PROBING NON-ADHERENCE TO PRESCRIBED MEDICINES? A BIVARIATE DISTRIBUTION WITH INFORMATION NUCLEUS CLARIFIES

No illness gets cured without the patient’s adheren ce to the prescribed medicine (s). Reasons such as too many medicines, lack of health insurance coverage, high co-payment cost, loss of cognitive memory to t ake. are commonly noticed for non-adherence. In some illnesses, the patients who do not adhere to the presc ribed medicines end up again in hospital. How should the pertinent data be analyzed to learn? Currently, the re is no suitable methodology to scrutinize the data for a c lear assessment about the significance of a reason. To fulfil such a need, this article develops and demonstrates a new underlying bivariate probability model for t he data and a statistical methodology to extract pertinent information to check whether the non-adherent proportion of patients to medicine (s) is significant enough t o come up with strict remedial policies. To start w ith, the case of too many prescribed medicines is examined. Then, the repeated hospitalization due to nonadherence is examined. The contents of this article could be easily extended to other reasons of nonadherence as well. In the presence of a reason, the re might exist a number of non-adherent X and a number of adherent, Y patients. Both X and Y is observable in a sample of size n1 with the presence of a reason and in another random sample of size n2 with the absence of a reason. The total sample size is n = n 1 + n 2. Let 0<φ<1 and 0< ρ<1 denote respectively the probability for a reason to exist in a patient and the probability for a patient to be non-adherent to the prescribed medicines. Of interest to the medical community is the trend of the sum, T = X+Y and Z = n-X-Y denoting respectively the total number of non-adhe rent and adherent patients irrespective of a reason. Hence, this article constructs a bivariate probability dis tribution for T and Z utilize it to explain several non-trivialities. To illustrate, non-adherence patients’ data in the literature are considered. Because the bivariate pr obability distribution is not seen in the literatur e, it is named as non-adherent bivariate distribution. Various statistical properties of the non-adherent bivariate distribution are identified and explained. An information based hypothesis testing procedure is devised to check whether an estimate of the parameter, ρ is significant. Two closely connected factors for the patients not adhering to the prescribed medicines are examin ed. The first is a precursor and it is that too man y medicines are prescribed to take. In an illustratio n for the first reason, the probability for a patie nt not to adhere the medicines is estimated to be 0.78 which is statistically significant. The second is the pos t cursor and it is that the patients not-adhering to the medicines are more often hospitalized again. In an illustration of the second factor, the probability for the diabetic patients not to adhere the medicin es is estimated to be 0.44 which is significant. The stat istical power of accepting the true non-adherence probability by our methodology is excellent in both illustrations. A few comments are made about the f uture research work. Other reasons for the patients’ non- adherence might exist and they should also be exami ned. A regression type prediction model can be construct ed if additional data on covariates are available. A principal component analysis might reveal clusters of reasons along with the grouping of illnesses if such multivariate data become available. The usual princ ipal component analysis requires bivariate normally distributed data. For the data governed by the non- adherent bivariate distribution, a new principal co mponent