AbstractWe characterize the class of problems accepted by a class of program schemes with arrays, NPSA, as the class of problems defined by the sentences of a logic formed by extending first-order logic with a particular uniform (or vectorized) sequence of Lindström quantifiers. A simple extension of a known result thus enables us to prove that our logic, and consequently our class of program schemes, has a zero-one law. However, we use another existing result to show that there are problems definable in a basic fragment of our logic, and so also accepted by basic program schemes, which are not definable in bounded-variable infinitary logic. As a consequence, the class of problems NPSA is not contained in the class of problems defined by th...
We develop theory concerning non-uniform complexity in a setting in which the notion of single-pass ...
We consider extensions of first order logic (FO) and least fixed point logic (LFP) with generalized ...
We make explicit a connection between the “unwind property” and first-order logics of programs. Usin...
We characterize the class of problems accepted by a class of program schemes with arrays, NPSA, as t...
AbstractWe characterize the class of problems accepted by a class of program schemes with arrays, NP...
We examine two different classes of program schemes involving arrays, one class, NPSA(1), allowing a...
We study a class of program schemes, NPSB, in which, aside from basic assignments, non-deterministic...
We begin by proving that the class of problems accepted by the program schemes of NPS is exactly the...
It is proved that no logic of programs with unbounded memory is reducible to a bounded memory progra...
We study a class of non-deterministic program schemes with while loops: firstly, augmented with a pr...
We continue the study of the expressive power of certain classes of program schemes on finite struct...
AbstractWe prove that the operator ⊥ (“during”) is not expressible in first-order logics of programs...
We consider extensions of first order logic (FO) and fixed point logic (FP) by means of generalized ...
We show that strict deterministic propositional dynamic logic with intersection is highly undecidabl...
We propose a method for proving first order properties of constraint logic programs which manipulate...
We develop theory concerning non-uniform complexity in a setting in which the notion of single-pass ...
We consider extensions of first order logic (FO) and least fixed point logic (LFP) with generalized ...
We make explicit a connection between the “unwind property” and first-order logics of programs. Usin...
We characterize the class of problems accepted by a class of program schemes with arrays, NPSA, as t...
AbstractWe characterize the class of problems accepted by a class of program schemes with arrays, NP...
We examine two different classes of program schemes involving arrays, one class, NPSA(1), allowing a...
We study a class of program schemes, NPSB, in which, aside from basic assignments, non-deterministic...
We begin by proving that the class of problems accepted by the program schemes of NPS is exactly the...
It is proved that no logic of programs with unbounded memory is reducible to a bounded memory progra...
We study a class of non-deterministic program schemes with while loops: firstly, augmented with a pr...
We continue the study of the expressive power of certain classes of program schemes on finite struct...
AbstractWe prove that the operator ⊥ (“during”) is not expressible in first-order logics of programs...
We consider extensions of first order logic (FO) and fixed point logic (FP) by means of generalized ...
We show that strict deterministic propositional dynamic logic with intersection is highly undecidabl...
We propose a method for proving first order properties of constraint logic programs which manipulate...
We develop theory concerning non-uniform complexity in a setting in which the notion of single-pass ...
We consider extensions of first order logic (FO) and least fixed point logic (LFP) with generalized ...
We make explicit a connection between the “unwind property” and first-order logics of programs. Usin...