bdopcoi

Description: The composition of two bounded linear operators is bounded. (Contributed by NM, 9-Mar-2006) (New usage is discouraged.)

Step	Hyp	Ref	Expression
1		nmoptri.1	\|- S e. BndLinOp
2		nmoptri.2	\|- T e. BndLinOp
3		bdopln	\|- ( S e. BndLinOp -> S e. LinOp )
4	1 3	ax-mp	\|- S e. LinOp
5		bdopln	\|- ( T e. BndLinOp -> T e. LinOp )
6	2 5	ax-mp	\|- T e. LinOp
7	4 6	lnopcoi	\|- ( S o. T ) e. LinOp
8	4	lnopfi	\|- S : ~H --> ~H
9	6	lnopfi	\|- T : ~H --> ~H
10	8 9	hocofi	\|- ( S o. T ) : ~H --> ~H
11		nmopxr	\|- ( ( S o. T ) : ~H --> ~H -> ( normop ` ( S o. T ) ) e. RR* )
12	10 11	ax-mp	\|- ( normop ` ( S o. T ) ) e. RR*
13		nmopre	\|- ( S e. BndLinOp -> ( normop ` S ) e. RR )
14	1 13	ax-mp	\|- ( normop ` S ) e. RR
15		nmopre	\|- ( T e. BndLinOp -> ( normop ` T ) e. RR )
16	2 15	ax-mp	\|- ( normop ` T ) e. RR
17	14 16	remulcli	\|- ( ( normop ` S ) x. ( normop ` T ) ) e. RR
18		nmopgtmnf	\|- ( ( S o. T ) : ~H --> ~H -> -oo < ( normop ` ( S o. T ) ) )
19	10 18	ax-mp	\|- -oo < ( normop ` ( S o. T ) )
20	1 2	nmopcoi	\|- ( normop ` ( S o. T ) ) <_ ( ( normop ` S ) x. ( normop ` T ) )
21		xrre	\|- ( ( ( ( normop ` ( S o. T ) ) e. RR* /\ ( ( normop ` S ) x. ( normop ` T ) ) e. RR ) /\ ( -oo < ( normop ` ( S o. T ) ) /\ ( normop ` ( S o. T ) ) <_ ( ( normop ` S ) x. ( normop ` T ) ) ) ) -> ( normop ` ( S o. T ) ) e. RR )
22	12 17 19 20 21	mp4an	\|- ( normop ` ( S o. T ) ) e. RR
23		elbdop2	\|- ( ( S o. T ) e. BndLinOp <-> ( ( S o. T ) e. LinOp /\ ( normop ` ( S o. T ) ) e. RR ) )
24	7 22 23	mpbir2an	\|- ( S o. T ) e. BndLinOp

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