let k be Nat; :: thesis: for d being non zero Nat
for G being Grating of d holds del (0_ ((k + 1),G)) = 0_ (k,G)
let d be non zero Nat; :: thesis: for G being Grating of d holds del (0_ ((k + 1),G)) = 0_ (k,G)
let G be Grating of d; :: thesis: del (0_ ((k + 1),G)) = 0_ (k,G)
now :: thesis: for A being Cell of k,G holds
( A in del (0_ ((k + 1),G)) iff A in 0_ (k,G) )
let A be Cell of k,G; :: thesis: ( A in del (0_ ((k + 1),G)) iff A in 0_ (k,G) )
card ((star A) /\ (0_ ((k + 1),G))) = 2 * 0 ;
hence ( A in del (0_ ((k + 1),G)) iff A in 0_ (k,G) ) by Th48; :: thesis: verum
end;
hence del (0_ ((k + 1),G)) = 0_ (k,G) by SUBSET_1:3; :: thesis: verum