===================================================================
RCS file: /home/cvs/OpenXM/src/R/r-packages/hgm/man/hgm.c2wishart.Rd,v
retrieving revision 1.3
retrieving revision 1.6
diff -u -p -r1.3 -r1.6
--- OpenXM/src/R/r-packages/hgm/man/hgm.c2wishart.Rd	2016/02/13 22:56:50	1.3
+++ OpenXM/src/R/r-packages/hgm/man/hgm.c2wishart.Rd	2016/02/16 02:17:00	1.6
@@ -1,4 +1,4 @@
-% $OpenXM: OpenXM/src/R/r-packages/hgm/man/hgm.c2wishart.Rd,v 1.2 2016/02/13 07:12:52 takayama Exp $
+% $OpenXM: OpenXM/src/R/r-packages/hgm/man/hgm.c2wishart.Rd,v 1.5 2016/02/15 07:42:07 takayama Exp $
 \name{hgm.p2wishart}
 \alias{hgm.p2wishart}
 %- Also NEED an '\alias' for EACH other topic documented here.
@@ -43,7 +43,7 @@ hgm.p2wishart(m,n1,n2,beta,q0,approxdeg,h,dp,q,mode,me
   \item{mode}{
     When mode=c(1,0,0), it returns the evaluation 
     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
+    When mode=c(1,1,(2^m+1)*p), intermediate values of P(L1 < x) with respect to
     p-steps of x are also returned.  Sampling interval is controled by dp.
     When autoplot=1, mode is automatically set.
   }
@@ -54,8 +54,9 @@ hgm.p2wishart(m,n1,n2,beta,q0,approxdeg,h,dp,q,mode,me
   }
   \item{err}{
     When err=c(e1,e2), e1 is the absolute error and e2 is the relative error.
-    As long as NaN is not returned, it is recommended to set to
-    err=c(0.0, 1e-10), because initial values are usually very small. 
+    This parameter controls the adative Runge-Kutta method.
+    If the output is absurd, you may get a correct answer by setting,  e.g.,
+    err=c(1e-(xy+5), 1e-10) or by increasing q0 when initial value at q0 is very small as 1e-xy. 
   }  
   \item{automatic}{
     automatic=1 is the default value.
@@ -76,7 +77,15 @@ hgm.p2wishart(m,n1,n2,beta,q0,approxdeg,h,dp,q,mode,me
   }  
   \item{autoplot}{
     autoplot=0 is the default value.
-    If it is 1, then it outputs an input for plot.
+    If it is 1, then this function outputs an input for plot
+    (which is equivalent to setting the 3rd argument of the mode parameter properly).
+    When ans is the output, ans[1,] is c(q,prob at q,...), ans[2,] is c(q0,prob at q0,...), and ans[3,] is c(q0+q/100,prob at q/100,...), ...
+    When the adaptive Runge-Kutta method is used, the step size h may change
+    automatically,
+    which  makes the sampling period change, in other words, the sampling points 
+   q0+q/100, q0+2*q/100, q0+3*q/100, ... may  change. 
+   In this case, the output matrix may contain zero rows in the tail or overfull. 
+   In case of the overful, use the mode option to get the all result.
   }  
 }
 \details{