The limit of quantification is the x value, where the relative error
of the quantification given the calibration model reaches a prespecified
value 1/k. Thus, it is the solution of the equation
$$L = k c(L)$$
where c(L) is half of the length of the confidence interval at the limit L
(DIN 32645, equivalent to ISO 11843). c(L) is internally estimated by
inverse.predict
, and L is obtained by iteration.
loq(object, …, alpha = 0.05, k = 3, n = 1, w.loq = "auto", var.loq = "auto", tol = "default")
lm
or
rlm
with model formula y ~ x
or y ~ x - 1
,
optionally from a weighted regression. If weights are specified
in the model, either w.loq
or var.loq
have to
be specified.
massart97ex3
for
an example how to take advantage of knowledge about the
variance function.
The estimated limit of quantification for a model used for calibration.
- IUPAC recommends to base the LOQ on the standard deviation of the signal where x = 0. - The calculation of a LOQ based on weighted regression is non-standard and therefore not tested. Feedback is welcome.
Examples for din32645
data(massart97ex3) attach(massart97ex3) m <- lm(y ~ x) loq(m)#> $x #> [1] 13.97764 #> #> $y #> 1 #> 30.6235 #># We can get better by using replicate measurements loq(m, n = 3)#> $x #> [1] 9.971963 #> #> $y #> 1 #> 22.68539 #>