Key Words:Gas chromatography Capillary Theory Linearity between peak width and retention data Evaluation of GC equipment
SummaryThe linearity of the relationship between OT,t2 and (1 + k)2 is studied with the view of using it for the evaluation of GC equipment. Based on appropriate analytical expressions it is concluded that in general this relationship is not linear and that practical proceduresfor column evaluation should be developed that take this non-linearity into account.Previous papers [1,2] show that since OT,t2 varies linearly with (1 + k)2, provided that 0~,~2 is independent of k. [OT,t2 is the variance, in (time)> units, of the peak as it appears on the chromatogram; Oe,t2 is the extracolumn contribution and aC,t2 = (1+k)2 0~,~2 , the column contribution to OT,t2].The aim of the present study is to establish the conditions under which 0~,~2 is sufficiently indipendent of k to warrant an analysis based on equation 1. Although completely new diagnostic tools are suggested by this analysis, practical procedures are not proposed; its exclusive aim is to provide explicit information on the behaviour of the equation 1. It is limited to gas chromatography in open tubes.
TheoryDeparting from the almost axiomatic relationship [2,3] and the definitions A comparison of equations 1 and 6 indicates that the linearity of equation 6 is determined by the k-dependence H of the group (t)tm2 , and, since 1 and tm are not affected by k, only the k-dependence of H. This dependence is introduced explicity by substituting the Golay-equation (4) for H into equation 6. r-where Dm and Ds are the diffusion coefficient of the solute in, respectively, the mobile and the stationary phase, rt is the column radius, u the linear velocity of the mobile phase and df the thickness of the stationary phase liquid layer.The first is the relative size of ___ lg6 andf(k); obviouslyat large values of ~ lg6 (i.e. small values of (ScRe)2) it will (ScRep (ScRe)2 be relatively insensitive to changes in (l+k). The second is the extent of (l+k)2-dependence of f(k). This in turn is determined by the functional behaviour of f[(I+k)2] as well as the magnitude of X. The behaviour of these functions will now be investigated.
The functions fl(k), f2(k) and f(k)The behaviour of fl(k) and f2(k) has previously been reported as functions of k [41. The present study concerns itself with the change of these functions with (l+k)2.
SummaryThe expression for the resolution function, R, in terms of operating parameters for open tubular columns has been extended to include inlet contributions to the peak variance. Subsequent optimization has revealed the existence of optima in the column radius, the stationary phase thickness and the diffusion coefficient ratio in the stationary and mobile phases -
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.