We study lower bounds on space and input head reversals for deterministic, nondeterministic, and alternating Turing machines accepting nonregular languages. Three notions of space, namely strong, middle, weak are considered, and another notion, called accept, is introduced. In all cases, we obtain tight lower bounds. Moreover, we show that, while for determinism and nondeterminism such lower bounds are optimal even with respect to unary languages, for alternation optimal lower bounds for unary languages turn out to be strictly higher than those for languages over alphabets with two or more symbols
AbstractThis paper investigates some aspects of the accepting powers of deterministic, nondeterminis...
In [6] it was shown that shuffle languages are contained in one-way-NSPACE(log n) and in P. In this ...
The complexity measure under consideration is SPACE x REVERSALS for Turing machines that are able to...
We study lower bounds on space and input head reversals for deterministic, nondeterministic, and alt...
In this paper, simultaneous lower bounds on space and input head reversals for deterministic, nondet...
We show that one-way Π2-alternating Turing machines cannot accept unary nonregular languages in o(lo...
We show that, for any \u3f5 > 0, there exists a language accepted in strong \u3f5 log n space by a 2...
We prove a tight log n lower bound on middle space for one-way alternating Turing machines that acce...
In this paper we prove a tight log n lower bound on the product of space and input head inversions f...
In this work we study classes of languages accepted by finitely ambiguous space bounded automata whi...
AbstractThis paper investigates the accepting powers of nondeterministic and alternating 1-inkdot Tu...
AbstractWhether or not there is a difference of the power among alternating Turing machines with a b...
In 1965 Hennie proved that one-tape deterministic Turing machines working in linear time are equival...
Languages accepted by alternating auxiliary pushdown automata using simultaneously a(n) alternations...
In this paper, we consider Turing machines having simultaneous bounds on working space s(n), input h...
AbstractThis paper investigates some aspects of the accepting powers of deterministic, nondeterminis...
In [6] it was shown that shuffle languages are contained in one-way-NSPACE(log n) and in P. In this ...
The complexity measure under consideration is SPACE x REVERSALS for Turing machines that are able to...
We study lower bounds on space and input head reversals for deterministic, nondeterministic, and alt...
In this paper, simultaneous lower bounds on space and input head reversals for deterministic, nondet...
We show that one-way Π2-alternating Turing machines cannot accept unary nonregular languages in o(lo...
We show that, for any \u3f5 > 0, there exists a language accepted in strong \u3f5 log n space by a 2...
We prove a tight log n lower bound on middle space for one-way alternating Turing machines that acce...
In this paper we prove a tight log n lower bound on the product of space and input head inversions f...
In this work we study classes of languages accepted by finitely ambiguous space bounded automata whi...
AbstractThis paper investigates the accepting powers of nondeterministic and alternating 1-inkdot Tu...
AbstractWhether or not there is a difference of the power among alternating Turing machines with a b...
In 1965 Hennie proved that one-tape deterministic Turing machines working in linear time are equival...
Languages accepted by alternating auxiliary pushdown automata using simultaneously a(n) alternations...
In this paper, we consider Turing machines having simultaneous bounds on working space s(n), input h...
AbstractThis paper investigates some aspects of the accepting powers of deterministic, nondeterminis...
In [6] it was shown that shuffle languages are contained in one-way-NSPACE(log n) and in P. In this ...
The complexity measure under consideration is SPACE x REVERSALS for Turing machines that are able to...