% gpiUtil.Rd %-------------------------------------------------------------------------- % What: Utility functions for gpi() % $Id: gpiUtil.Rd 27318 2007-09-20 08:47:56Z g.gorjanc $ % Time-stamp: <2007-09-13 03:23:16 ggorjan> %-------------------------------------------------------------------------- \name{hwp} \alias{hwp} \alias{gpLong2Wide} \title{Utility functions for gpi()} \description{ \code{gpLong2Wide} changes data.frame with genotype probabilities in long form (one genotype per row) to wide form (one individual per row) for use in \code{\link{gpi}}. \code{hwp} calculates genotype probabilities according to Hardy-Weinberg law for use in \code{\link{gpi}}. } \usage{ gpLong2Wide(x, id, genotype, prob, trim=TRUE) hwp(x, trim=TRUE) } \arguments{ \item{x}{data.frame for \code{gpLong2Wide}, \code{\link[genetics]{genotype}} for \code{hwp}} \item{id}{character, column name in \code{x} holding individual identifications} \item{genotype}{character, column name in \code{x} holding genotypes} \item{prob}{character, column name in \code{x} holding genotype probabilities} \item{trim}{logical, remove last column (for \code{gpLong2Wide}) or value (for \code{hwp}) of a result} } \details{ Hardy-Weinberg probabilities for a gene with two alleles A and B, with probabilities \eqn{Pr(A)} and \eqn{Pr(B)} are: \item \eqn{Pr(AA) = Pr(A)^2} \item \eqn{Pr(AB) = 2 * Pr(A) * Pr(A)} \item \eqn{Pr(BB) = Pr(B)^2} } \value{ \code{gpLong2Wide} returns a matrix with number of rows equal to number of individuals and number of columns equal to number of possible genotypes. \code{hwp} returns a vector with Hardy-Weinberg genotype probabilities. } \author{Gregor Gorjanc} \seealso{ \code{\link{gpi}}, \code{\link[genetics]{genotype}}, \code{\link[genetics]{expectedGenotypes}} } \examples{ if(require(genetics)) { gen <- genotype(c("A/A", "A/B")) hwp(x=gen) hwp(x=gen, trim=FALSE) } } \keyword{misc} %-------------------------------------------------------------------------- % gpi.Rd ends here