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第4回 確率・統計の基礎勉強会
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setten-QB
March 25, 2017
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第4回 確率・統計の基礎勉強会
研究室のM1向け勉強会のスライド
setten-QB
March 25, 2017
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Transcript
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ
ాத ণ (@setten QB) ಸྑઌՊֶٕज़େֶӃେֶ ใՊֶݚڀՊɹɹೳίϛϡχέʔγϣϯݚڀࣨ Ϗοάσʔλάϧʔϓ March 25, 2017 ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 1 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 1 Introduction 2 Ծઆݕఆ 3
2 छྨͷաޡͱݕग़ྗؔ 4 ࠷ڧྗݕఆͷߏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 2 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ౷ܭతݕఆ • ౷ܭతਪఆཧͱڞʹ౷ܭతਪଌཧͷ 2 େபΛ͢
• “ͳΜͪΌͬͯ౷ܭֶ”ͷߨٛͰݕఆͷΓํ͚ͩڭ͑Δॴ͋Δ Β͍͠ • ඪຊ͕ै͏֬ʹؔ͢Δ໋ (͜ΕΛԾઆͱݺͿ) ͕ਖ਼͍͠ͷ͔Λ σʔλʹج͍ͮͯஅ͢Δํ๏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 3 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 1 Introduction 2 Ծઆݕఆ 3
2 छྨͷաޡͱݕग़ྗؔ 4 ࠷ڧྗݕఆͷߏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 4 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ Ծઆݕఆ • લճͷ౷ܭతਪఆཧͱಉ༷ͷԾఆΛ͓͘ ౷ܭతਪଌͷجຊతઃఆ ඪຊ
X1, . . . , Xn iid ∼ f(x; θ) ʹج͖ͮɼਪఆྔ θ = θ(X1, . . . , Xn) Ͱ θ Λਪఆ͢Δɽ • f(x, θ) ͷະύϥϝʔλ θ ʹؔ͢ΔԾઆΛɼσʔλʹج͍ͮͯغ٫͢ Δ͔൱͔Λܾఆ͢Δ͜ͱΛ౷ܭతݕఆͱ͍͏ • ύϥϝʔλ θ ؚ͕·ΕΔۭؒΛ Θ Ͱද͢ • Θ0, Θ1 ⊂ Θ ͕ Θ0, Θ1 ̸= ∅, Θ1 ∩ Θ1 = ∅, Θ0 ∪ Θ1 = Θ ͱ͢Δ • ҰൠతʹԾઆ • ؼແԾઆ (null hypothesis) H0 : θ ∈ Θ0 • ରཱԾઆ (alternative hypothesis) H1 : θ1 ∈ Θ1 Ͱߏ͞ΕΔ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 5 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ Ծઆݕఆ • null hypothesis ʹغ٫͍ͨ͠ԾઆΛ͓͘ͷ͕ී௨
• null hypothesis ͷඪຊͷΑ͏ͳσʔλ͕ಘΒΕΔ֬Λߟ͑ɼͦͷΑ ͏ͳ͜ͱ͕ “ى͜Γʹ͍͘”ͱߟ͑ͨ࣌ɼnull hypothesis Λ reject ͢Δ • null hypothesis Λ reject ग़དྷͨͱ͖ɼͦΕͱରཱ͢Δ alternative hypothesis Λ accept ͢Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 6 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ౷ܭతԾઆݕఆͷྫ ⃝ ൪͘͡ ςϥγϚ܅ɼίϯϏχͰߦΘΕ͍ͯΔ͘͡Ҿ͖ʹߦͬͨɽ൴ͷૂ ͍
A ͷσϏϧʔΫͷԦঁͷϑΟΪϡΞͰɼͦΕҎ֎ʹڵຯ ͳ͍ɽެࣜʹΑΔͱ 60 ຕͷΫδͷதʹ 2 ຕͷׂ߹Ͱ A ͕ೖͬ ͍ͯΔͱ͍͏ɽͨͩ͠ɼ͜ͷίϯϏχಛघͰɼͨΓͱϋζϨͷׂ ߹͕ৗʹҰఆʹͳΔΑ͏ʹ٬͕͘͡ΛҾͨ͘ͼʹ৽͍͠ΫδΛՃ ͢ΔɽςϥγϚ͘Μ 1 ϲ݄ͷֶۚΛͭ͗ࠐΜͰ 200 ຕͷΫδ ΛҾ͍ͨɽ͔͠͠ɼA 1 ຕ͔͠Ҿ͚ͳ͔ͬͨɽ͜ͷίϯϏχ ΠϯνΩΛ͍ͯ͠Δͱݴ͑Δ͔ʁ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 7 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ౷ܭతԾઆݕఆͷྫ • A ΛҾ֬͘Λ p
ͱ͢Δ • ΠϯνΩΛ͍ͯ͠Δͱओு͍ͨ͠ςϥγϚ܅ཱ͕ͯΔԾઆ H0 : p = 1/30 vs H1 : p ̸= 1/30 • θ = p, Θ = (0, 1), Θ0 = { 1/30 } , Θ1 = (0, 1) − { 1/30 } • ςϥγϚ܅͕Ҿ͍ͨ͘͡ X1, . . . , X200 iid ∼ B(1, p) ͷ࣮ݱͱߟ͑Β ΕΔ • ͨͩ͠ɼA Λ 1ɼͦΕҎ֎Λ 0 ͱ͢Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 8 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ౷ܭతԾઆݕఆͷྫ • A ΛҾ͘ຕΛ Y
ͱ͢Δͱɼ Y = 200 ∑ i=1 ∼ B(200, p) Ͱ͋Δ • Αͬͯɼ1 ճ͔͠ A ΛҾ͔ͳ͍֬ P(Y = 1) = ( 200 1 ) p1(1 − p)199 ͱॻ͚Δ • H0 ͕ਖ਼͍͠ͱ͍͏ԾఆͷͱͰɼP(Y = 1) = 0.00783 ͱͳΔ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 9 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ౷ܭతԾઆݕఆͷྫ • ͜͜·ͰͷٞͰɼH0 ͕ਅͰ͋ΔͱԾఆ͢Δͱʮ200 ຕҾ͍ͯ
A ͕ 1 ճ͔ͨ͠Βͳ͍ʯͱ͍͏ঢ়گ͕ى͜Δ֬ 1% ʹຬͨͳ͍͜ͱ ʹͳΔ • ͜ͷΑ͏ͳح͕ى͜ΔΑΓɼH0 ͕͓͔͍͠ͱ͢Δ΄͏͕ࣗવͰ ͋Δ • ͕ͨͬͯ͠ɼH0 Λ reject ͠ H1 Λ accept ͢Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 10 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ౷ܭతԾઆݕఆͷྫ • ͜͜·ͰͷٞͰɼH0 ͕ਅͰ͋ΔͱԾఆ͢Δͱʮ200 ຕҾ͍ͯ
A ͕ 1 ճ͔ͨ͠Βͳ͍ʯͱ͍͏ঢ়گ͕ى͜Δ֬ 1% ʹຬͨͳ͍͜ͱ ʹͳΔ • ͜ͷΑ͏ͳح͕ى͜ΔΑΓɼH0 ͕͓͔͍͠ͱ͢Δ΄͏͕ࣗવͰ ͋Δ • ͕ͨͬͯ͠ɼH0 Λ reject ͠ H1 Λ accept ͢Δ ͭ·Γ౷ܭֶతʹߟ͑ͯɼ͜ͷίϯϏχΠϯνΩΛ͍ͯ͠Δ! ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 10 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ غ٫Ҭ • Ծઆݕఆ · ·
· • ूஂ͔Βͷແ࡞ҝඪຊ X = [X1 , . . . , Xn ] ͷऔΓ͏Δͷू߹ͷ ෦ू߹ C ΛఆΊΔ • X ͷ࣮ݱ͕ C ʹଐ͢Δ࣌ʹ H0 Λغ٫͢Δ ͱ͍͏ϧʔϧͰߏ͞Ε͍ͯΔ • ʮX ͕ͲͷΑ͏ͳΛऔΕ H0 Λغ٫͢Δ͔ʁʯͱ͍͏ϧʔϧΛܾ ΊΔ͜ͱ͕ݕఆΛߏ͢Δͱ͍͏͜ͱ • ্هͷ C Λݕఆͷغ٫ҬͱݺͿ • ʮ“ྑ͍” غ٫ҬΛͲͷΑ͏ʹܾΊΔͷ͔ʁ͕ʯͱͳΔ • ͳ͓ɼH0 Λغ٫ग़དྷͳ͔͔ͬͨΒͱݴͬͯɼH0 Λੵۃతʹࢧ࣋͢Δ Θ͚Ͱͳ͍͜ͱʹҙ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 11 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 1 Introduction 2 Ծઆݕఆ 3
2 छྨͷաޡͱݕग़ྗؔ 4 ࠷ڧྗݕఆͷߏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 12 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 2 छྨͷաޡ • ʮओு A
͕ਖ਼͍͠ͷ͔ʁʯͱ͍͏ࣄΛஅ͢Δঢ়گΛߟ͑Δ • ͜ͷΑ͏ͳঢ়گʹ͓͍ͯɼඞͣද 1 ʹࣔ͢Α͏ͳޡΓ͕ى͜ΓಘΔ Table: 2 छྨͷաޡ ਅ࣮ H0 H1 H0 ⃝ Type II Error ஈ H1 Type I Error ⃝ • θ ∈ Θ0 ͭ·Γ H0 ཱ͕͍ͯ͠ΔԼͰͷࣄ A ͷ֬Λ Pθ(A), Pθ(A|θ ∈ Θ0), Pθ(A|H0) ͳͲͰද͢ 1 • Type I Error, Type II Error ͷ֬ͦΕͧΕ Pθ(X / ∈ C|H0), Pθ(X ∈ C|H1) ͱॻ͚Δ 1͖݅֬Ͱͳ͍͜ͱʹҙ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 13 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ݕग़ྗ ݕग़ྗؔ ؔ β :
θ → [0, 1] Λ β(θ) = Pθ (X ∈ C) (1) ͰఆΊɼݕఆͷݕग़ྗؔͱ͍͏ɽಛʹɼθ1 ∈ Θ1 ͷͱ͖ β(θ1) Λ θ1 ʹର͢Δݕఆͷݕग़ྗ (Power) ͱ͍͏ɽ • ݕग़ྗ H1 ͕ਅͷ࣌ʹɼH0 Λਖ਼͘͠غ٫Ͱ͖Δ֬Λද͍ͯ͠Δ • Type I Error ͷ֬ β(θ), θ ∈ Θ0 • Type II Error ͷ֬ 1 − β(θ), θ ∈ Θ1 ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 14 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ݕఆؔ ݕఆؔ X = [X1,
. . . , Xn] ͷ࣮ݱ x = [x1, . . . , xn] ͷؔ φ (x) = 1{ X∈C } = { 1 (x ∈ C) 0 (x / ∈ C) Λݕఆؔͱ͍͏ɽ • ݕఆؔͷ͜ͱΛݕఆͱ͍͏͜ͱ͋Δ • ݕఆؔΛ໌ࣔ͢Δ͜ͱΛݕఆΛߏ͢Δͱ͍͏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 15 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ݕఆͷߏྫ ݕఆͷߏͱաޡͷ֬ ֬ม X ͷ͕ؔ
Fθ(x) = 1 − exp(−θx) Ͱ͋Δͱ͖ɼ H0 : θ = 1 vs H1 : θ > 1 ͷݕఆΛߟ͑ΔɽݕఆؔΛ φ(x) = { 1 (x > 2) 0 (x ≤ 2) ͱ͢ΔɽҎԼͷʹ͑Αɽ (1) Tyepe II Error ͷ֬ΛٻΊɼθ ʹ͍ͭͯͷάϥϑΛඳ͚ɽ (2) Type I Error ͷ֬ΛٻΊΑɽ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 16 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ݕఆͷߏྫ (1). ·ͣɼغ٫Ҭ C =
{ x | x > 2 }ɽΑͬͯɼType II Error ͷ֬ P(X / ∈ C|H1) =P(X ≤ 2|θ > 1) =Fθ(2) =1 − exp(−2θ) (θ > 1). (2). Type I Error ͷ֬ P(X ∈ C|H0) =P(X > 2|θ = 1) =1 − F1(2) = exp(2). ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 17 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 1 Introduction 2 Ծઆݕఆ 3
2 छྨͷաޡͱݕग़ྗؔ 4 ࠷ڧྗݕఆͷߏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 18 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 2 छྨͷ Error ֬ •
Type I Error ͷ֬ͱ Type II Error ͷ֬Λখ͍ͨ͘͞͠ • ͔͠͠ɼ2 ͭͷ֬Λಉ࣌ʹ࠷খԽग़དྷͳ͍ • ͰͲ͏͢Δͷ͔ʁ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 19 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ 2 छྨͷ Error ֬ •
Type I Error ͷ֬ͱ Type II Error ͷ֬Λখ͍ͨ͘͞͠ • ͔͠͠ɼ2 ͭͷ֬Λಉ࣌ʹ࠷খԽग़དྷͳ͍ • ͰͲ͏͢Δͷ͔ʁ P (X ∈ C|θ ∈ Θ1) ≤ α ͷԼͰ Pθ (X ∈ C|θ ∈ Θ1) Λ࠷େԽ͢ΔΑ͏ͳݕ ఆΛߏ͢Δ! • ఆ α લܾͬͯΊ͓ͯ͘ఆͰɼ“༗ҙਫ४” ͱ͍͏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 19 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ࠷ڧྗݕఆ ࠷ڧྗݕఆ • Φα =
{ φ | Eθ [φ (X)] , θ ∈ Θ0 } • θ1 ∈ Θ1 β(θ) Λ࠷େʹ͢Δ φ ∈ Φα Λɼ༗ҙਫ४ α ͷ θ = θ1 ʹର͢Δ࠷ڧ ྗݕఆ (Most Powerful Test; MP ݕఆ) ͱ͍͏ɽ∀θ ∈ Θ1 Ͱ β(θ) Λ ࠷େʹ͢Δ φ ∈ Φα ΛҰ༷࠷ڧྗݕఆ (Uniformly MP ݕఆ) ͱ͍͏ɽ • Ұ༷࠷ڧྗݕఆ͕ଘࡏ͢ΕɼଞͷݕఆΛߏ͢Δඞཁͳ͍ • ͰɼҰ༷࠷ڧྗݕఆͲͷΑ͏ʹߏ͞ΕΔͷ͔? ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 20 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ Neyman-Pearson ͷجຊఆཧ ωΠϚϯɾϐΞιϯͷجຊఆཧ X1, .
. . Xn iid ∼ f(x; θ) ͱ͢Δɽݕఆ H0 : θ = θ0 vs H1 : θ = θ1 Λߟ͑Δɽf0(x) = ∏ n i=1 f(x; θ0), f1(x) = ∏ n i=1 f(x; θ1), ͱ͢Δ ͱɼ༗ҙਫ४ α (0 < α < 1) ͷ MP ݕఆ ϕ (x) = 1 (f1(x) > kf0(x)) γ (f1(x) = kf0(x)) 0 (f1(x) ≤ kf0(x)) Ͱ༩͑ΒΕΔɽ͜͜Ͱ k, γ Eθ0 [φ (X)] = α Λຬͨ͢ఆ (k ≥ 0, 0 ≤ γ ≤ 1) Ͱ͋Δɽ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 21 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ൺ ൺ H0, H1 ͷԼͰͷ
p.d.f. (p.m.f.) ͷൺ Λ (x) = f1 (x) f0 (x) Λൺͱ͍͏ɽ • Neyman-Peason ͷجຊఆཧɼൺʹج͍ͮͯ MP ݕఆ͕ߏ͞Ε Δ͜ͱΛ͍ࣔͯ͠Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 22 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ MP ݕఆͷߏྫ –ਖ਼نΛྫʹ–
X1, . . . , Xn iid ∼ N ( µ, σ2 ) ɼσ2ɿطɼµɿະͱ͍͏ঢ়گͰɼݕఆ H0 : µ = µ0 vs H1 : µ = µ1 > µ0 Λߟ͑Δɽ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 23 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ H0 ͷԼͰͷ j.p.d.f.
f0 (x) = ( 1 √ 2πσ2 )n exp [ − 1 2σ2 n ∑ i=1 (xi − µ0 )2 ] H1 ͷԼͰͷ j.p.d.f. f1 (x) = ( 1 √ 2πσ2 )n exp [ − 1 2σ2 n ∑ i=1 (xi − µ1 )2 ] Ͱ͋Δ͔Βɼൺ Λ (x) = exp [ − 1 2σ2 n ∑ i=1 (xi − µ1 )2 + 1 2σ2 n ∑ i=1 (xi − µ1 )2 ] = exp [ n (µ1 − µ0 ) σ2 x − n ( µ2 1 − µ2 0 )] ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 24 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ X1, . .
. , Xn C-type ͳͷͰ φ (x) = { 1 Λ (x) > k 0 Λ (x) < k ͕࠷ڧྗݕఆͰ͋ΔɽΛ (x) ͕୯ௐ૿ՃؔͰ͋Δ͜ͱ͔Β ∃k′ ∈ R s.t. Λ (x) > k ⇐⇒ x > k′. ༗ҙਫ४Λ α > 0 ͱ͢Δͱ α = Eµ0 [φ (X)] = ∫ Λ(x)>0 dFµ0 (x) =Pµ0 (Λ(X) > k|H0) =Pµ0 ( X > k′|H0 ) ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 25 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ √ n (
X − µ0 ) /σ ∼ N (0, 1) Ͱ͋Δ͜ͱΛ༻͍Δͱɼ α = P ( √ n ( X − µ0 ) σ > √ n (k′ − µ0 ) σ µ0 ) = 1 − Φ (√ n (k′ − µ0 ) σ ) ͱͳΔɽzα Λ N (0, 1) ͷ্ଆ 100α% ͱ͢Δͱɼ zα = √ n (k′ − µ0) σ =⇒ k′ = µ0 + σ √ n zα Ͱ͋Δ͔Βɼ࠷ڧྗݕఆͷغ٫Ҭͱͯ͠ C = { (x1, . . . , xn) x > µ0 + σ √ n zα } ͕ٻ·Δɽ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 26 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ • ͜ͷغ٫Ҭ C
ɼµ1 ͷʹґଘ͍ͯ͠ͳ͍ͷͰɼµ1 > µ0 Λຬͨ͢ ҙͷ µ1 ʹରͯ͠ಉ༷ͷغ٫Ҭ͕ಋ͔ΕΔ • ͕ͨͬͯ͠ɼ͜ͷݕఆ UMP ݕఆͰ͋Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 27 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ –Type II Error
ͷ֬– ࣍ʹɼType II Error ͷ֬ΛٻΊΔɽµ = µ1 ͷͱ͖ʹ X / ∈ C ͱͳΔ֬ ͳͷͰɼ P ( X / ∈ C µ1 ) =P ( X < µ0 + σ √ n zα ) =P (√ n ( X − µ1 ) σ < zα − √ n (µ0 − µ1) σ ) =Φ ( zα − √ n (µ0 − µ1) σ ) . α Λখ͘͢͞ΔͱɼఆٛΑΓ zα େ͖͘ͳΔͷͰɼType II Error ͷ֬ େ͖͘ͳΔɽ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 28 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ – ݕग़ྗ –
ݕग़ྗ β(µ1) =P ( X ∈ C µ1 ) =1 − P ( X / ∈ C µ1 ) =1 − Φ ( zα − √ n (µ0 − µ1) σ ) ͱٻ·Δɽ • ݕग़ྗ β(µ1) ɼµ0 − µ1 ͕େ͖͍΄Ͳେ͖͘ͳΔ • 2 ܈ͷฏۉ͕େ͖͘Ε͍ͯΔ΄Ͳ H0 ཱ͕͍ͯ͠Δ͔ H1 ཱ͕ ͍ͯ͠Δͷ͔Λݟ͚Δͷ؆୯ͱ͍͏ײʹ߹க͍ͯ͠Δ • n ͕େ͖͍΄Ͳݕग़ྗ͕େ͖͘ͳΔ • ͜Εײʹ߹க͍ͯ͠Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 29 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ • ઌఔߟ͑ͨྫ H1
: µ = µ1 > µ0 Ͱ͕͋ͬͨɼରཱԾઆͱͯ͠ H1 : µ = µ1 < µ0 ߟ͑Δ͜ͱ͕ग़དྷΔ • ͜ͷ߹ɼಉ༷ʹͯ͠࠷ڧྗݕఆͷغ٫Ҭ C = { (x1, . . . , xn) x < µ0 + σ √ n zα } ΛߏͰ͖Δ • ͜ͷΑ͏ʹɼରཱԾઆ H1 ͷؼແԾઆ H0 ͔ΒͷζϨͷํʹରԠ͠ ͯغ٫Ҭ͕ H0 ͷ (ࠓճ µ0) ยଆʹ࡞ΒΕΔݕఆΛยଆݕఆͱ͍͏ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 30 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ MP ݕఆͷߏྫ –྆ଆݕఆͷ֦ு– • ରཱԾઆ͕
H1 : µ ̸= µ0 ͷ߹ʹ༗ҙਫ४ α ͷ UMP ݕఆଘࡏ͠ ͳ͍ • ͔͠͠ɼ͜Ε·Ͱͷ͔ٞΒغ٫Ҭ C = { (x1, . . . , xn) |x − µ0| > σ √ n zα } ΛߏͰ͖Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 31 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ৴པ۠ؒͱݕఆ • ਖ਼نूஂʹ͓͚ΔࢄطͰͷฏۉͷ۠ؒਪఆʹ͓͍ͯɼ৴པ 100(1
− α)% ͷ µ ͷ৴པ۠ؒ Iµ = [ X − zα/2 σ0 √ n , X + zα/2 σ0 √ n ] • Iµ ͕ µ0 ΛؚΉͱ͢ΔͱɼؼແԾઆ H0 ઌఔͷ྆ଆݕఆʹ͓͍ͯ༗ ҙਫ४ α Ͱغ٫͞Εͳ͍ • ͢ͳΘͪɼx / ∈ C =⇒ µ0 ∈ Iµ • ͭ·ΓɼؼແԾઆ͕غ٫͞Εͳ͍͜ͱͱɼ৴པ͕۠ؒؼແԾઆͷΛ ؚΉ͜ͱಉɿ ؼແԾઆ͕غ٫͞ΕΔ ⇐⇒ ৴པ͕۠ؒؼແԾઆͷΛؚ·ͳ͍ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 32 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ ͦͷଞͷݕఆߏํ๏ • ࠶ڠྗݕఆωΠϚϯɾϐΞιϯͷجຊఆཧʹΑͬͯߏ͞ΕΔ͕ɼ ͕ෳࡶʹͳͬͯਖ਼֬ͳغ٫ҬΛ࡞Εͳ͍͜ͱ͋Δ •
ͦΜͳͱ͖ɼ࠷ਪఆྔʹج͍ͯݕఆΛߏ͢Δ͜ͱ͕͋Δ • ଞʹɼefficient score Λ༻͍ͨݕఆͷߏํ๏͋Δ ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 33 / 33
Introduction Ծઆݕఆ 2 छྨͷաޡͱݕग़ྗؔ ࠷ڧྗݕఆͷߏ Reference • ฏণจ, ౷ܭղੳೖ, ग़൛גࣜձࣾ,
2007 • ౻؏ଠ, ཧ౷ܭֶ II ߨٛϊʔτ, 2014 • ౦ژେֶڭཆֶ෦౷ܭֶڭࣨɼجૅ౷ܭֶ III ࣗવՊֶͷ౷ܭֶɼ2013 ాத ণ (@setten QB) (AHC-Lab) ୈ 4 ճ ֬ɾ౷ܭͷجૅษڧձ ౷ܭతݕఆ March 25, 2017 34 / 33