X-Git-Url: http://git.chise.org/gitweb/?a=blobdiff_plain;f=lisp%2Fnnvirtual.el;h=43cd7f6cf5882c1ec04367960261946f2723413a;hb=9b741e050b400987d68ff761c6cc3276c932839c;hp=ed1d7def22af2ea75951f96cf694616708b512b9;hpb=4305c2ea86b2e1d044bfb8b98e5558504bc09781;p=elisp%2Fgnus.git-

diff --git a/lisp/nnvirtual.el b/lisp/nnvirtual.el
index ed1d7de..43cd7f6 100644
--- a/lisp/nnvirtual.el
+++ b/lisp/nnvirtual.el
@@ -46,13 +46,13 @@
 (nnoo-declare nnvirtual)
 
 (defvoo nnvirtual-always-rescan t
-  "*If non-nil, always scan groups for unread articles when entering a group.
+  "If non-nil, always scan groups for unread articles when entering a group.
 If this variable is nil and you read articles in a component group
 after the virtual group has been activated, the read articles from the
 component group will show up when you enter the virtual group.")
 
 (defvoo nnvirtual-component-regexp nil
-  "*Regexp to match component groups.")
+  "Regexp to match component groups.")
 
 (defvoo nnvirtual-component-groups nil
   "Component group in this nnvirtual group.")
@@ -522,14 +522,15 @@ If UPDATE-P is not nil, call gnus-group-update-group on the components."
 
 
 ;;; We map between virtual articles and real articles in a manner
-;;; which keeps the size of the virtual active list the same as
-;;; the sum of the component active lists.
-;;; To achieve fair mixing of the groups, the last article in
-;;; each of N component groups will be in the the last N articles
-;;; in the virtual group.
-
-;;; If you have 3 components A, B and C, with articles 1-8, 1-5, and 6-7
-;;; resprectively, then the virtual article numbers look like:
+;;; which keeps the size of the virtual active list the same as the
+;;; sum of the component active lists.
+
+;;; To achieve fair mixing of the groups, the last article in each of
+;;; N component groups will be in the last N articles in the virtual
+;;; group.
+
+;;; If you have 3 components A, B and C, with articles 1-8, 1-5, and
+;;; 6-7 resprectively, then the virtual article numbers look like:
 ;;;
 ;;;  1  2  3  4  5  6  7  8  9  10 11 12 13 14 15
 ;;;  A1 A2 A3 A4 B1 A5 B2 A6 B3 A7 B4 C6 A8 B5 C7