27. Regular measures. Consider the probability space (R, B(Rk), P). A Borelset A is regular ifP(A) = inf(P(G) : G Ɔ A, G open,}andP(A) = sup(P(F) : FCA, F closed.)P is regular if all Borel sets are regular. Define C to be the collection ofregular sets.(a) Show Rk E C, ØE C.(b) Show C is closed under complements and countable unions.(c) Let F(R) be the closed subsets of Rk. ShowF(R*) CC.(d) Show B(R) C C; that is, show regularity.(e) For any Borel set AP(A) = sup{P(K): K CA, K compact.)

Answered: Image /qna-images/answer/f1c8d096-3119-4291-a950-268e91bbe367.jpg

P is regular if all Borel sets are regular. Define C to be the collection of regular sets. (a) Show R e C, Ø e C. (b) Show C is closed under complements and countable unions. (c) Let F(R) be the closed subsets of Rk. Show

P is regular if all Borel sets are regular. Define C to be the collection of regular sets. (a) Show R e C, Ø e C. (b) Show C is closed under complements and countable unions. (c) Let F(R) be the closed subsets of Rk. Show

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.7: Distinguishable Permutations And Combinations

Problem 29E

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Question

27. Regular measures. Consider the probability space (R, B(Rk), P). A Borel
set A is regular if
P(A) = inf(P(G) : G Ɔ A, G open,}
and
P(A) = sup(P(F) : FCA, F closed.)
P is regular if all Borel sets are regular. Define C to be the collection of
regular sets.
(a) Show Rk E C, ØE C.
(b) Show C is closed under complements and countable unions.
(c) Let F(R) be the closed subsets of Rk. Show
F(R*) CC.
(d) Show B(R) C C; that is, show regularity.
(e) For any Borel set A
P(A) = sup{P(K): K CA, K compact.)

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