\name{ssd}
\alias{ssd}
\docType{methods}
\title{Sum of Squared Differences Using Gaussian Mixture Distribution}
\description{
    Given two vectors of same length and a Gaussian mixture, calculate the sum of squared differences (SSD) between the first vector and Gaussian mixture densities measured at points from second vector.
}
\usage{
    ssd( x, y, p )
}
\arguments{
    \item{x}{data vector}
    \item{y}{response vector}
    \item{p}{
        parameter vector of 3*\emph{n} parameters, where \emph{n} is
        number of mixture components. Structure of p vector is
        p = c( A1, A2, ..., A\emph{n}, mu1, mu2, ..., mu\emph{n}, sigma1, sigma2, ..., sigma\emph{n} ),
        where A\emph{i} is the proportion of \emph{i}-th component,
        mu\emph{i} is the location of \emph{i}-th component,
        sigma\emph{i} is the scale of \emph{i}-th component.
    }
}
\value{Sum of squared differences.}
\author{Andrius Merkys}