Application of Boolean Algebra for Definition of Myeloid Neoplasms

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Published Jan 31, 2023
DOI: https://doi.org/10.18103/mra.v11i1.3456

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Gerhard Zugmaier
Department of Haematology, Oncology and Immunology, Philipps University Marburg, Marburg, Germany
Sophie Kerkmann
Goethe University, Frankfurt, Hessen, Germany
Franco Locatelli
Department of Pediatrics, Sapienza, University of Rome; Director Department of Pediatric Hematology and Oncology IRCCS Ospedale Pediatrico Bambino Gesù, Rome, Italy

Abstract

The definition of disease has become increasingly complex in the last 20 years. Especially the definition of tumors of hematopoietic and lymphoid tissues includes multiple parameters such as cytology, histology, immune phenotyping, cytogenetics and molecular genetics. Myeloid neoplasms include an especially high number of permutations of these parameters, requiring a mathematical approach. Mathematical concepts have the merit to show what can be proven and what can be calculated. Boolean algebra also sometimes called “mathematical logic” has been shown to be a useful tool of the definition of acute leukemias. This tool was also applied in this study for the definition of the more complex myeloid neoplasms. The binary number system was used that only includes the sequence of 0 and 1. Presence of a diagnostic parameter was coded by 1, absence by 0. Disease was defined not only by an algorithm but also by symbolic calculation. This way, myeloid neoplasms could successfully be defined by an algebraic system.

Keywords: Boolean Algebra, Application of Boolean Algebra, Boolean Algebra for Definition of Myeloid Neoplasms, Myeloid Neoplasms, Definition of Myeloid Neoplasms, Application of Boolean Algebra for Definition of Myeloid Neoplasms

Article Details

How to Cite
ZUGMAIER, Gerhard; KERKMANN, Sophie; LOCATELLI, Franco. Application of Boolean Algebra for Definition of Myeloid Neoplasms. Medical Research Archives, [S.l.], v. 11, n. 1, jan. 2023. ISSN 2375-1924. Available at: <https://esmed.org/MRA/mra/article/view/3456>. Date accessed: 20 apr. 2024. doi: https://doi.org/10.18103/mra.v11i1.3456.
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Issue
Vol 11 No 1 (2023): January Issue, Vol.11 Issue 1
Section
Research Articles

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