properties must be checked both on standard types and on session types. We show that session types are encodable into standard π- types, relying on linear and variant types. Besides being an expressivity result, the encoding (i) removes the above redundancies in the syntax, and (ii) the properties of session types are derived as straightforward corollaries, exploiting the corresponding properties of standard π-types. The robustness of the encoding is tested on a few extensions of session types, including subtyping, polymorphism and higher-order communications

    Separability in the Ambient Logic

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    The \it{Ambient Logic} (AL) has been proposed for expressing properties of process mobility in the calculus of Mobile Ambients (MA), and as a basis for query languages on semistructured data. We study some basic questions concerning the discriminating power of AL, focusing on the equivalence on processes induced by the logic (=L>)(=_L>). As underlying calculi besides MA we consider a subcalculus in which an image-finiteness condition holds and that we prove to be Turing complete. Synchronous variants of these calculi are studied as well. In these calculi, we provide two operational characterisations of =L_=L: a coinductive one (as a form of bisimilarity) and an inductive one (based on structual properties of processes). After showing =L_=L to be stricly finer than barbed congruence, we establish axiomatisations of =L_=L on the subcalculus of MA (both the asynchronous and the synchronous version), enabling us to relate =L_=L to structural congruence. We also present some (un)decidability results that are related to the above separation properties for AL: the undecidability of =L_=L on MA and its decidability on the subcalculus.Comment: logical methods in computer science, 44 page

    A hybrid type system for lock-freedom of mobile processes

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    We propose a type system for lock-freedom in the π-calculus, which guarantees that certain communications will eventually succeed. Distinguishing features of our type system are: it can verify lock-freedom of concurrent programs that have sophisticated recursive communication structures; it can be fully automated; it is hybrid, in that it combines a type system for lock-freedom with local reasoning about deadlockfreedom, termination, and confluence analyses. Moreover, the type system is parameterized by deadlock-freedom/termination/confluence analyses, so that any methods (e.g. type systems and model checking) can be used for those analyses. A lock-freedom analysis tool has been implemented based on the proposed type system, and tested for non-trivial programs

    Games, Mobile Processes, and Functions

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    Long version of a CSL'22 paperInternational audienceWe establish a tight connection between two models of the λ-calculus, namely Milner's encoding into the π-calculus (precisely, the Internal π-calculus), and operational game semantics (OGS). We first investigate the operational correspondence between the behaviours of the encoding provided by π and OGS. We do so for various LTSs: the standard LTS for π and a new 'concurrent' LTS for OGS; an 'output-prioritised' LTS for π and the standard alternating LTS for OGS. We then show that the equivalences induced on λ-terms by all these LTSs (for π and OGS) coincide. These connections allow us to transfer results and techniques between π and OGS. In particular we import up-to techniques from π onto OGS and we derive congruence and compositionality results for OGS from those of π. The study is illustrated for call-by-value; similar results hold for call-by-name

    Unique Solutions of Contractions, CCS, and their HOL Formalisation

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    The unique solution of contractions is a proof technique for bisimilarity that overcomes certain syntactic constraints of Milner's "unique solution of equations" technique. The paper presents an overview of a rather comprehensive formalisation of the core of the theory of CCS in the HOL theorem prover (HOL4), with a focus towards the theory of unique solutions of contractions. (The formalisation consists of about 20,000 lines of proof scripts in Standard ML.) Some refinements of the theory itself are obtained. In particular we remove the constraints on summation, which must be weakly-guarded, by moving to rooted contraction, that is, the coarsest precongruence contained in the contraction preorder.Comment: In Proceedings EXPRESS/SOS 2018, arXiv:1808.0807

    Expressing mobility in process algebras: first-order and higher-order paradigms

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    We study mobile systems, i.e. systems with a dynamically changing communication topology, from a process algebras point of view. Mobility can be introduced in process algebras by allowing names or terms to be transmitted. We distinguish these two approaches as first-order and higher-order. The major target of the thesis is the comparison between them. The prototypical calculus in the first-order paradigm is the π-calculus. By generalising its sort discipline we derive an w-order extension called Higher-Order π-calculus (HOπ). We show that such an extension does not add expressiveness to the π-calculus: Higher-order processes can be faithfully compiled down to first-order, and respecting the behavioural equivalence we adopted in the calculi. Such an equivalence is based on the notion of bisimulation, a fundamental concept of process algebras. Unfortunately, the standard definition of bisimulation is unsatisfactory in a higher-order calculus because it is over-discriminating. To overcome the problem, we propose barbed bisimulation. Its advantage is that it can be defined uniformly in different calculi because it only requires that the calculus possesses an interaction or reduction relation. As a test for barbed bisimulation, we show that in CCS and π-calculus, it allows us to recover the familiar bisimulation-based equivalences. We also give simpler characterisations of the equivalences utilised in HOπ. For this we exploit a special kind of agents called triggers, with which it is possible to reason fairly efficiently in a higher-order calculus notwithstanding the complexity of its transitions. Finally, we use the compilation from HOπ to π-calculus to investigate Milner'

    Magnetic resonance fingerprinting con reti neurali a valori complessi

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    In questo documento cerco un metodo per migliorare le prestazioni del MRF (Magnetic Resonance Fingerprinting), una tecnica di risonanza magnetica quantitativa. Il problema è quello di diminuire il tempo di calcolo necessario per determinare i parametri tissutali relativi alla risonanza magnetica effettuata. Il metodo proposto è quello dell'utilizzo di reti neurali a valori complessi con input il segnale di risonanza magnetica e con output i valori relativi ai parametri che si vogliono studiare. Dopo aver chiarito il concetto di risonanza magnetica, di MRF ed i problemi ad essi associati, introduco le reti neurali: l'architettura, la dinamica e l'apprendimento relativi ad esse. Discuto a seguire i problemi relativi all'introduzione dei numeri complessi nel modello di rete neurale e anche i vantaggi che le reti neurali a valori complessi possono portare, non solo rispetto ai metodi tradizionali, ma anche rispetto a reti neurali a valori reali. Analizzo inoltre delle tecniche utili a migliorare la generalizzazione e rendere le reti neurali a valori complessi una soluzione ancora più concreta. Studio quindi i miglioramenti introdotti dagli ensemble di reti neurali e dall'applicazione di funzioni d'attivazione stocastiche, che introducono del rumore gaussiano all'interno del modello
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