RT info:eu-repo/semantics/article
T1 Evaluation of non-isothermal methods in stability studies of human insulin pharmaceutical preparations.
A1 Hernández Fernaud, Juan Ramón
A1 Oliva, Alexis
A1 Suárez, Marta
A1 Llabrés, Matías
A1 Fariña, José B.
A2 BioquímicaMicrobiología, Biología Celular y Genética
A2 Servicio de Proteómica. Universidad de La Laguna.
K1 Non-isothermal
K1 Humaninsulin
K1 Arrhenius parameters
K1 Bootstrap
AB The purpose of this research was to study the thermal stability of a human insulin pharmaceutical preparationusingnon-isothermalconditionsandcomparisonwithclassicalisothermalexperiments.The isothermal studies were performedinthetemperaturerange20–60◦C,whereasnon-isothermalstability studies wereperformedusingalinearincreasingtemperatureprogram,heatingrate0.25◦Cperhourand temperature interval 30–70◦C. Under isothermal conditions, an apparent first-order degradation process was observed at all temperatures. The linear Arrhenius plot suggested that the insulin degradation mechanism was the same within the studied temperature range, with quite large uncertainties due to the small number of degrees of freedom based only on the scatter in the plot, giving an estimated shelf-life at 25◦C of 199.1 days. In non-isothermal conditions, the integral approach was used to estimate the activation parameters. It provides results in good agreementwiththoseofthetraditionalmethod,butwiththeadvantagethatthe uncertainty in the final result directly reflects the goodness of fit of the experimental data, since it takes into account the scatter in the original data. The estimated shelf-life in non-isothermal conditions was quite close to the value derived from isothermal data, 191.4 days, although the 95% confidence interval estimated were slightly higher. This is due to the differences in the estimation method and the nature of the experimental errors. The bootstrap technique is also applied to estimating confidence limits for the Arrhenius parameters and shelf-life. This method is very useful when the underlying distribution function of the parameters is unknown. The results obtained indicate that the Arrhenius parameters follow a normal distribution, whereastheshelf-life follows a log-normal distribution. In any case, the results obtained show that there is no difference between the asymptotic and bootstrap confidence intervals.
YR 2009
FD 2009
LK http://riull.ull.es/xmlui/handle/915/38823
UL http://riull.ull.es/xmlui/handle/915/38823
LA en
DS Repositorio institucional de la Universidad de La Laguna
RD 19-oct-2024