Metamath Proof Explorer

Definition df-rrv

Description: In its generic definition, a random variable is a measurable function from a probability space to a Borel set. Here, we specifically target real-valued random variables, i.e. measurable function from a probability space to the Borel sigma-algebra on the set of real numbers. (Contributed by Thierry Arnoux, 20-Sep-2016) (Revised by Thierry Arnoux, 25-Jan-2017)

		Ref	Expression
	Assertion	df-rrv	$⊢ {RndVar}_{ℝ} = (p \in Prob ⟼ dom p {MblFn}_{μ} 𝔅_{ℝ})$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		crrv	$class {RndVar}_{ℝ}$
1		vp	$setvar p$
2		cprb	$class Prob$
3	1	cv	$setvar p$
4	3	cdm	$class dom p$
5		cmbfm	$class {MblFn}_{μ}$
6		cbrsiga	$class 𝔅_{ℝ}$
7	4 6 5	co	$class (dom p {MblFn}_{μ} 𝔅_{ℝ})$
8	1 2 7	cmpt	$class (p \in Prob ⟼ dom p {MblFn}_{μ} 𝔅_{ℝ})$
9	0 8	wceq	$wff {RndVar}_{ℝ} = (p \in Prob ⟼ dom p {MblFn}_{μ} 𝔅_{ℝ})$