New approach to linear gradient elution used for optimisation in reversed-phase liquid chromatography

Abstract

A new mathematical treatment concerning the gradient elution in reversed-phase liquid chromatography when the volume fraction φ of an organic modifier in the water–organic mobile phase varies linearly with time is presented. The experimental ln k versus φ curve, where k is the retention factor under isocratic conditions in a binary mobile phase, is subdivided into a finite number of linear portions and the solute gradient retention time t R is calculated by means of an analytical expression arising from the fundamental equation of gradient elution. The validity of the proposed analytical expression and the methodology followed for the calculation of t R was tested using eight catechol-related solutes with mobile phases modified by methanol or acetonitrile. It was found that in all cases the accuracy of the predicted gradient retention times is very satisfactory because it is the same with the accuracy of the retention times predicted under isocratic conditions. Finally, the above method for estimating gradient retention times was used in an optimisation algorithm, which determines the best variation pattern of φ that leads to the optimum separation of a mixture of solutes at different values of the total elution time.