Theoretical Foundations of Computer Science
Bibliography
Linear Properties of Zero-Safe Nets with Debit Tokens
Michael Köhler-Bußmeier and Manfred Kudlek.
Linear properties of zero-safe nets with debit tokens.
Fundamenta Informaticae, 85(1-4):329-342, 2008.
Abstract: In this contribution we study an extension of zero-safe nets that allows to model cooperation scenarios. Since zero-safe nets cannot be represented as finite nets in general, we study an extension of the firing rule having a close connection to blind counter automatons and the theory of semi-flows. As a main result we obtain, that a representation can always be given as a finite P/T net - although our firing rule is an extension of the original one - i.e. it preserves all the events that have been allowed before.
BibTeX entry
@Article{Koehler+08a,
author = {K{\"o}hler-Bu{\ss}meier,Michael and Kudlek, Manfred},
title = {Linear Properties of Zero-Safe Nets with Debit Tokens},
year = 2008,
journal = {Fundamenta Informaticae},
volume = 85,
number = {1-4},
pages = {329--342},
abstract = {In this contribution we study an extension of zero-safe
nets that allows to model cooperation
scenarios. Since zero-safe nets cannot be
represented as finite nets in general, we study an
extension of the firing rule having a close
connection to blind counter automatons and the
theory of semi-flows. As a main result we obtain,
that a representation can always be given as a
finite P/T net - although our firing rule is an
extension of the original one - i.e. it preserves
all the events that have been allowed before.}
}
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