Rizza, Davide ORCID: https://orcid.org/0000-0002-1375-371X (2019) Numerical methods for infinite decision-making processes. International Journal of Unconventional Computing, 14 (2). pp. 139-158. ISSN 1548-7199
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Abstract
The new computational methodology due to Yaroslav Sergeyev (see [25–27]) makes it possible to evaluate numerically the terminal features of complete, sequential decision-making processes. By standard numerical methods, these processes have indeterminate features or seem to support paradoxical conclusions. We show that they are better regarded as a class of problems for which the numerical methods based on Sergeyev’s methodology provide a uniform technique of resolution.
Item Type: | Article |
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Faculty \ School: | Faculty of Arts and Humanities > School of Politics, Philosophy, Language and Communication Studies (former - to 2024) |
UEA Research Groups: | Faculty of Arts and Humanities > Research Groups > Philosophy Faculty of Science > Research Groups > Algebra, Number Theory, Logic, and Representations (ANTLR) |
Related URLs: | |
Depositing User: | LivePure Connector |
Date Deposited: | 15 Jan 2019 13:30 |
Last Modified: | 27 Nov 2024 10:24 |
URI: | https://ueaeprints.uea.ac.uk/id/eprint/69574 |
DOI: |
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