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Let M be the space of measurable functions in Ω.
If are measurable functions in then for (2.18).
Let ({psi_{j}}_{j=1}^{infty}) be a sequence of measurable functions in ((0,T)).
(i) (B^((0,1))) is the set of nonnegative measurable functions in ((0,1)).
(B^((0,1))) is the set of nonnegative measurable functions in ((0,1)).
For each where denotes the set of all measurable functions in there exists such that is -mixing.
Similar(44)
Let u be a nonnegative measurable function in (Omega ) such that all its positive level sets have finite measure.
Similar statements can be made about a measurable function in $\mathbb R^n$.
If,,,, and is a nonnegative measurable function in, then we have (2.10).
If is an analytic self-map of and is a nonnegative measurable function in, then (2.15).
If is a measurable function in such that for any and then call the homogeneous function of -degree in.
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Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com