let M be Pnet; :: thesis: ( ((Flow M) | the carrier' of M) * ((Flow M) | the carrier' of M) = {} & (((Flow M) ~) | the carrier' of M) * (((Flow M) ~) | the carrier' of M) = {} & ((Flow M) | the carrier' of M) * (((Flow M) ~) | the carrier' of M) = {} & (((Flow M) ~) | the carrier' of M) * ((Flow M) | the carrier' of M) = {} & ((Flow M) | the carrier of M) * ((Flow M) | the carrier of M) = {} & (((Flow M) ~) | the carrier of M) * (((Flow M) ~) | the carrier of M) = {} & ((Flow M) | the carrier of M) * (((Flow M) ~) | the carrier of M) = {} & (((Flow M) ~) | the carrier of M) * ((Flow M) | the carrier of M) = {} )
A1: rng ((Flow M) | the carrier' of M) misses dom ((Flow M) | the carrier' of M) by Th10;
A2: rng (((Flow M) ~) | the carrier' of M) misses dom (((Flow M) ~) | the carrier' of M) by Th10;
A3: rng ((Flow M) | the carrier' of M) misses dom (((Flow M) ~) | the carrier' of M) by Th10;
A4: rng (((Flow M) ~) | the carrier' of M) misses dom ((Flow M) | the carrier' of M) by Th10;
A5: rng ((Flow M) | the carrier of M) misses dom ((Flow M) | the carrier of M) by Th10;
A6: rng (((Flow M) ~) | the carrier of M) misses dom (((Flow M) ~) | the carrier of M) by Th10;
A7: rng ((Flow M) | the carrier of M) misses dom (((Flow M) ~) | the carrier of M) by Th10;
rng (((Flow M) ~) | the carrier of M) misses dom ((Flow M) | the carrier of M) by Th10;
hence ( ((Flow M) | the carrier' of M) * ((Flow M) | the carrier' of M) = {} & (((Flow M) ~) | the carrier' of M) * (((Flow M) ~) | the carrier' of M) = {} & ((Flow M) | the carrier' of M) * (((Flow M) ~) | the carrier' of M) = {} & (((Flow M) ~) | the carrier' of M) * ((Flow M) | the carrier' of M) = {} & ((Flow M) | the carrier of M) * ((Flow M) | the carrier of M) = {} & (((Flow M) ~) | the carrier of M) * (((Flow M) ~) | the carrier of M) = {} & ((Flow M) | the carrier of M) * (((Flow M) ~) | the carrier of M) = {} & (((Flow M) ~) | the carrier of M) * ((Flow M) | the carrier of M) = {} ) by A1, A2, A3, A4, A5, A6, A7, RELAT_1:44; :: thesis: verum