We prove that ground reducibility is EXPTIME-complete in the general case. EXPTIME-hardness is proved by encoding the computations of an alternating Turing machine whose space is polynomially bounded. It is more difficult to show that ground reducibility belongs to DEXPTIME. We associate first an automaton with disequality constraints AR;t to a rewrite system R and a term t. This automaton is deterministic and accepts a term u if and only if t is not ground reducible by R. The number of states of AR;t is O(2 kRk\Thetaktk ) and the size of the constraints are polynomial in the size of R; t. Then we prove some new pumping lemmas, using a total ordering on the computations of the automaton. Thanks to these lemmas, we can give an upper b...
AbstractA partial information algorithm for a language A computes for m input words (x1,…,xm) a set ...
A set A is autoreducible if one can compute, for all x, the value A(x) by querying A only at places ...
Register automata are one of the most studied automata models over infinite alphabets. The complexit...
AbstractWe prove that ground reducibility is EXPTIME-complete in the general case. EXPTIME-hardness ...
International audienceWe prove that ground reducibility is EXPTIME-complete in the general case. EXP...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
We demonstrate the applicability of the polynomial degree bound technique to notions such as the non...
Abstract. We give an abstract account of resource-bounded reducibilities as exemplified by the polyn...
Given a countable algebraic structure B with no degree we find sufficient conditions for the existen...
The fully enriched μ-calculus is the extension of the propositionalμ-calculus with inverse pro...
The fully enriched μ-calculus is the extension of the propositional μ-calculus with inverse programs...
A set is autoreducible if it can be reduced to itself by a Turing machine that does not ask its own ...
We establish the first polynomial time-space lower bounds for satisfiability on general models of co...
<正> Let A, B are sets. We can define the reducibility ≤_T~h by A≤_T~hB iff there-exists a poly...
We consider rewriting of a regular language with a left-linear term rewriting system. We showtwo com...
AbstractA partial information algorithm for a language A computes for m input words (x1,…,xm) a set ...
A set A is autoreducible if one can compute, for all x, the value A(x) by querying A only at places ...
Register automata are one of the most studied automata models over infinite alphabets. The complexit...
AbstractWe prove that ground reducibility is EXPTIME-complete in the general case. EXPTIME-hardness ...
International audienceWe prove that ground reducibility is EXPTIME-complete in the general case. EXP...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
We demonstrate the applicability of the polynomial degree bound technique to notions such as the non...
Abstract. We give an abstract account of resource-bounded reducibilities as exemplified by the polyn...
Given a countable algebraic structure B with no degree we find sufficient conditions for the existen...
The fully enriched μ-calculus is the extension of the propositionalμ-calculus with inverse pro...
The fully enriched μ-calculus is the extension of the propositional μ-calculus with inverse programs...
A set is autoreducible if it can be reduced to itself by a Turing machine that does not ask its own ...
We establish the first polynomial time-space lower bounds for satisfiability on general models of co...
<正> Let A, B are sets. We can define the reducibility ≤_T~h by A≤_T~hB iff there-exists a poly...
We consider rewriting of a regular language with a left-linear term rewriting system. We showtwo com...
AbstractA partial information algorithm for a language A computes for m input words (x1,…,xm) a set ...
A set A is autoreducible if one can compute, for all x, the value A(x) by querying A only at places ...
Register automata are one of the most studied automata models over infinite alphabets. The complexit...