DM-GAA

ISSN 1509-9415 (print version)

ISSN 2084-0373 (electronic version)

https://doi.org/10.7151/dmgaa

Discussiones Mathematicae - General Algebra and Applications

Cite Score: 0.4

SJR: 0.203

SNIP: 0.562

MCQ: 0.12

Index Copernicus: 121.02

Discussiones Mathematicae - General Algebra and Applications

PDF

Discussiones Mathematicae General Algebra and Applications 21(2) (2001)219-227
DOI: https://doi.org/10.7151/dmgaa.1039

TREE TRANSFORMATIONS DEFINED BY HYPERSUBSTITUTIONS

Sr. Arworn

Chiang Mai University, Department of Mathematics
50200 Chiang Mai, Thailand
e-mail:
scmti002@cmu.chiangmai.ac.th

Klaus Denecke

University of Potsdam, Institute of Mathematics
14415 Potsdam, Germany
e-mail:
kdenecke@rz.uni-potsdam.de

Abstract

Tree transducers are systems which transform trees into trees just as automata transform strings into strings. They produce transformations, i.e. sets consisting of pairs of trees where the first components are trees belonging to a first language and the second components belong to a second language. In this paper we consider hypersubstitutions, i.e. mappings which map operation symbols of the first language into terms of the second one and tree transformations defined by such hypersubstitutions. We prove that the set of all tree transformations which are defined by hypersubstitutions of a given type forms a monoid with respect to the composition of binary relations which is isomorphic to the monoid of all hypersubstitutions of this type. We characterize transitivity, reflexivity and symmetry of tree transformations by properties of the corresponding hypersubstitutions. The results will be applied to languages built up by individual variables and one operation symbol of arity n ł 2.

Keywords: hypersubstitution, tree transformation, tree transducer.

2000 Mathematics Subject Classification: 08B15, 08B25.

References

[1] K. Denecke, J. Koppitz and St. Niwczyk, Equational Theories generated by Hypersubstitutions of Type (n), Internat. J. Algebra Comput., to appear.
[2]K. Denecke, D. Lau, R. Pöschel and D. Schweigert, Hyperidentities, Hyperequational classes and clone congruences, Contributions to General Algebra 7 (1991), 97-118.
[3] K. Denecke and S.L. Wismath, The monoid of hypersubstitutions of type (2), Contributions to General Algebra 10 (1998), 109-126.
[4] K. Denecke and S.L. Wismath, Hyperidentities and Clones, Gordon and Breach Sci. Publ., Amsterdam 2000.
[5] F. Gécseg and M. Steinby, Tree Automata, Akadémiai Kiadó, Budapest 1984.
[6] J.W. Thatcher, Tree Automata: an informal survey, p. 143-172 in: ``Currents in the theory of computing", Prentice-Hall, Englewood Cliffs, NJ, 1973.

Received 4 June 2001
Revised 30 November 2001


Close