df-mfrel

Description: Define the set of freshness relations. (Contributed by Mario Carneiro, 14-Jul-2016)

		Ref	Expression
	Assertion	df-mfrel	$⊢ mFRel = (t \in V ⟼ \{r \in 𝒫 (mUV (t) \times mUV (t)) \| (r^{-1} = r \land \forall c \in mVT (t) \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}])\})$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cmfr	$class mFRel$
1		vt	$setvar t$
2		cvv	$class V$
3		vr	$setvar r$
4		cmuv	$class mUV$
5	1	cv	$setvar t$
6	5 4	cfv	$class mUV (t)$
7	6 6	cxp	$class (mUV (t) \times mUV (t))$
8	7	cpw	$class 𝒫 (mUV (t) \times mUV (t))$
9	3	cv	$setvar r$
10	9	ccnv	$class r^{-1}$
11	10 9	wceq	$wff r^{-1} = r$
12		vc	$setvar c$
13		cmvt	$class mVT$
14	5 13	cfv	$class mVT (t)$
15		vw	$setvar w$
16	6	cpw	$class 𝒫 mUV (t)$
17		cfn	$class Fin$
18	16 17	cin	$class (𝒫 mUV (t) \cap Fin)$
19		vv	$setvar v$
20	12	cv	$setvar c$
21	20	csn	$class \{c\}$
22	6 21	cima	$class mUV (t) [\{c\}]$
23	15	cv	$setvar w$
24	19	cv	$setvar v$
25	24	csn	$class \{v\}$
26	9 25	cima	$class r [\{v\}]$
27	23 26	wss	$wff w \subseteq r [\{v\}]$
28	27 19 22	wrex	$wff \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}]$
29	28 15 18	wral	$wff \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}]$
30	29 12 14	wral	$wff \forall c \in mVT (t) \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}]$
31	11 30	wa	$wff (r^{-1} = r \land \forall c \in mVT (t) \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}])$
32	31 3 8	crab	$class \{r \in 𝒫 (mUV (t) \times mUV (t)) \| (r^{-1} = r \land \forall c \in mVT (t) \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}])\}$
33	1 2 32	cmpt	$class (t \in V ⟼ \{r \in 𝒫 (mUV (t) \times mUV (t)) \| (r^{-1} = r \land \forall c \in mVT (t) \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}])\})$
34	0 33	wceq	$wff mFRel = (t \in V ⟼ \{r \in 𝒫 (mUV (t) \times mUV (t)) \| (r^{-1} = r \land \forall c \in mVT (t) \forall w \in (𝒫 mUV (t) \cap Fin) \exists v \in mUV (t) [\{c\}] w \subseteq r [\{v\}])\})$

Metamath Proof Explorer

Definition df-mfrel

Detailed syntax breakdown