Difference between revisions of "A computable framework for accountable data assets"
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=Introduction= | =Introduction= | ||
According to [[Book/Algebraic Models for Accounting Systems|Rambaud and Pérez]]<ref>{{:Book/Algebraic Models for Accounting Systems}}</ref><ref>{{:Paper/The Accounting System as an Algebraic Automaton}}</ref>, | According to [[Book/Algebraic Models for Accounting Systems|Rambaud and Pérez]]<ref>{{:Book/Algebraic Models for Accounting Systems}}</ref><ref>{{:Paper/The Accounting System as an Algebraic Automaton}}</ref>, an algebraically-defined accounting practice may systematically automate the decision procedures for the following activities: | ||
# Decide how to classify the data collected and send the collected data to relevant data processing workflows. | # Decide how to classify the data collected and send the collected data to relevant data processing workflows. | ||
# Whether a given data set is considered admissible or not. This is judged in terms of its data formats and legal value ranges. | # Whether a given data set is considered admissible or not. This is judged in terms of its data formats and legal value ranges. | ||
Revision as of 05:22, 12 May 2022
Synoposis
This article prescribes an algebraic approach to manipulate data content in a unifying data abstraction framework. For non-mathematicians, this computational framework can be thought of as an highly automated and mechanized accounting system that can be extended to serve a wide range of resource authentication and authorization applications.
Introduction
According to Rambaud and Pérez[1][2], an algebraically-defined accounting practice may systematically automate the decision procedures for the following activities:
- Decide how to classify the data collected and send the collected data to relevant data processing workflows.
- Whether a given data set is considered admissible or not. This is judged in terms of its data formats and legal value ranges.
- Whether a transaction process is allowable, or not. This include whether a given transaction is feasible, in relevant operational/business logics.
Ownership associated with Accounts
Data Content that represent Decision Procedures
The Control Structure(If/Then/Else)
Computable Data Types
It is been defined axiomatically that all computable data types are Partially-ordered sets.
Lattices and Partially Ordered Sets
Composition and Decomposition
The Notion of Closure offered by Algebra
Applications in ICT System Development
Conclusion
Ensure System Integrity at multiple temporal cycles
Rigorous practice in Constructing and Deconstructing Data-Intensive Systems
Boosting producitivy in Software Development
Direct societal-scale applications as Integrated Data Processing Workflows
References
- ↑ 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.
- ↑ 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.