===================================================================
RCS file: /home/cvs/OpenXM/src/R/r-packages/hgm/man/hgm.cwishart.Rd,v
retrieving revision 1.10
retrieving revision 1.11
diff -u -p -r1.10 -r1.11
--- OpenXM/src/R/r-packages/hgm/man/hgm.cwishart.Rd	2015/03/27 02:36:30	1.10
+++ OpenXM/src/R/r-packages/hgm/man/hgm.cwishart.Rd	2016/02/13 22:56:50	1.11
@@ -1,4 +1,4 @@
-% $OpenXM: OpenXM/src/R/r-packages/hgm/man/hgm.cwishart.Rd,v 1.9 2015/03/26 11:54:13 takayama Exp $
+% $OpenXM: OpenXM/src/R/r-packages/hgm/man/hgm.cwishart.Rd,v 1.10 2015/03/27 02:36:30 takayama Exp $
 \name{hgm.pwishart}
 \alias{hgm.pwishart}
 %- Also NEED an '\alias' for EACH other topic documented here.
@@ -40,7 +40,7 @@ hgm.pwishart(m,n,beta,q0,approxdeg,h,dp,q,mode,method,
   }
   \item{mode}{
     When mode=c(1,0,0), it returns the evaluation 
-    of the matrix hypergeometric series and its derivatives at x0.
+    of the matrix hypergeometric series and its derivatives at q0.
     When mode=c(1,1,(m^2+1)*p), intermediate values of P(L1 < x) with respect to
     p-steps of x are also returned.  Sampling interval is controled by dp.
   }
@@ -76,9 +76,9 @@ hgm.pwishart(m,n,beta,q0,approxdeg,h,dp,q,mode,method,
   It is evaluated by the Koev-Edelman algorithm when x is near the origin and
   by the HGM when x is far from the origin.
   We can obtain more accurate result when the variables h is smaller,
-  x0 is relevant value (not very big, not very small),
+  q0 is relevant value (not very big, not very small),
   and the approxdeg is more larger.
-  A heuristic method to set parameters x0, h, approxdeg properly
+  A heuristic method to set parameters q0, h, approxdeg properly
   is to make x larger and to check if the y[0] approaches to 1.
 %  \code{\link[RCurl]{postForm}}.
 }