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Skolem Machines and Geometric Logic.

Authors :
Hutchison, David
Kanade, Takeo
Kittler, Josef
Kleinberg, Jon M.
Mattern, Friedemann
Mitchell, John C.
Naor, Moni
Nierstrasz, Oscar
Pandu Rangan, C.
Steffen, Bernhard
Sudan, Madhu
Terzopoulos, Demetri
Tygar, Doug
Vardi, Moshe Y.
Weikum, Gerhard
Jones, Cliff B.
Liu, Zhiming
Woodcock, Jim
Fisher, John
Bezem, Marc
Source :
Theoretical Aspects of Computing - ICTAC 2007; 2007, p201-215, 15p
Publication Year :
2007

Abstract

Inspired by the wonderful design and implementation of the Prolog language afforded by the Warren Abstract Machine (WAM), this paper describes an extended logical language which can compute larger realms of first-order logic, based upon theories for finitary geometric logic. The paper describes a Geolog language for expressing first-order geometric logic in tidy closed form, a mathematical Skolem Machine that computes the language, and an implementation prototype that intimately mimics the abstract machine, and which also reformulates expensive bottom-up inference into efficient top-down inference. There are promising mathematical theorem proving applications for geometric logic systems, collected on the website [5]. The emphasis of this paper is theory, abstract machine design and direct implementation of the abstract machine. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISBNs :
9783540752905
Database :
Complementary Index
Journal :
Theoretical Aspects of Computing - ICTAC 2007
Publication Type :
Book
Accession number :
33315670
Full Text :
https://doi.org/10.1007/978-3-540-75292-9_14