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\u0130statistikte Jaro-Winkler benzerli\u011fi<\/strong> iki dize aras\u0131ndaki benzerli\u011fi \u00f6l\u00e7menin bir yoludur.<\/span><\/p>\n \u0130ki dize aras\u0131ndaki Jaro benzerli\u011fi<\/strong> (sim j<\/sub> ) \u015fu \u015fekilde tan\u0131mlan\u0131r:<\/span><\/p>\n sim j<\/sub> = 1\/3 * ( m \/|s 1<\/sub> | + m\/|s 2<\/sub> | + (mt)\/m )<\/span><\/p>\n Alt\u0131n:<\/span><\/p>\n Jaro-Winkler benzerli\u011fi<\/strong> (sim w<\/sub> ) \u015fu \u015fekilde tan\u0131mlan\u0131r:<\/span><\/p>\n sim w<\/sub> = sim j<\/sub> + lp(1 \u2013 sim j<\/sub> )<\/span><\/p>\n Alt\u0131n:<\/span><\/p>\n \u0130ki dize aras\u0131ndaki Jaro-Winkler benzerli\u011fi her zaman 0 ile 1 aras\u0131ndad\u0131r; burada:<\/span><\/p>\n Not<\/strong> : Jaro-Winkler mesafesi<\/em> 1 \u2013 sim w<\/sub> olarak tan\u0131mlanacakt\u0131r.<\/span><\/p>\n A\u015fa\u011f\u0131daki \u00f6rnekte iki dize aras\u0131ndaki Jaro-Winkler benzerli\u011finin pratikte nas\u0131l hesaplanaca\u011f\u0131 g\u00f6sterilmektedir.<\/span><\/p>\n A\u015fa\u011f\u0131daki iki dizeye sahip oldu\u011fumuzu varsayal\u0131m:<\/span><\/p>\n \u00d6ncelikle bu iki string aras\u0131ndaki Jaro benzerli\u011fini hesaplayal\u0131m:<\/span><\/p>\n sim j<\/sub> = 1\/3 * ( m \/|s 1<\/sub> | + m\/|s 2<\/sub> | + (mt)\/m )<\/span><\/p>\n Alt\u0131n:<\/span><\/p>\n Bu durumda [max(|s 1<\/sub> |, |s 2<\/sub> |) \/ 2] \u2013 1, 5\/2 \u2013 1 = 1,5 olarak hesaplan\u0131r. Kar\u015f\u0131l\u0131k gelen \u00fc\u00e7 harfi tan\u0131mlar\u0131z: m, u, e. Yani m = 3<\/strong> .<\/span><\/p>\n Bu durumda, |s 1<\/sub> | = 5<\/strong> ve |s 1<\/sub> | = 4<\/strong> .<\/span><\/p>\n Bu durumda e\u015fle\u015fen \u00fc\u00e7 karakter vard\u0131r ancak bunlar zaten ayn\u0131 s\u0131ral\u0131 s\u0131radad\u0131r, yani t = 0<\/strong> .<\/span><\/p>\n Yani Jaro benzerli\u011fini \u015fu \u015fekilde hesaplayabiliriz:<\/span><\/p>\n sim j<\/sub> = 1\/3 * (3\/5 + 3\/4 + (3-0)\/3) = 0,78333.<\/span><\/p>\n Daha sonra Jaro-Winkler benzerli\u011fini (sim w<\/sub> ) \u015fu \u015fekilde hesaplayal\u0131m:<\/span><\/p>\n sim w<\/sub> = sim j<\/sub> + lp(1 \u2013 sim j<\/sub> )<\/span><\/p>\n Bu durumda \u015funu hesaplayaca\u011f\u0131z:<\/span><\/p>\n sim w<\/sub> = 0,78333 + (1)*(0,1)(1 \u2013 0,78333) = 0,805.<\/span><\/p>\n \u0130ki zincir aras\u0131ndaki Jaro-Winkler benzerli\u011fi 0,805’tir<\/strong> .<\/span><\/p>\n Bu de\u011ferin 1’e yak\u0131n olmas\u0131 bize iki dizenin \u00e7ok benzer oldu\u011funu s\u00f6yler.<\/span><\/p>\n R’deki iki dize aras\u0131ndaki Jaro-Winkler benzerli\u011fini hesaplayarak bunun do\u011fru oldu\u011funu do\u011frulayabiliriz:<\/span><\/p>\n Bu bizim manuel olarak hesaplad\u0131\u011f\u0131m\u0131z de\u011fere kar\u015f\u0131l\u0131k geliyor.<\/span><\/p>\n A\u015fa\u011f\u0131daki e\u011fitimlerde di\u011fer benzerlik metriklerinin nas\u0131l hesaplanaca\u011f\u0131 a\u00e7\u0131klanmaktad\u0131r:<\/span><\/p>\n Bray-Curtis farkl\u0131l\u0131\u011f\u0131na giri\u015f<\/a> \u0130statistikte Jaro-Winkler benzerli\u011fi iki dize aras\u0131ndaki benzerli\u011fi \u00f6l\u00e7menin bir yoludur. \u0130ki dize aras\u0131ndaki Jaro benzerli\u011fi (sim j ) \u015fu \u015fekilde tan\u0131mlan\u0131r: sim j = 1\/3 * ( m \/|s 1 | + m\/|s 2 | + (mt)\/m ) Alt\u0131n: m : E\u015fle\u015fen karakter say\u0131s\u0131 S 1 ve s 2’nin iki karakteri ayn\u0131ysa ve birbirlerinden [max(|s […]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[11],"tags":[],"class_list":["post-3119","post","type-post","status-publish","format-standard","hentry","category-rehber"],"yoast_head":"\n\n
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\u00d6rnek: iki dize aras\u0131ndaki Jaro-Winkler benzerli\u011finin hesaplanmas\u0131<\/strong><\/span><\/h3>\n
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library<\/span> (stringdist)\n\n#calculate Jaro-Winkler similarity between 'mouse' and 'mute'<\/span>\n1 - stringdist(\"mouse\", \"mute\", method = \"jw\", p= 0.1<\/span> )\n\n[1] 0.805\n<\/strong><\/pre>\n Ek kaynaklar<\/strong><\/span><\/h3>\n
Jaccard benzerlik indeksine giri\u015f<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"