Fix typo of # optional - sage.modules

Matthias Koeppe · Matthias Koeppe · commit e5fd4e13a18a · 2023-06-10T10:37:01.000-07:00
diff --git a/src/sage/categories/magmas.py b/src/sage/categories/magmas.py
@@ -902,10 +902,10 @@ def multiplication_table(self, names='letters', elements=None):
 
                 sage: from sage.categories.examples.finite_semigroups import LeftRegularBand
                 sage: L = LeftRegularBand(('a', 'b'))
-                sage: T = L.multiplication_table(names='digits')                        # optional - sage.matrix
-                sage: T.column_keys()                                                   # optional - sage.matrix
+                sage: T = L.multiplication_table(names='digits')                        # optional - sage.modules
+                sage: T.column_keys()                                                   # optional - sage.modules
                 ('a', 'ab', 'b', 'ba')
-                sage: T                                                                 # optional - sage.matrix
+                sage: T                                                                 # optional - sage.modules
                 *  0 1 2 3
                  +--------
                 0| 0 1 1 1
@@ -918,7 +918,7 @@ def multiplication_table(self, names='letters', elements=None):
 
                 sage: L = LeftRegularBand(('a', 'b', 'c'))
                 sage: elts = sorted(L.list())
-                sage: L.multiplication_table(elements=elts)                             # optional - sage.matrix
+                sage: L.multiplication_table(elements=elts)                             # optional - sage.modules
                 *  a b c d e f g h i j k l m n o
                  +------------------------------
                 a| a b c d e b b c c c d d e e e
@@ -947,7 +947,7 @@ def multiplication_table(self, names='letters', elements=None):
 
                 sage: L = LeftRegularBand(('a','b','c'))
                 sage: elts=['a', 'c', 'ac', 'ca']
-                sage: L.multiplication_table(names='elements', elements=elts)           # optional - sage.matrix
+                sage: L.multiplication_table(names='elements', elements=elts)           # optional - sage.modules
                    *   'a'  'c' 'ac' 'ca'
                     +--------------------
                  'a'|  'a' 'ac' 'ac' 'ac'
@@ -961,15 +961,15 @@ def multiplication_table(self, names='letters', elements=None):
             comprehensive documentation. ::
 
                 sage: G = AlternatingGroup(3)                                           # optional - sage.groups
-                sage: T = G.multiplication_table()                                      # optional - sage.groups sage.matrix
-                sage: T.column_keys()                                                   # optional - sage.groups sage.matrix
+                sage: T = G.multiplication_table()                                      # optional - sage.groups sage.modules
+                sage: T.column_keys()                                                   # optional - sage.groups sage.modules
                 ((), (1,2,3), (1,3,2))
-                sage: T.translation()                                                   # optional - sage.groups sage.matrix
+                sage: T.translation()                                                   # optional - sage.groups sage.modules
                 {'a': (), 'b': (1,2,3), 'c': (1,3,2)}
-                sage: T.change_names(['x', 'y', 'z'])                                   # optional - sage.groups sage.matrix
-                sage: T.translation()                                                   # optional - sage.groups sage.matrix
+                sage: T.change_names(['x', 'y', 'z'])                                   # optional - sage.groups sage.modules
+                sage: T.translation()                                                   # optional - sage.groups sage.modules
                 {'x': (), 'y': (1,2,3), 'z': (1,3,2)}
-                sage: T                                                                 # optional - sage.groups sage.matrix
+                sage: T                                                                 # optional - sage.groups sage.modules
                 *  x y z
                  +------
                 x| x y z
diff --git a/src/sage/combinat/designs/designs_pyx.pyx b/src/sage/combinat/designs/designs_pyx.pyx
@@ -183,16 +183,16 @@ def is_group_divisible_design(groups,blocks,v,G=None,K=None,lambd=1,verbose=Fals
     EXAMPLES::
 
         sage: from sage.combinat.designs.designs_pyx import is_group_divisible_design
-        sage: TD = designs.transversal_design(4,10)                                     # optional - sage.matrix
-        sage: groups = [list(range(i*10,(i+1)*10)) for i in range(4)]                   # optional - sage.matrix
-        sage: is_group_divisible_design(groups,TD,40,lambd=1)                           # optional - sage.matrix
+        sage: TD = designs.transversal_design(4,10)                                     # optional - sage.modules
+        sage: groups = [list(range(i*10,(i+1)*10)) for i in range(4)]                   # optional - sage.modules
+        sage: is_group_divisible_design(groups,TD,40,lambd=1)                           # optional - sage.modules
         True
 
     TESTS::
 
-        sage: TD = designs.transversal_design(4,10)                                     # optional - sage.matrix
-        sage: groups = [list(range(i*10,(i+1)*10)) for i in range(4)]                   # optional - sage.matrix
-        sage: is_group_divisible_design(groups, TD, 40, lambd=2, verbose=True)          # optional - sage.matrix
+        sage: TD = designs.transversal_design(4,10)                                     # optional - sage.modules
+        sage: groups = [list(range(i*10,(i+1)*10)) for i in range(4)]                   # optional - sage.modules
+        sage: is_group_divisible_design(groups, TD, 40, lambd=2, verbose=True)          # optional - sage.modules
         the pair (0,10) has been seen 1 times but lambda=2
         False
         sage: is_group_divisible_design([[1,2],[3,4]],[[1,2]],40,lambd=1,verbose=True)
@@ -362,18 +362,18 @@ def is_pairwise_balanced_design(blocks,v,K=None,lambd=1,verbose=False):
         sage: sts = designs.steiner_triple_system(9)
         sage: is_pairwise_balanced_design(sts,9,[3],1)
         True
-        sage: TD = designs.transversal_design(4,10).blocks()                            # optional - sage.matrix
-        sage: groups = [list(range(i*10,(i+1)*10)) for i in range(4)]                   # optional - sage.matrix
-        sage: is_pairwise_balanced_design(TD + groups, 40, [4,10], 1, verbose=True)     # optional - sage.matrix
+        sage: TD = designs.transversal_design(4,10).blocks()                            # optional - sage.modules
+        sage: groups = [list(range(i*10,(i+1)*10)) for i in range(4)]                   # optional - sage.modules
+        sage: is_pairwise_balanced_design(TD + groups, 40, [4,10], 1, verbose=True)     # optional - sage.modules
         True
 
     TESTS::
 
         sage: from sage.combinat.designs.designs_pyx import is_pairwise_balanced_design
-        sage: is_pairwise_balanced_design(TD + groups, 40, [4,10], 2, verbose=True)     # optional - sage.matrix
+        sage: is_pairwise_balanced_design(TD + groups, 40, [4,10], 2, verbose=True)     # optional - sage.modules
         the pair (0,1) has been seen 1 times but lambda=2
         False
-        sage: is_pairwise_balanced_design(TD + groups, 40, [10], 1, verbose=True)       # optional - sage.matrix
+        sage: is_pairwise_balanced_design(TD + groups, 40, [10], 1, verbose=True)       # optional - sage.modules
         a block has size 4 while K=[10]
         False
         sage: is_pairwise_balanced_design([[2,2]],40,[2],1,verbose=True)
