4,689 research outputs found
On the Properties of Language Classes Defined by Bounded Reaction Automata
Reaction automata are a formal model that has been introduced to investigate
the computing powers of interactive behaviors of biochemical reactions([14]).
Reaction automata are language acceptors with multiset rewriting mechanism
whose basic frameworks are based on reaction systems introduced in [4]. In this
paper we continue the investigation of reaction automata with a focus on the
formal language theoretic properties of subclasses of reaction automata, called
linearbounded reaction automata (LRAs) and exponentially-bounded reaction
automata (ERAs). Besides LRAs, we newly introduce an extended model (denoted by
lambda-LRAs) by allowing lambda-moves in the accepting process of reaction, and
investigate the closure properties of language classes accepted by both LRAs
and lambda-LRAs. Further, we establish new relationships of language classes
accepted by LRAs and by ERAs with the Chomsky hierarchy. The main results
include the following : (i) the class of languages accepted by lambda-LRAs
forms an AFL with additional closure properties, (ii) any recursively
enumerable language can be expressed as a homomorphic image of a language
accepted by an LRA, (iii) the class of languages accepted by ERAs coincides
with the class of context-sensitive languages.Comment: 23 pages with 3 figure
Complete Symmetry in D2L Systems and Cellular Automata
We introduce completely symmetric D2L systems and cellular automata by means of an additional restriction on the corresponding symmetric devices. Then we show that completely symmetric D2L systems and cellular automata are still able to simulate Turing machine computations. As corollaries we obtain new characterizations of the recursively enumerable languages and of some space-bounded complexity classes
P Colony Automata with LL(k)-like Conditions
We investigate the possibility of the deterministic parsing (that is, parsing
without backtracking) of languages characterized by (generalized) P colony automata.
We de ne a class of P colony automata satisfying a property which resembles the LL(k)
property of context-free grammars, and study the possibility of parsing the characterized
languages using a k symbol lookahead, as in the LL(k) parsing method for context-free
languages
Tree transducers, L systems, and two-way machines
A relationship between parallel rewriting systems and two-way machines is investigated. Restrictions on the âcopying powerâ of these devices endow them with rich structuring and give insight into the issues of determinism, parallelism, and copying. Among the parallel rewriting systems considered are the top-down tree transducer; the generalized syntax-directed translation scheme and the ETOL system, and among the two-way machines are the tree-walking automaton, the two-way finite-state transducer, and (generalizations of) the one-way checking stack automaton. The. relationship of these devices to macro grammars is also considered. An effort is made .to provide a systematic survey of a number of existing results
Equality languages and fixed point languages
This paper considers equality languages and fixed-point languages of homomorphisms and deterministic gsm mappings. It provides some basic properties of these classes of languages. We introduce a new subclass of dgsm mappings, the so-called symmetric dgsm mappings. We prove that (unlike for arbitrary dgsm mappings) their fixed-point languages are regular but not effectively obtainable. This result has various consequences. In particular we strengthen a result from Ehrenfeucht, A., and Rozenberg, G. [(1978), Theor. Comp. Sci. 7, 169â184] by pointing out a class of homomorphisms which includes elementary homomorphisms but still has regular equality languages. Also we show that the result from Herman, G. T., and Walker, A. [(1976), Theor. Comp. Sci. 2, 115â130] that fixed-point languages of DIL mappings are regular, is not effective
Finite Computational Structures and Implementations
What is computable with limited resources? How can we verify the correctness
of computations? How to measure computational power with precision? Despite the
immense scientific and engineering progress in computing, we still have only
partial answers to these questions. In order to make these problems more
precise, we describe an abstract algebraic definition of classical computation,
generalizing traditional models to semigroups. The mathematical abstraction
also allows the investigation of different computing paradigms (e.g. cellular
automata, reversible computing) in the same framework. Here we summarize the
main questions and recent results of the research of finite computation.Comment: 12 pages, 3 figures, will be presented at CANDAR'16 and final version
published by IEEE Computer Societ
MSO definable string transductions and two-way finite state transducers
String transductions that are definable in monadic second-order (mso) logic
(without the use of parameters) are exactly those realized by deterministic
two-way finite state transducers. Nondeterministic mso definable string
transductions (i.e., those definable with the use of parameters) correspond to
compositions of two nondeterministic two-way finite state transducers that have
the finite visit property. Both families of mso definable string transductions
are characterized in terms of Hennie machines, i.e., two-way finite state
transducers with the finite visit property that are allowed to rewrite their
input tape.Comment: 63 pages, LaTeX2e. Extended abstract presented at 26-th ICALP, 199
Multipass automata and group word problems
We introduce the notion of multipass automata as a generalization of pushdown
automata and study the classes of languages accepted by such machines. The
class of languages accepted by deterministic multipass automata is exactly the
Boolean closure of the class of deterministic context-free languages while the
class of languages accepted by nondeterministic multipass automata is exactly
the class of poly-context-free languages, that is, languages which are the
intersection of finitely many context-free languages. We illustrate the use of
these automata by studying groups whose word problems are in the above classes
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