Metamath Proof Explorer

Theorem lmhmclm

Description: The domain of a linear operator is a subcomplex module iff the range is. (Contributed by Mario Carneiro, 21-Oct-2015)

		Ref	Expression
	Assertion	lmhmclm	$⊢ F \in (S LMHom T) \to (S \in CMod \leftrightarrow T \in CMod)$

Proof

Step	Hyp	Ref	Expression
1		lmhmlmod1	$⊢ F \in (S LMHom T) \to S \in LMod$
2		lmhmlmod2	$⊢ F \in (S LMHom T) \to T \in LMod$
3	1 2	2thd	$⊢ F \in (S LMHom T) \to (S \in LMod \leftrightarrow T \in LMod)$
4		eqid	$⊢ Scalar (S) = Scalar (S)$
5		eqid	$⊢ Scalar (T) = Scalar (T)$
6	4 5	lmhmsca	$⊢ F \in (S LMHom T) \to Scalar (T) = Scalar (S)$
7	6	eqcomd	$⊢ F \in (S LMHom T) \to Scalar (S) = Scalar (T)$
8	7	fveq2d	$⊢ F \in (S LMHom T) \to {Base}_{Scalar (S)} = {Base}_{Scalar (T)}$
9	8	oveq2d	$⊢ F \in (S LMHom T) \to ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (S)} = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (T)}$
10	7 9	eqeq12d	$⊢ F \in (S LMHom T) \to (Scalar (S) = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (S)} \leftrightarrow Scalar (T) = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (T)})$
11	8	eleq1d	$⊢ F \in (S LMHom T) \to ({Base}_{Scalar (S)} \in SubRing (ℂ_{fld}) \leftrightarrow {Base}_{Scalar (T)} \in SubRing (ℂ_{fld}))$
12	3 10 11	3anbi123d	$⊢ F \in (S LMHom T) \to ((S \in LMod \land Scalar (S) = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (S)} \land {Base}_{Scalar (S)} \in SubRing (ℂ_{fld})) \leftrightarrow (T \in LMod \land Scalar (T) = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (T)} \land {Base}_{Scalar (T)} \in SubRing (ℂ_{fld})))$
13		eqid	$⊢ {Base}_{Scalar (S)} = {Base}_{Scalar (S)}$
14	4 13	isclm	$⊢ S \in CMod \leftrightarrow (S \in LMod \land Scalar (S) = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (S)} \land {Base}_{Scalar (S)} \in SubRing (ℂ_{fld}))$
15		eqid	$⊢ {Base}_{Scalar (T)} = {Base}_{Scalar (T)}$
16	5 15	isclm	$⊢ T \in CMod \leftrightarrow (T \in LMod \land Scalar (T) = ℂ_{fld} ↾_{𝑠} {Base}_{Scalar (T)} \land {Base}_{Scalar (T)} \in SubRing (ℂ_{fld}))$
17	12 14 16	3bitr4g	$⊢ F \in (S LMHom T) \to (S \in CMod \leftrightarrow T \in CMod)$