22 Boolean Lists This chapter describes boolean lists. A boolean list is a list that has no holes and contains only the boolean values true and false (see Chapter 20). In function names we call boolean lists blists for brevity. 22.1 IsBlist (Filter) 22.1-1 IsBlist IsBlist( obj )  Category A boolean list (blist) is a list that has no holes and contains only true and false. Boolean lists can be represented in an efficient compact form, see 22.5 for details.  Example  gap> IsBlist( [ true, true, false, false ] ); true gap> IsBlist( [] ); true gap> IsBlist( [false,,true] ); # has holes false gap> IsBlist( [1,1,0,0] ); # contains not only boolean values false gap> IsBlist( 17 ); # is not even a list false  Boolean lists are lists and all operations for lists are therefore applicable to boolean lists. Boolean lists can be used in various ways, but maybe the most important application is their use for the description of subsets of finite sets. Suppose set is a finite set, represented as a list. Then a subset sub of set is represented by a boolean list blist of the same length as set such that blist[i] is true if set[i] is in sub, and false otherwise. 22.2 Boolean Lists Representing Subsets 22.2-1 BlistList BlistList( list, sub )  function returns a new boolean list that describes the list sub as a sublist of the dense list list. That is BlistList returns a boolean list blist of the same length as list such that blist[i] is true if list[i] is in sub and false otherwise. list need not be a proper set (see 21.19), even though in this case BlistList is most efficient. In particular list may contain duplicates. sub need not be a proper sublist of list, i.e., sub may contain elements that are not in list. Those elements of course have no influence on the result of BlistList.  Example  gap> BlistList( [1..10], [2,3,5,7] ); [ false, true, true, false, true, false, true, false, false, false ] gap> BlistList( [1,2,3,4,5,2,8,6,4,10], [4,8,9,16] ); [ false, false, false, true, false, false, true, false, true, false ]  See also UniteBlistList (22.4-2). 22.2-2 ListBlist ListBlist( list, blist )  function returns the sublist sub of the list list, which must have no holes, represented by the boolean list blist, which must have the same length as list. sub contains the element list[i] if blist[i] is true and does not contain the element if blist[i] is false. The order of the elements in sub is the same as the order of the corresponding elements in list.  Example  gap> ListBlist([1..8],[false,true,true,true,true,false,true,true]); [ 2, 3, 4, 5, 7, 8 ] gap> ListBlist( [1,2,3,4,5,2,8,6,4,10], > [false,false,false,true,false,false,true,false,true,false] ); [ 4, 8, 4 ]  22.2-3 SizeBlist SizeBlist( blist )  function returns the number of entries of the boolean list blist that are true. This is the size of the subset represented by the boolean list blist.  Example  gap> SizeBlist( [ false, true, false, true, false ] ); 2  22.2-4 IsSubsetBlist IsSubsetBlist( blist1, blist2 )  function returns true if the boolean list blist2 is a subset of the boolean list blist1, which must have equal length, and false otherwise. blist2 is a subset of blist1 if blist1[i] = blist1[i] or blist2[i] for all i.  Example  gap> blist1 := [ true, true, false, false ];; gap> blist2 := [ true, false, true, false ];; gap> IsSubsetBlist( blist1, blist2 ); false gap> blist2 := [ true, false, false, false ];; gap> IsSubsetBlist( blist1, blist2 ); true  22.3 Set Operations via Boolean Lists 22.3-1 UnionBlist UnionBlist( blist1, blist2[, ...] )  function UnionBlist( list )  function In the first form UnionBlist returns the union of the boolean lists blist1, blist2, etc., which must have equal length. The union is a new boolean list that contains at position i the value blist1[i] or blist2[i] or .... The second form takes the union of all blists (which as for the first form must have equal length) in the list list. 22.3-2 IntersectionBlist IntersectionBlist( blist1, blist2[, ...] )  function IntersectionBlist( list )  function In the first form IntersectionBlist returns the intersection of the boolean lists blist1, blist2, etc., which must have equal length. The intersection is a new blist that contains at position i the value blist1[i] and blist2[i] and .... In the second form list must be a list of boolean lists blist1, blist2, etc., which must have equal length, and IntersectionBlist returns the intersection of those boolean lists. 22.3-3 DifferenceBlist DifferenceBlist( blist1, blist2 )  function returns the asymmetric set difference of the two boolean lists blist1 and blist2, which must have equal length. The asymmetric set difference is a new boolean list that contains at position i the value blist1[i] and not blist2[i].  Example  gap> blist1 := [ true, true, false, false ];; gap> blist2 := [ true, false, true, false ];; gap> UnionBlist( blist1, blist2 ); [ true, true, true, false ] gap> IntersectionBlist( blist1, blist2 ); [ true, false, false, false ] gap> DifferenceBlist( blist1, blist2 ); [ false, true, false, false ]  22.4 Function that Modify Boolean Lists 22.4-1 UniteBlist UniteBlist( blist1, blist2 )  function UniteBlist unites the boolean list blist1 with the boolean list blist2, which must have the same length. This is equivalent to assigning blist1[i] := blist1[i] or blist2[i] for all i. UniteBlist returns nothing, it is only called to change blist1.  Example  gap> blist1 := [ true, true, false, false ];; gap> blist2 := [ true, false, true, false ];; gap> UniteBlist( blist1, blist2 ); gap> blist1; [ true, true, true, false ]  The function UnionBlist (22.3-1) is the nondestructive counterpart to UniteBlist. 22.4-2 UniteBlistList UniteBlistList( list, blist, sub )  function works like UniteBlist(blist,BlistList(list,sub)). As no intermediate blist is created, the performance is better than the separate function calls. 22.4-3 IntersectBlist IntersectBlist( blist1, blist2 )  function intersects the boolean list blist1 with the boolean list blist2, which must have the same length. This is equivalent to assigning blist1[i]:= blist1[i] and blist2[i] for all i. IntersectBlist returns nothing, it is only called to change blist1.  Example  gap> blist1 := [ true, true, false, false ];; gap> blist2 := [ true, false, true, false ];; gap> IntersectBlist( blist1, blist2 ); gap> blist1; [ true, false, false, false ]  The function IntersectionBlist (22.3-2) is the nondestructive counterpart to IntersectBlist. 22.4-4 SubtractBlist SubtractBlist( blist1, blist2 )  function subtracts the boolean list blist2 from the boolean list blist1, which must have equal length. This is equivalent to assigning blist1[i]:= blist1[i] and not blist2[i] for all i. SubtractBlist returns nothing, it is only called to change blist1.  Example  gap> blist1 := [ true, true, false, false ];; gap> blist2 := [ true, false, true, false ];; gap> SubtractBlist( blist1, blist2 ); gap> blist1; [ false, true, false, false ]  The function DifferenceBlist (22.3-3) is the nondestructive counterpart to SubtractBlist. 22.4-5 FlipBlist FlipBlist( blist )  function Changes every entry in blist that equals true to false and vice versa. If blist1 and blist2 are boolean lists with equal length and every value in blist2 is true, then FlipBlist( blist1 ) is equivalent to SubtractBlist( blist2, blist1 ); blist1 := blist2; but FlipBlist is faster, and simpler to type. FlipBlist returns nothing, it is only called to change blist in-place.  Example  gap> blist1 := [ true, true, true, true ];; gap> blist2 := [ true, false, true, false ];; gap> SubtractBlist( blist1, blist2 ); gap> blist1; [ false, true, false, true ] gap> FlipBlist( blist2 ); gap> blist2; [ false, true, false, true ]  22.4-6 SetAllBlist SetAllBlist( blist )  function Changes every entry in blist to true. If blist1 and blist2 are boolean lists with equal length and every value in blist2 is true, then SetAllBlist( blist1 ) is equivalent to UniteBlist( blist1, blist2 ); but is faster, and simpler to type. SetAllBlist returns nothing, it is only called to change blist in-place.  Example  gap> blist1 := [ true, true, true, true ];; gap> blist2 := [ true, false, true, false ];; gap> SetAllBlist( blist1 ); gap> blist1; [ true, true, true, true ] gap> SetAllBlist(blist2); gap> blist2; [ true, true, true, true ]  22.4-7 ClearAllBlist ClearAllBlist( blist )  function Changes every entry in blist to false. If blist1 and blist2 are boolean lists with equal length and every value in blist2 is false, then ClearAllBlist( blist1 ) is equivalent to IntersectBlist( blist1, blist2 ); but is faster, and simpler to type. ClearAllBlist returns nothing, it is only called to change blist in-place.  Example  gap> blist1 := [ true, true, true, true ];; gap> blist2 := [ true, false, true, false ];; gap> ClearAllBlist( blist1 ); gap> blist1; [ false, false, false, false ] gap> ClearAllBlist(blist2); gap> blist2; [ false, false, false, false ]  22.5 More about Boolean Lists We defined a boolean list as a list that has no holes and contains only true and false. There is a special internal representation for boolean lists that needs only 1 bit for each entry. This bit is set if the entry is true and reset if the entry is false. This representation is of course much more compact than the ordinary representation of lists, which needs 32 or 64 bits per entry. Not every boolean list is represented in this compact representation. It would be too much work to test every time a list is changed, whether this list has become a boolean list. This section tells you under which circumstances a boolean list is represented in the compact representation, so you can write your functions in such a way that you make best use of the compact representation. If a dense list containing only true and false is read, it is stored in the compact representation. Furthermore, the results of BlistList (22.2-1), UnionBlist (22.3-1), IntersectionBlist (22.3-2) and DifferenceBlist (22.3-3) are known to be boolean lists by construction, and thus are represented in the compact representation upon creation. If an argument of IsSubsetBlist (22.2-4), ListBlist (22.2-2), UnionBlist (22.3-1), IntersectionBlist (22.3-2), DifferenceBlist (22.3-3), UniteBlist (22.4-1), IntersectBlist (22.4-3) and SubtractBlist (22.4-4) is a list represented in the ordinary representation, it is tested to see if it is in fact a boolean list. If it is not, an error is signalled. If it is, the representation of the list is changed to the compact representation. If you change a boolean list that is represented in the compact representation by assignment (see 21.4) or Add (21.4-2) in such a way that the list remains a boolean list it will remain represented in the compact representation. Note that changing a list that is not represented in the compact representation, whether it is a boolean list or not, in such a way that the resulting list becomes a boolean list, will never change the representation of the list. 22.5-1 IsBlistRep IsBlistRep( obj )  Representation ConvertToBlistRep( blist )  function Returns: true or false The first function is a filter that returns true if the object obj is a boolean list in compact representation and false otherwise, see 22.5. The second function converts the object blist to a boolean list in compact representation and returns true if this is possible. Otherwise blist is unchanged and false is returned.  Example  gap> l := [true, false, true]; [ true, false, true ] gap> IsBlistRep(l); true gap> l := [true, false, 1];  [ true, false, 1 ] gap> l[3] := false; false gap> IsBlistRep(l); false gap> ConvertToBlistRep(l); true