then {(the_right_argument_of H)} is Subset of (Subformulae H) by Lm12;
then reconsider Right = {(the_right_argument_of H)} as Subset of (Subformulae v) by A3, XBOOLE_1:1;
{(the_left_argument_of H)} is Subset of (Subformulae H) by A4, Lm12;
then reconsider Left = {(the_left_argument_of H)} as Subset of (Subformulae v) by A3, XBOOLE_1:1;
LTLNew2 H,v = {(the_left_argument_of H),(the_right_argument_of H)} by A2, A4, Def2;
then LTLNew2 H,v = Left \/ Right by ENUMSET1:41;
then A5: len (LTLNew2 H,v) <= (len Left) + (len Right) by Th18;
A6: len H = (1 + (len (the_left_argument_of H))) + (len (the_right_argument_of H)) by A4, MODELC_2:11;
( len Left = len (the_left_argument_of H) & len Right = len (the_right_argument_of H) ) by Th14;
hence len (LTLNew2 H,v) <= (len H) - 1 by A6, A5; :: thesis: verum

then LTLNew2 H,v = {(the_right_argument_of H)} by A2, Def2;
then len (LTLNew2 H,v) = len (the_right_argument_of H) by Th14;
then A8: (len (LTLNew2 H,v)) + 0 <= (len (the_left_argument_of H)) + (len (the_right_argument_of H)) by XREAL_1:9;
len H = (1 + (len (the_left_argument_of H))) + (len (the_right_argument_of H)) by A7, MODELC_2:11;
hence len (LTLNew2 H,v) <= (len H) - 1 by A8; :: thesis: verum

1 <= len H by MODELC_2:3;
then A10: 1 - 1 <= (len H) - 1 by XREAL_1:11;
LTLNew2 H,v = {} v by A2, A9, Def2;
hence len (LTLNew2 H,v) <= (len H) - 1 by A10, Th13; :: thesis: verum

1 <= len H by MODELC_2:3;
then A12: 1 - 1 <= (len H) - 1 by XREAL_1:11;
LTLNew2 H,v = {} v by A2, A11, Def2;
hence len (LTLNew2 H,v) <= (len H) - 1 by A12, Th13; :: thesis: verum