Une note sur les intervalles de couverture de Wilson pour les proportions estimées sur des échantillons complexes
Section 3. La transformation logistique

L’intervalle de couverture de Wilson sous échantillonnage complexe s’avère être très semblable à l’intervalle de couverture bilatéral obtenu en utilisant une transformation logistique (voir Brown et coll., 2001):

f 1 { f ( p ) z 1 α / 2 var [ f ( p ) ] } P f 1 { f ( p ) + z 1 α / 2 var [ f ( p ) ] } , ( 3.1 ) MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGMbWaaWbaaSqabeaacqGHsislca aIXaaaaOWaaiWaaeaacaWGMbWaaeWaaeaacaWGWbaacaGLOaGaayzk aaGaeyOeI0IaamOEamaaBaaaleaacaaIXaGaeyOeI0YaaSGbaeaacq aHXoqyaeaacaaIYaaaaaqabaGcdaGcaaqaaiaabAhacaqGHbGaaeOC amaadmaabaGaamOzamaabmaabaGaamiCaaGaayjkaiaawMcaaaGaay 5waiaaw2faaaWcbeaaaOGaay5Eaiaaw2haaiabgsMiJkaadcfacqGH KjYOcaWGMbWaaWbaaSqabeaacqGHsislcaaIXaaaaOWaaiWaaeaaca WGMbWaaeWaaeaacaWGWbaacaGLOaGaayzkaaGaey4kaSIaamOEamaa BaaaleaacaaIXaGaeyOeI0YaaSGbaeaacqaHXoqyaeaacaaIYaaaaa qabaGcdaGcaaqaaiaabAhacaqGHbGaaeOCamaadmaabaGaamOzamaa bmaabaGaamiCaaGaayjkaiaawMcaaaGaay5waiaaw2faaaWcbeaaaO Gaay5Eaiaaw2haaiaacYcacaaMf8UaaGzbVlaaywW7caaMf8Uaaiik aiaaiodacaGGUaGaaGymaiaacMcaaaa@6E40@

f ( p ) = log ( p ) log ( 1 p ) , MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGMbWaaeWaaeaacaWGWbaacaGLOa GaayzkaaGaeyypa0JaciiBaiaac+gacaGGNbWaaeWaaeaacaWGWbaa caGLOaGaayzkaaGaeyOeI0IaciiBaiaac+gacaGGNbWaaeWaaeaaca aIXaGaeyOeI0IaamiCaaGaayjkaiaawMcaaiaacYcaaaa@440F@ et var [ f ( p ) ] = [ f ( p ) ] 2 var ( p ) = [ 1 / p + 1 / ( 1 p ) ] 2 p ( 1 p ) / n * = 1 / [ n * p ( 1 p ) ] . MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaaciGG2bGaaiyyaiaackhadaWadaqaai aadAgadaqadaqaaiaadchaaiaawIcacaGLPaaaaiaawUfacaGLDbaa cqGH9aqpdaWadaqaaiaadAgadaahaaWcbeqaaKqzGfGamai2gkdiIc aakmaabmaabaGaamiCaaGaayjkaiaawMcaaaGaay5waiaaw2faamaa CaaaleqabaGaaGOmaaaakiGacAhacaGGHbGaaiOCamaabmaabaGaam iCaaGaayjkaiaawMcaaiabg2da9maadmaabaWaaSGbaeaacaaIXaaa baGaamiCaaaacqGHRaWkdaWcgaqaaiaaigdaaeaadaqadaqaaiaaig dacqGHsislcaWGWbaacaGLOaGaayzkaaaaaaGaay5waiaaw2faamaa CaaaleqabaGaaGOmaaaakmaalyaabaGaamiCamaabmaabaGaaGymai abgkHiTiaadchaaiaawIcacaGLPaaaaeaacaWGUbGaaiOkaiabg2da 9maalyaabaGaaGymaaqaamaadmaabaGaamOBaiaacQcacaWGWbWaae WaaeaacaaIXaGaeyOeI0IaamiCaaGaayjkaiaawMcaaaGaay5waiaa w2faaaaaaaGaaiOlaaaa@6813@ La justification originale de cet intervalle semble être qu’il possède la propriété désirable de ne pas pouvoir contenir des valeurs inférieures à 0 ou supérieures à 1, qui seraient absurdes pour une proportion.

Le premier membre de l’équation (3.1) peut se réécrire sous la forme g ( x h ) , MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGNbWaaeWaaeaacaWG4bGaeyOeI0 IaamiAaaGaayjkaiaawMcaaiaacYcaaaa@37BB@  

g ( y ) = f 1 ( y ) = [ 1 + exp ( y ) ] 1 , x = f ( p ) = log ( p 1 p ) , MathType@MTEF@5@5@+= feaagKart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGNbWaaeWaaeaacaWG5baacaGLOa GaayzkaaGaeyypa0JaamOzamaaCaaaleqabaGaeyOeI0IaaGymaaaa kmaabmaabaGaamyEaaGaayjkaiaawMcaaiabg2da9maadmaabaGaaG ymaiabgUcaRiGacwgacaGG4bGaaiiCamaabmaabaGaeyOeI0IaamyE aaGaayjkaiaawMcaaaGaay5waiaaw2faamaaCaaaleqabaGaeyOeI0 IaaGymaaaakiaaygW7caGGSaGaamiEaiabg2da9iaadAgadaqadaqa aiaadchaaiaawIcacaGLPaaacqGH9aqpciGGSbGaai4BaiaacEgada qadaqaamaalaaabaGaamiCaaqaaiaaigdacqGHsislcaWGWbaaaaGa ayjkaiaawMcaaiaacYcaaaa@59A2@

et

h = z 1 α / 2 n * p ( 1 p ) . MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGObGaeyypa0ZaaSaaaeaacaWG6b WaaSbaaSqaaiaaigdacqGHsisldaWcgaqaaiabeg7aHbqaaiaaikda aaaabeaaaOqaamaakaaabaGaamOBaiaacQcacaWGWbWaaeWaaeaaca aIXaGaeyOeI0IaamiCaaGaayjkaiaawMcaaaWcbeaaaaGccaGGUaaa aa@40A3@

Les dérivées première et seconde de g ( y ) MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGNbWaaeWaaeaacaWG5baacaGLOa Gaayzkaaaaaa@3532@ sont g ( y ) = g ( y ) [ 1 g ( y ) ] MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGNbWaaWbaaSqabeaajugybiadaI THYaIOaaGcdaqadaqaaiaadMhaaiaawIcacaGLPaaacqGH9aqpcaWG NbWaaeWaaeaacaWG5baacaGLOaGaayzkaaWaamWaaeaacaaIXaGaey OeI0Iaam4zamaabmaabaGaamyEaaGaayjkaiaawMcaaaGaay5waiaa w2faaaaa@449E@ et g ( y ) = g ( y ) [ 1 g ( y ) ] [ 1 2 g ( y ) ] . MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGNbWaaWbaaSqabeaajugybiadaI THYaIOcaaMb8Uamai2gkdiIcaakmaabmaabaGaamyEaaGaayjkaiaa wMcaaiabg2da9iaadEgadaqadaqaaiaadMhaaiaawIcacaGLPaaada WadaqaaiaaigdacqGHsislcaWGNbWaaeWaaeaacaWG5baacaGLOaGa ayzkaaaacaGLBbGaayzxaaWaamWaaeaacaaIXaGaeyOeI0IaaGOmai aadEgadaqadaqaaiaadMhaaiaawIcacaGLPaaaaiaawUfacaGLDbaa caGGUaaaaa@5183@ En vertu du théorème de la valeur moyenne, il existe un h * MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGObGaaiOkaaaa@335A@ entre 0 et h MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGObaaaa@32AC@ tel que

g ( x h ) = g ( x ) g ( x ) h + 1 2 g ( x h * ) h 2 = p p ( 1 p ) z 1 α / 2 n * p ( 1 p ) + 1 2 [ 1 + ( 1 p p ) e h * ] 1 { 1 [ 1 + ( 1 p p ) e h * ] 1 } { 1 2 [ 1 + ( 1 p p ) e h * ] 1 } z 1 α / 2 2 n * p ( 1 p ) = p p ( 1 p ) z 1 α / 2 n * p ( 1 p ) + 1 2 p 1 + ( 1 p ) ( e h * 1 ) ( 1 p ) ( 1 p ) ( e h * 1 ) 1 + ( 1 p ) ( e h * 1 ) ( 1 2 p ) ( 1 p ) ( e h * 1 ) 1 + ( 1 p ) ( e h * 1 ) z 1 α / 2 2 n * p ( 1 p ) , MathType@MTEF@5@5@+= feaagKart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakqaabeqaauaabaqafiaaaaqaaiaadEgada qadaqaaiaadIhacqGHsislcaWGObaacaGLOaGaayzkaaaabaGaeyyp a0Jaam4zamaabmaabaGaamiEaaGaayjkaiaawMcaaiabgkHiTiaadE gadaahaaWcbeqaaKqzGfGamai2gkdiIcaakmaabmaabaGaamiEaaGa ayjkaiaawMcaaiaadIgacqGHRaWkdaWcaaqaaiaaigdaaeaacaaIYa aaaiaadEgadaahaaWcbeqaaKqzGfGamai2gkdiIkaaygW7cWaGyBOm GikaaOWaaeWaaeaacaWG4bGaeyOeI0IaamiAaiaacQcaaiaawIcaca GLPaaacaWGObWaaWbaaSqabeaacaaIYaaaaaGcbaaabaGaeyypa0Ja amiCaiaaykW7caaMc8UaeyOeI0IaamiCamaabmaabaGaaGymaiabgk HiTiaadchaaiaawIcacaGLPaaadaWcaaqaaiaadQhadaWgaaWcbaGa aGymaiabgkHiTmaalyaabaGaeqySdegabaGaaGOmaaaaaeqaaaGcba WaaOaaaeaacaWGUbGaaiOkaiaadchadaqadaqaaiaaigdacqGHsisl caWGWbaacaGLOaGaayzkaaaaleqaaaaaaOqaaaqaaiabgUcaRmaala aabaGaaGymaaqaaiaaikdaaaWaamWaaeaacaaIXaGaey4kaSYaaeWa aeaadaWcaaqaaiaaigdacqGHsislcaWGWbaabaGaamiCaaaaaiaawI cacaGLPaaacaWGLbWaaWbaaSqabeaacaWGObGaaiOkaaaaaOGaay5w aiaaw2faamaaCaaaleqabaGaeyOeI0IaaGymaaaakmaacmaabaGaaG ymaiabgkHiTmaadmaabaGaaGymaiabgUcaRmaabmaabaWaaSaaaeaa caaIXaGaeyOeI0IaamiCaaqaaiaadchaaaaacaGLOaGaayzkaaGaam yzamaaCaaaleqabaGaamiAaiaacQcaaaaakiaawUfacaGLDbaadaah aaWcbeqaaiabgkHiTiaaigdaaaaakiaawUhacaGL9baadaGadaqaai aaigdacqGHsislcaaIYaWaamWaaeaacaaIXaGaey4kaSYaaeWaaeaa daWcaaqaaiaaigdacqGHsislcaWGWbaabaGaamiCaaaaaiaawIcaca GLPaaacaWGLbWaaWbaaSqabeaacaWGObGaaiOkaaaaaOGaay5waiaa w2faamaaCaaaleqabaGaeyOeI0IaaGymaaaaaOGaay5Eaiaaw2haam aalaaabaGaamOEamaaDaaaleaacaaIXaGaeyOeI0YaaSGbaeaacqaH XoqyaeaacaaIYaaaaaqaaiaaikdaaaaakeaacaWGUbGaaiOkaiaadc hadaqadaqaaiaaigdacqGHsislcaWGWbaacaGLOaGaayzkaaaaaaqa aaqaaiabg2da9iaadchacqGHsislcaWGWbWaaeWaaeaacaaIXaGaey OeI0IaamiCaaGaayjkaiaawMcaamaalaaabaGaamOEamaaBaaaleaa caaIXaGaeyOeI0YaaSGbaeaacqaHXoqyaeaacaaIYaaaaaqabaaake aadaGcaaqaaiaad6gacaGGQaGaamiCamaabmaabaGaaGymaiabgkHi TiaadchaaiaawIcacaGLPaaaaSqabaaaaaGcbaaabaGaey4kaSYaaS aaaeaacaaIXaaabaGaaGOmaaaadaWcaaqaaiaadchaaeaacaaIXaGa ey4kaSYaaeWaaeaacaaIXaGaeyOeI0IaamiCaaGaayjkaiaawMcaam aabmaabaGaamyzamaaCaaaleqabaGaeyOeI0IaamiAaiaacQcaaaGc cqGHsislcaaIXaaacaGLOaGaayzkaaaaamaalaaabaWaaeWaaeaaca aIXaGaeyOeI0IaamiCaaGaayjkaiaawMcaaiabgkHiTmaabmaabaGa aGymaiabgkHiTiaadchaaiaawIcacaGLPaaadaqadaqaaiaadwgada ahaaWcbeqaaiaadIgacaGGQaaaaOGaeyOeI0IaaGymaaGaayjkaiaa wMcaaaqaaiaaigdacqGHRaWkdaqadaqaaiaaigdacqGHsislcaWGWb aacaGLOaGaayzkaaWaaeWaaeaacaWGLbWaaWbaaSqabeaacaWGObGa aiOkaaaakiabgkHiTiaaigdaaiaawIcacaGLPaaaaaWaaSaaaeaada qadaqaaiaaigdacqGHsislcaaIYaGaamiCaaGaayjkaiaawMcaaiab gkHiTmaabmaabaGaaGymaiabgkHiTiaadchaaiaawIcacaGLPaaada qadaqaaiaadwgadaahaaWcbeqaaiaadIgacaGGQaaaaOGaeyOeI0Ia aGymaaGaayjkaiaawMcaaaqaaiaaigdacqGHRaWkdaqadaqaaiaaig dacqGHsislcaWGWbaacaGLOaGaayzkaaWaaeWaaeaacaWGLbWaaWba aSqabeaacaWGObGaaiOkaaaakiabgkHiTiaaigdaaiaawIcacaGLPa aaaaWaaSaaaeaacaWG6bWaa0baaSqaaiaaigdacqGHsisldaWcgaqa aiabeg7aHbqaaiaaikdaaaaabaGaaGOmaaaaaOqaaiaad6gacaGGQa GaamiCamaabmaabaGaaGymaiabgkHiTiaadchaaiaawIcacaGLPaaa aaGaaiilaaaaaeaacaaMb8UaaGzaVlaaygW7aaaa@1B65@

en utilisant

  [ 1 + ( 1 p p ) e h * ] 1 = p 1 + ( 1 p ) ( e h * 1 ) . MathType@MTEF@5@5@+= feaagKart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaqGGaWaamWaaeaacaaIXaGaey4kaS YaaeWaaeaadaWcaaqaaiaaigdacqGHsislcaWGWbaabaGaamiCaaaa aiaawIcacaGLPaaacaWGLbWaaWbaaSqabeaacaWGObGaaiOkaaaaaO Gaay5waiaaw2faamaaCaaaleqabaGaeyOeI0IaaGymaaaakiabg2da 9maalaaabaGaamiCaaqaaiaaigdacqGHRaWkdaqadaqaaiaaigdacq GHsislcaWGWbaacaGLOaGaayzkaaWaaeWaaeaacaWGLbWaaWbaaSqa beaacaWGObGaaiOkaaaakiabgkHiTiaaigdaaiaawIcacaGLPaaaaa GaaiOlaaaa@4E23@

Un calcul analogue peut être effectué pour le deuxième membre de l’équation (3.1).

Par conséquent,

p + 1 2 p n * z 1 α / 2 2 2 z 1 α / 2 ( p ( 1 p ) n * ) 1 / 2 + o P ( 1 n * ) P p + 1 2 p n * z 1 α / 2 2 2 + z 1 α / 2 ( p ( 1 p ) n * ) 1 / 2 + o P ( 1 n * ) . MathType@MTEF@5@5@+= feaagKart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaafaqaaeGabaaabaGaamiCaiabgUcaRm aalaaabaGaaGymaiabgkHiTiaaikdacaWGWbaabaGaamOBaiaacQca aaWaaSaaaeaacaWG6bWaa0baaSqaaiaaigdacqGHsisldaWcgaqaai abeg7aHbqaaiaaikdaaaaabaGaaGOmaaaaaOqaaiaaikdaaaGaeyOe I0IaamOEamaaBaaaleaacaaIXaGaeyOeI0YaaSGbaeaacqaHXoqyae aacaaIYaaaaaqabaGcdaqadaqaamaalaaabaGaamiCamaabmaabaGa aGymaiabgkHiTiaadchaaiaawIcacaGLPaaaaeaacaWGUbGaaiOkaa aaaiaawIcacaGLPaaadaahaaWcbeqaamaalyaabaGaaGymaaqaaiaa ikdaaaaaaOGaaGzaVlabgUcaRiaad+gadaWgaaWcbaGaamiuaaqaba GcdaqadaqaamaalaaabaGaaGymaaqaaiaad6gacaGGQaaaaaGaayjk aiaawMcaaiaaysW7cqGHKjYOcaaMe8UaamiuaaqaaiaaywW7caaMf8 UaaGzbVlaaywW7caaMf8UaeyizImQaaGjbVlaadchacqGHRaWkdaWc aaqaaiaaigdacqGHsislcaaIYaGaamiCaaqaaiaad6gacaGGQaaaam aalaaabaGaamOEamaaDaaaleaacaaIXaGaeyOeI0YaaSGbaeaacqaH XoqyaeaacaaIYaaaaaqaaiaaikdaaaaakeaacaaIYaaaaiabgUcaRi aadQhadaWgaaWcbaGaaGymaiabgkHiTmaalyaabaGaeqySdegabaGa aGOmaaaaaeqaaOWaaeWaaeaadaWcaaqaaiaadchadaqadaqaaiaaig dacqGHsislcaWGWbaacaGLOaGaayzkaaaabaGaamOBaiaacQcaaaaa caGLOaGaayzkaaWaaWbaaSqabeaadaWcgaqaaiaaigdaaeaacaaIYa aaaaaakiaaygW7cqGHRaWkcaWGVbWaaSbaaSqaaiaadcfaaeqaaOWa aeWaaeaadaWcaaqaaiaaigdaaeaacaWGUbGaaiOkaaaaaiaawIcaca GLPaaacaGGUaaaaaaa@8FF5@

En vertu de l’égalité asymptotique dans l’équation (2.3) et en laissant tomber les termes o P ( 1 / n * ) , MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGVbWaaSbaaSqaaiaadcfaaeqaaO WaaeWaaeaadaWcgaqaaiaaigdaaeaacaWGUbGaaiOkaaaaaiaawIca caGLPaaacaGGSaaaaa@3869@ le dernier ensemble d’inégalités équivaut à l’intervalle de Wilson dans l’équation (2.2) à condition que n * MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGUbGaaiOkaaaa@3360@ soit suffisamment grand et que P ( 1 P ) > 0 , MathType@MTEF@5@5@+= feaagKart1ev2aqatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn hiov2DGi1BTfMBaeXatLxBI9gBaebbnrfifHhDYfgasaacH8rrps0l bbf9q8WrFfeuY=Hhbbf9y8WrFr0xc9vqFj0db9qqvqFr0dXdHiVc=b YP0xH8peuj0dYddrpe0db9Wqpepic9qr=xfr=xfr=xmeaabaqaciGa caGaaeqabaqaaeaadaaakeaacaWGqbWaaeWaaeaacaaIXaGaeyOeI0 IaamiuaaGaayjkaiaawMcaaiabg6da+iaaicdacaGGSaaaaa@390C@ cette dernière contrainte signifiant que la proportion vraie n’est égale ni à 0 ni à 1.


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