Dear list, I'm calculating the integral of a Gaussian function from 0 to infinity. I understand from ?integrate that it's usually better to specify Inf explicitly as a limit rather than an arbitrary large number, as in this case integrate() performs a trick to do the integration better.
However, I do not understand the following, if I shift the Gauss function by some amount the integral should not be affected, shiftedGauss <- function(x0=500){ integrate(function(x) exp(-(x-x0)^2/100^2), 0, Inf)$value } shift <- seq(500, 800, by=10) plot(shift, sapply(shift, shiftedGauss)) Suddenly, just after 700, the value of the integral drops to nearly 0 when it should be constant all the way. Any clue as to what's going on here? I guess it's suddenly missing the important part of the range where the integrand is non-zero, but how could this be overcome? Regards, baptiste sessionInfo() R version 2.11.1 (2010-05-31) x86_64-apple-darwin9.8.0 locale: [1] en_GB.UTF-8/en_GB.UTF-8/C/C/en_GB.UTF-8/en_GB.UTF-8 attached base packages: [1] stats graphics grDevices utils datasets methods base other attached packages: [1] inline_0.3.5 RcppArmadillo_0.2.6 Rcpp_0.8.6 statmod_1.4.6 loaded via a namespace (and not attached): [1] tools_2.11.1 ______________________________________________ R-help@r-project.org mailing list https://stat.ethz.ch/mailman/listinfo/r-help PLEASE do read the posting guide http://www.R-project.org/posting-guide.html and provide commented, minimal, self-contained, reproducible code.