focofob

Description: If the domain of a function G equals the range of a function F , then the composition ( G o. F ) is surjective iff G and F as function to the domain of G are both surjective. Symmetric version of fnfocofob including the fact that F is a surjection onto its range. (Contributed by GL and AV, 20-Sep-2024) (Proof shortened by AV, 29-Sep-2024)

		Ref	Expression
	Assertion	focofob	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> ( ( G o. F ) : A -onto-> D <-> ( F : A -onto-> C /\ G : C -onto-> D ) ) )

Proof

Step	Hyp	Ref	Expression
1		ffn	\|- ( F : A --> B -> F Fn A )
2		fnfocofob	\|- ( ( F Fn A /\ G : C --> D /\ ran F = C ) -> ( ( G o. F ) : A -onto-> D <-> G : C -onto-> D ) )
3	1 2	syl3an1	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> ( ( G o. F ) : A -onto-> D <-> G : C -onto-> D ) )
4		dffn4	\|- ( F Fn A <-> F : A -onto-> ran F )
5	1 4	sylib	\|- ( F : A --> B -> F : A -onto-> ran F )
6	5	3ad2ant1	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> F : A -onto-> ran F )
7		foeq3	\|- ( ran F = C -> ( F : A -onto-> ran F <-> F : A -onto-> C ) )
8	7	3ad2ant3	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> ( F : A -onto-> ran F <-> F : A -onto-> C ) )
9	6 8	mpbid	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> F : A -onto-> C )
10	9	biantrurd	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> ( G : C -onto-> D <-> ( F : A -onto-> C /\ G : C -onto-> D ) ) )
11	3 10	bitrd	\|- ( ( F : A --> B /\ G : C --> D /\ ran F = C ) -> ( ( G o. F ) : A -onto-> D <-> ( F : A -onto-> C /\ G : C -onto-> D ) ) )

Metamath Proof Explorer

Theorem focofob

Proof