Definition:Space of Measurable Functions/Real-Valued
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Definition
Let $\struct {X, \Sigma}$ be a measurable space.
Then the space of $\Sigma$-measurable, real-valued functions $\map \MM {X, \Sigma, \R}$ is the set of all $\Sigma$-measurable, real-valued functions.
That is:
- $\map \MM {X, \Sigma, \R} := \set {f: X \to \R: f \text{ is $\Sigma$-measurable} }$
Also see
Sources
- 2005: René L. Schilling: Measures, Integrals and Martingales ... (previous) ... (next): $8.4$