Metamath Proof Explorer

Theorem norm3lem

Description: Lemma involving norm of differences in Hilbert space. (Contributed by NM, 18-Aug-1999) (New usage is discouraged.)

Ref Expression
Hypotheses norm3dif.1 A
norm3dif.2 B
norm3dif.3 C
norm3lem.4 D
Assertion norm3lem normA-C<D2normC-B<D2normA-B<D

Proof

Step Hyp Ref Expression
1 norm3dif.1 A
2 norm3dif.2 B
3 norm3dif.3 C
4 norm3lem.4 D
5 1 2 3 norm3difi normA-BnormA-C+normC-B
6 1 3 hvsubcli A-C
7 6 normcli normA-C
8 3 2 hvsubcli C-B
9 8 normcli normC-B
10 4 rehalfcli D2
11 7 9 10 10 lt2addi normA-C<D2normC-B<D2normA-C+normC-B<D2+D2
12 1 2 hvsubcli A-B
13 12 normcli normA-B
14 7 9 readdcli normA-C+normC-B
15 10 10 readdcli D2+D2
16 13 14 15 lelttri normA-BnormA-C+normC-BnormA-C+normC-B<D2+D2normA-B<D2+D2
17 5 11 16 sylancr normA-C<D2normC-B<D2normA-B<D2+D2
18 10 recni D2
19 18 2timesi 2D2=D2+D2
20 4 recni D
21 2cn 2
22 2ne0 20
23 20 21 22 divcan2i 2D2=D
24 19 23 eqtr3i D2+D2=D
25 17 24 breqtrdi normA-C<D2normC-B<D2normA-B<D