We present a systematic construction of environment-based abstract machines from context-sensitive calculi of explicit substitutions, and we illustrate it with ten calculi and machines for applicative order with an abort operation, normal order with generalized reduction and call/cc, the lambda-mu-calculus, delimited continuations, stack inspection, proper tail-recursion, and lazy evaluation. Most of the machines already exist but have been obtained independently and are only indirectly related to the corresponding calculi. All of the calculi are new and they make it possible to directly reason about the execution of the corresponding machines. In connection with the functional correspondence between evaluation functions and abstract machin...
Olivier Danvy and others have shown the syntactic correspondence between reduction semantics (a smal...
AbstractWe present a context-based approach to proving termination of evaluation in reduction semant...
Church's lambda-calculus underlies the syntax (i.e., the form) and the semantics (i.e., the meaning)...
We present a systematic construction of environment-based abstract machines from context-sensitive c...
AbstractWe present a systematic construction of environment-based abstract machines from context-sen...
We materialize the common understanding that calculi with explicit substitutions provide an intermed...
We present an abstract machine and a reduction semantics for the lambda-calculus extended with cont...
AbstractWe present a nondeterministic calculus of closures for the evaluation of λ-calculus, which i...
We bridge the gap between functional evaluators and abstract machines for the lambda-calculus, using...
We extend our correspondence between evaluators and abstract machines from the pure setting of the l...
AbstractThis paper proves several generic variants of context lemmas and thus contributes to improvi...
We present a higher-order call-by-need lambda calculus enriched with constructors, case-expressions,...
We bridge the gap between compositional evaluators and abstract machines for the lambda-calculus, us...
AbstractIn this paper we discuss and compare abstract machines for the lambda-calculus, implementing...
This paper proves several generic variants of context lemmas and thus contributes to improving the t...
Olivier Danvy and others have shown the syntactic correspondence between reduction semantics (a smal...
AbstractWe present a context-based approach to proving termination of evaluation in reduction semant...
Church's lambda-calculus underlies the syntax (i.e., the form) and the semantics (i.e., the meaning)...
We present a systematic construction of environment-based abstract machines from context-sensitive c...
AbstractWe present a systematic construction of environment-based abstract machines from context-sen...
We materialize the common understanding that calculi with explicit substitutions provide an intermed...
We present an abstract machine and a reduction semantics for the lambda-calculus extended with cont...
AbstractWe present a nondeterministic calculus of closures for the evaluation of λ-calculus, which i...
We bridge the gap between functional evaluators and abstract machines for the lambda-calculus, using...
We extend our correspondence between evaluators and abstract machines from the pure setting of the l...
AbstractThis paper proves several generic variants of context lemmas and thus contributes to improvi...
We present a higher-order call-by-need lambda calculus enriched with constructors, case-expressions,...
We bridge the gap between compositional evaluators and abstract machines for the lambda-calculus, us...
AbstractIn this paper we discuss and compare abstract machines for the lambda-calculus, implementing...
This paper proves several generic variants of context lemmas and thus contributes to improving the t...
Olivier Danvy and others have shown the syntactic correspondence between reduction semantics (a smal...
AbstractWe present a context-based approach to proving termination of evaluation in reduction semant...
Church's lambda-calculus underlies the syntax (i.e., the form) and the semantics (i.e., the meaning)...