A group-theoretical notation for disease states: an example using the psychiatric rating scale
<p>Abstract</p> <p>Background</p> <p>While many branches of natural science have embraced group theory reaping enormous advantages for their respective fields, clinical medicine lacks to date such applications. Here we intend to explain a prototypal model based on the p...
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doaj-5171b3aaea234c79bb91ffeb0cae237f2020-11-25T00:52:16ZengBMCTheoretical Biology and Medical Modelling1742-46822012-07-01912810.1186/1742-4682-9-28A group-theoretical notation for disease states: an example using the psychiatric rating scaleSawamura JitsukiMorishita ShigeruIshigooka Jun<p>Abstract</p> <p>Background</p> <p>While many branches of natural science have embraced group theory reaping enormous advantages for their respective fields, clinical medicine lacks to date such applications. Here we intend to explain a prototypal model based on the postulates of groups that could have potential in categorizing clinical states.</p> <p>Method</p> <p>As an example, we begin by modifying the original ‘Brief Psychiatric Rating Scale’ (BPRS), the most frequently used standards for evaluating the psychopathology of patients with schizophrenia. We consider a presumptively idealized (virtually standardized) BPRS (denoted BPRS-I) with assessments ranging from ‘0’ to ‘6’ to simplify our discussion. Next, we introduce the modulo group Z<sub>7</sub> containing elements {0,1,2,…,6} defined by composition rule, ‘modulo 7 addition’, denoted by *. Each element corresponds to a score resulting from grading a symptom under the BPRS-I assessment. By grading all symptoms associated with the illness, a Cartesian product, denoted A<sub>j,</sub> constitutes a summary of a patient assessment. By considering operations denoted A<sub>(j→k)</sub> that change state A<sub>j</sub> into state A<sub>k</sub>, a group M (that itself contains A<sub>j</sub> and A<sub>k</sub> as elements) is also considered. Furthermore, composition of these operations obey modulo 7 arithmetic (i.e., addition, multiplication, and division). We demonstrate the application with a simple example in the form of a series of states (A<sub>4</sub> = A<sub>1</sub>*A<sub>(1→2)</sub>*A<sub>(2→3)</sub>*A<sub>(3→4)</sub>) to illustrate this result.</p> <p>Results</p> <p>The psychiatric disease states are defined as 18-fold Cartesian products of Z<sub>7</sub>, i.e., Z<sub>7</sub><sup>×18</sup> = Z<sub>7</sub>×…×Z<sub>7</sub> (18 times). We can construct set G ≡ {a<sub>(m)i</sub>| m = 1,2,3,…(the patient’s history of the i-th symptom)} and M ≡ {A<sub>m</sub> | A<sub>m</sub> ∈ Z<sub>7</sub><sup>×18</sup> (the set of all possible assessments of a patient)} simplistically, at least, in terms of modulo 7 addition that satisfies the group postulates.</p> <p>Conclusions</p> <p>Despite the large limitations of our methodology, there are grounds not only within psychiatry but also within other medical fields to consider more generalized notions based on groups (if not rings and fields). These might enable through some graduated expression a systematization of medical states and of medical procedures in a manner more aligned with other branches of natural science.</p> http://www.tbiomed.com/content/9/1/28Group theoryModulo operationSeverity assessmentBPRSNotation |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Sawamura Jitsuki Morishita Shigeru Ishigooka Jun |
| spellingShingle |
Sawamura Jitsuki Morishita Shigeru Ishigooka Jun A group-theoretical notation for disease states: an example using the psychiatric rating scale Theoretical Biology and Medical Modelling Group theory Modulo operation Severity assessment BPRS Notation |
| author_facet |
Sawamura Jitsuki Morishita Shigeru Ishigooka Jun |
| author_sort |
Sawamura Jitsuki |
| title |
A group-theoretical notation for disease states: an example using the psychiatric rating scale |
| title_short |
A group-theoretical notation for disease states: an example using the psychiatric rating scale |
| title_full |
A group-theoretical notation for disease states: an example using the psychiatric rating scale |
| title_fullStr |
A group-theoretical notation for disease states: an example using the psychiatric rating scale |
| title_full_unstemmed |
A group-theoretical notation for disease states: an example using the psychiatric rating scale |
| title_sort |
group-theoretical notation for disease states: an example using the psychiatric rating scale |
| publisher |
BMC |
| series |
Theoretical Biology and Medical Modelling |
| issn |
1742-4682 |
| publishDate |
2012-07-01 |
| description |
<p>Abstract</p> <p>Background</p> <p>While many branches of natural science have embraced group theory reaping enormous advantages for their respective fields, clinical medicine lacks to date such applications. Here we intend to explain a prototypal model based on the postulates of groups that could have potential in categorizing clinical states.</p> <p>Method</p> <p>As an example, we begin by modifying the original ‘Brief Psychiatric Rating Scale’ (BPRS), the most frequently used standards for evaluating the psychopathology of patients with schizophrenia. We consider a presumptively idealized (virtually standardized) BPRS (denoted BPRS-I) with assessments ranging from ‘0’ to ‘6’ to simplify our discussion. Next, we introduce the modulo group Z<sub>7</sub> containing elements {0,1,2,…,6} defined by composition rule, ‘modulo 7 addition’, denoted by *. Each element corresponds to a score resulting from grading a symptom under the BPRS-I assessment. By grading all symptoms associated with the illness, a Cartesian product, denoted A<sub>j,</sub> constitutes a summary of a patient assessment. By considering operations denoted A<sub>(j→k)</sub> that change state A<sub>j</sub> into state A<sub>k</sub>, a group M (that itself contains A<sub>j</sub> and A<sub>k</sub> as elements) is also considered. Furthermore, composition of these operations obey modulo 7 arithmetic (i.e., addition, multiplication, and division). We demonstrate the application with a simple example in the form of a series of states (A<sub>4</sub> = A<sub>1</sub>*A<sub>(1→2)</sub>*A<sub>(2→3)</sub>*A<sub>(3→4)</sub>) to illustrate this result.</p> <p>Results</p> <p>The psychiatric disease states are defined as 18-fold Cartesian products of Z<sub>7</sub>, i.e., Z<sub>7</sub><sup>×18</sup> = Z<sub>7</sub>×…×Z<sub>7</sub> (18 times). We can construct set G ≡ {a<sub>(m)i</sub>| m = 1,2,3,…(the patient’s history of the i-th symptom)} and M ≡ {A<sub>m</sub> | A<sub>m</sub> ∈ Z<sub>7</sub><sup>×18</sup> (the set of all possible assessments of a patient)} simplistically, at least, in terms of modulo 7 addition that satisfies the group postulates.</p> <p>Conclusions</p> <p>Despite the large limitations of our methodology, there are grounds not only within psychiatry but also within other medical fields to consider more generalized notions based on groups (if not rings and fields). These might enable through some graduated expression a systematization of medical states and of medical procedures in a manner more aligned with other branches of natural science.</p> |
| topic |
Group theory Modulo operation Severity assessment BPRS Notation |
| url |
http://www.tbiomed.com/content/9/1/28 |
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