Difference between revisions of "Paper/The Accounting System as an Algebraic Automaton"

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=Research Synopsis=
=Research Synopsis=
This content is directly relevant to the book<ref>{{:Book/Algebraic Models for Accounting Systems}}</ref>:[[Book/Algebraic Models for Accounting Systems|Algebraic Models for Accounting Systems]] of the same authors.
This content is directly relevant to the book<ref>{{:Book/Algebraic Models for Accounting Systems}}</ref>:[[Book/Algebraic Models for Accounting Systems|Algebraic Models for Accounting Systems]] of the same authors.
=Excerpts=
The following sections are some excerpts from this book.
=Decision problems for Accounting Systems=
#Decide whether a given transaction is allowable.
#Decide whether a given balance vector is allowable.
#Decide whether a given transaction is feasible.
#Decide whether a final balance vector could actually have occurred by correctly applying a sequence of allowable transactions to a given initial balance vector.
#Decide whether two accounting systems on the same account set are equivalent, i.e., if they have the same feasible transactions and hence the same monoid.
#Decide whether a given accounting system is of a specific type such as those described in Chapter 7.
=References=
=References=
<references/>
<references/>

Latest revision as of 02:18, 11 May 2022

Rambaud, Salvador Cruz; Pérez, José García (2005). "The Accounting System as an Algebraic Automaton". INTERNATIONAL JOURNAL OF INTELLIGENT SYSTEMS. local page: Wiley Periodicals, Inc. 20: 827–842. 


Research Synopsis

This content is directly relevant to the book[1]:Algebraic Models for Accounting Systems of the same authors.

References

  1. Rambaud, Salvador Cruz; Pérez, José García; Nehmer, Robert A.; Robinson, Derek J S Robinson (2010). Algebraic Models for Accounting Systems. local page: Cambridge at the University Press. ISBN 978-981-4287-11-1. 

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