let i, j, m, n be Nat; :: thesis: for f being constant standard special_circular_sequence st 1 <= i & i <= j & j < m & m <= n & n <= len f & ( 1 < i or n < len f ) holds
L~ (mid (f,i,j)) misses L~ (mid (f,m,n))
let f be constant standard special_circular_sequence; :: thesis: ( 1 <= i & i <= j & j < m & m <= n & n <= len f & ( 1 < i or n < len f ) implies L~ (mid (f,i,j)) misses L~ (mid (f,m,n)) )
assume that
A1: ( 1 <= i & i <= j ) and
A2: j < m and
A3: m <= n and
A4: n <= len f and
A5: ( 1 < i or n < len f ) ; :: thesis: L~ (mid (f,i,j)) misses L~ (mid (f,m,n))
set A = { (LSeg (f,k)) where k is Nat : ( i <= k & k < j ) } ;
set B = { (LSeg (f,l)) where l is Nat : ( m <= l & l < n ) } ;
1 <= j by A1, XXREAL_0:2;
then 1 < m by A2, XXREAL_0:2;
then A6: L~ (mid (f,m,n)) = union { (LSeg (f,l)) where l is Nat : ( m <= l & l < n ) } by A3, A4, Th14;
A7: for x, y being set st x in { (LSeg (f,k)) where k is Nat : ( i <= k & k < j ) } & y in { (LSeg (f,l)) where l is Nat : ( m <= l & l < n ) } holds
x misses y m <= len f by A3, A4, XXREAL_0:2;
then j < len f by A2, XXREAL_0:2;
then L~ (mid (f,i,j)) = union { (LSeg (f,k)) where k is Nat : ( i <= k & k < j ) } by A1, Th14;
hence L~ (mid (f,i,j)) misses L~ (mid (f,m,n)) by A6, A7, ZFMISC_1:126; :: thesis: verum