Tree-Automatic Well-Founded Trees

Martin Huschenbett; Alexander Kartzow; Jiamou Liu; Markus Lohrey

doi:10.2168/LMCS-9(2:10)2013

Logical Methods in Computer Science (Jun 2013)

Tree-Automatic Well-Founded Trees

Martin Huschenbett,
Alexander Kartzow,
Jiamou Liu,
Markus Lohrey

Affiliations

Martin Huschenbett
Alexander Kartzow
Jiamou Liu: ORCiD
Markus Lohrey

DOI: https://doi.org/10.2168/LMCS-9(2:10)2013
Journal volume & issue: Vol. Volume 9, Issue 2

Abstract

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We investigate tree-automatic well-founded trees. Using Delhomme's decomposition technique for tree-automatic structures, we show that the (ordinal) rank of a tree-automatic well-founded tree is strictly below omega^omega. Moreover, we make a step towards proving that the ranks of tree-automatic well-founded partial orders are bounded by omega^omega^omega: we prove this bound for what we call upwards linear partial orders. As an application of our result, we show that the isomorphism problem for tree-automatic well-founded trees is complete for level Delta^0_{omega^omega} of the hyperarithmetical hierarchy with respect to Turing-reductions.

Published in Logical Methods in Computer Science

ISSN: 1860-5974 (Online)
Publisher: Logical Methods in Computer Science e.V.
Country of publisher: Germany
LCC subjects: Philosophy. Psychology. Religion: Logic; Science: Mathematics: Instruments and machines: Electronic computers. Computer science
Website: https://lmcs.episciences.org/

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