14,843 research outputs found
Focusing in Asynchronous Games
Game semantics provides an interactive point of view on proofs, which enables
one to describe precisely their dynamical behavior during cut elimination, by
considering formulas as games on which proofs induce strategies. We are
specifically interested here in relating two such semantics of linear logic, of
very different flavor, which both take in account concurrent features of the
proofs: asynchronous games and concurrent games. Interestingly, we show that
associating a concurrent strategy to an asynchronous strategy can be seen as a
semantical counterpart of the focusing property of linear logic
Towards Efficient Abstractions for Concurrent Consensus
Consensus is an often occurring problem in concurrent and distributed
programming. We present a programming language with simple semantics and
build-in support for consensus in the form of communicating transactions. We
motivate the need for such a construct with a characteristic example of
generalized consensus which can be naturally encoded in our language. We then
focus on the challenges in achieving an implementation that can efficiently run
such programs. We setup an architecture to evaluate different implementation
alternatives and use it to experimentally evaluate runtime heuristics. This is
the basis for a research project on realistic programming language support for
consensus.Comment: 15 pages, 5 figures, symposium: TFP 201
Acyclic Solos and Differential Interaction Nets
We present a restriction of the solos calculus which is stable under
reduction and expressive enough to contain an encoding of the pi-calculus. As a
consequence, it is shown that equalizing names that are already equal is not
required by the encoding of the pi-calculus. In particular, the induced solo
diagrams bear an acyclicity property that induces a faithful encoding into
differential interaction nets. This gives a (new) proof that differential
interaction nets are expressive enough to contain an encoding of the
pi-calculus. All this is worked out in the case of finitary (replication free)
systems without sum, match nor mismatch
On conservativity of concurrent Haskell
The calculus CHF models Concurrent Haskell extended by concurrent, implicit futures. It is a process calculus with concurrent threads, monadic concurrent evaluation, and includes a pure functional lambda-calculus which comprises data constructors, case-expressions, letrec-expressions, and Haskellâs seq. Futures can be implemented in Concurrent Haskell using the primitive unsafeInterleaveIO, which is available in most implementations of Haskell. Our main result is conservativity of CHF, that is, all equivalences of pure functional expressions are also valid in CHF. This implies that compiler optimizations and transformations from pure Haskell remain valid in Concurrent Haskell even if it is extended by futures. We also show that this is no longer valid if Concurrent Haskell is extended by the arbitrary use of unsafeInterleaveIO
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