Moran's I coefficient is computed using the formula:
\deqn{I = \frac{n}{S_0} \frac{\sum_{i=1}^n\sum_{j=1}^n w_{i,j}(y_i -
\overline{y})(y_j - \overline{y})}{\sum_{i=1}^n {(y_i -
- \overline{y})}^2}}
- {\code{I = n/S0 * (sum\{i=1..n\} sum\{j=1..n\} wij(yi - ym))(yj - ym)
+ \overline{y})}^2}}{\code{I = n/S0 * (sum\{i=1..n\} sum\{j=1..n\} wij(yi - ym))(yj - ym)
/ (sum\{i=1..n\} (yi - ym)^2)}}
with
\itemize{
\bold{39}, 227--241.
}
\author{Julien Dutheil \email{julien.dutheil@univ-montp2.fr} and
- Emmanuel Paradis \email{Emmanuel.Paradis@mpl.ird.fr}}
+ Emmanuel Paradis}
\seealso{
\code{\link{weight.taxo}}
}