Metamath Proof Explorer

Theorem honegsub

Description: Relationship between Hilbert space operator addition and subtraction. (Contributed by NM, 24-Aug-2006) (New usage is discouraged.)

Ref Expression
Assertion honegsub T:U:T+op-1·opU=T-opU

Proof

Step Hyp Ref Expression
1 oveq1 T=ifT:T0hopT+op-1·opU=ifT:T0hop+op-1·opU
2 oveq1 T=ifT:T0hopT-opU=ifT:T0hop-opU
3 1 2 eqeq12d T=ifT:T0hopT+op-1·opU=T-opUifT:T0hop+op-1·opU=ifT:T0hop-opU
4 oveq2 U=ifU:U0hop-1·opU=-1·opifU:U0hop
5 4 oveq2d U=ifU:U0hopifT:T0hop+op-1·opU=ifT:T0hop+op-1·opifU:U0hop
6 oveq2 U=ifU:U0hopifT:T0hop-opU=ifT:T0hop-opifU:U0hop
7 5 6 eqeq12d U=ifU:U0hopifT:T0hop+op-1·opU=ifT:T0hop-opUifT:T0hop+op-1·opifU:U0hop=ifT:T0hop-opifU:U0hop
8 ho0f 0hop:
9 8 elimf ifT:T0hop:
10 8 elimf ifU:U0hop:
11 9 10 honegsubi ifT:T0hop+op-1·opifU:U0hop=ifT:T0hop-opifU:U0hop
12 3 7 11 dedth2h T:U:T+op-1·opU=T-opU