[{"@context":"http:\/\/schema.org\/","@type":"BlogPosting","@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/9148#BlogPosting","mainEntityOfPage":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/9148","headline":"\u53f8\u6559\u306e\u53f8\u6559 – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2","name":"\u53f8\u6559\u306e\u53f8\u6559 – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2","description":"before-content-x4 \u53f8\u6559\u304b\u3089\u30bb\u30c3\u30c8 \u306f\u3001\u6a5f\u80fd\u5206\u6790\u306e\u6570\u5b66\u7684\u30b5\u30d6\u30a8\u30ea\u30a2\u306e\u6559\u80b2\u7387\u3067\u3042\u308a\u30011961\u5e74\u306e\u30a2\u30e1\u30ea\u30ab\u6570\u5b66Errett Bishop\u306b\u3088\u308b\u4f5c\u54c1\u306b\u307e\u3067\u3055\u304b\u306e\u307c\u308a\u307e\u3059\u3002\u305d\u308c\u306f\u3001\u5f7c\u304c\u76f4\u63a5\u7684\u306a\u7d50\u679c\u3068\u3057\u3066\u4f34\u3046\u30b9\u30c8\u30fc\u30f3\u30fb\u30ef\u30a4\u30a2\u30fc\u30c8\u30e9\u30b9\u30c8\u306e\u8fd1\u4f3c\u6587\u3068\u5bc6\u63a5\u306b\u95a2\u9023\u3057\u3066\u3044\u308b\u305f\u3081\u3001\u4e00\u822c\u5316\u3057\u307e\u3059\u3002\u53f8\u6559\u306e\u5224\u6c7a\u306f\u3001\u30af\u30ec\u30a4\u30f3\u30fb\u30de\u30eb\u30de\u30f3\u3001\u30cf\u30fc\u30f3\u30fb\u30d0\u30ca\u30c3\u30cf\u3001\u30d0\u30ca\u30c3\u30cf\u30fb\u30a2\u30e9\u30aa\u30b0\u30eb\u306b\u3088\u308b\u5211\u306e\u52a9\u3051\u3092\u501f\u308a\u3066\u5c0e\u304d\u51fa\u3059\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002 [\u521d\u3081] after-content-x4 \u6b21\u306e\u3088\u3046\u306b\u6307\u5b9a\u3067\u304d\u307e\u3059\u3002 [2] \u30b3\u30f3\u30d1\u30af\u30c8\u306a\u30cf\u30a6\u30bd\u30eb\u30d5\u306e\u90e8\u5c4b\u304c\u3042\u308a\u307e\u3059 X\u2260\u2205{displaystyle xneq emptyset} \u6a5f\u80fd\u7684\u4ee3\u6570 after-content-x4 C=C(X,C){displaystyle c = c\uff08x\u3001mathbb {c}\uff09} \u4e00\u5b9a\u306e\u8907\u96d1\u306a\u95a2\u6570","datePublished":"2023-06-25","dateModified":"2023-06-25","author":{"@type":"Person","@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/author\/lordneo#Person","name":"lordneo","url":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/author\/lordneo","image":{"@type":"ImageObject","@id":"https:\/\/secure.gravatar.com\/avatar\/44a4cee54c4c053e967fe3e7d054edd4?s=96&d=mm&r=g","url":"https:\/\/secure.gravatar.com\/avatar\/44a4cee54c4c053e967fe3e7d054edd4?s=96&d=mm&r=g","height":96,"width":96}},"publisher":{"@type":"Organization","name":"Enzyklop\u00e4die","logo":{"@type":"ImageObject","@id":"https:\/\/wiki.edu.vn\/wiki4\/wp-content\/uploads\/2023\/08\/download.jpg","url":"https:\/\/wiki.edu.vn\/wiki4\/wp-content\/uploads\/2023\/08\/download.jpg","width":600,"height":60}},"image":{"@type":"ImageObject","@id":"https:\/\/wikimedia.org\/api\/rest_v1\/media\/math\/render\/svg\/a174e8fd37ae6a1cad4c0b9b522e87ad2fcf7fdd","url":"https:\/\/wikimedia.org\/api\/rest_v1\/media\/math\/render\/svg\/a174e8fd37ae6a1cad4c0b9b522e87ad2fcf7fdd","height":"","width":""},"url":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/9148","wordCount":7128,"articleBody":"     (adsbygoogle = window.adsbygoogle || []).push({});before-content-x4 \u53f8\u6559\u304b\u3089\u30bb\u30c3\u30c8 \u306f\u3001\u6a5f\u80fd\u5206\u6790\u306e\u6570\u5b66\u7684\u30b5\u30d6\u30a8\u30ea\u30a2\u306e\u6559\u80b2\u7387\u3067\u3042\u308a\u30011961\u5e74\u306e\u30a2\u30e1\u30ea\u30ab\u6570\u5b66Errett Bishop\u306b\u3088\u308b\u4f5c\u54c1\u306b\u307e\u3067\u3055\u304b\u306e\u307c\u308a\u307e\u3059\u3002\u305d\u308c\u306f\u3001\u5f7c\u304c\u76f4\u63a5\u7684\u306a\u7d50\u679c\u3068\u3057\u3066\u4f34\u3046\u30b9\u30c8\u30fc\u30f3\u30fb\u30ef\u30a4\u30a2\u30fc\u30c8\u30e9\u30b9\u30c8\u306e\u8fd1\u4f3c\u6587\u3068\u5bc6\u63a5\u306b\u95a2\u9023\u3057\u3066\u3044\u308b\u305f\u3081\u3001\u4e00\u822c\u5316\u3057\u307e\u3059\u3002\u53f8\u6559\u306e\u5224\u6c7a\u306f\u3001\u30af\u30ec\u30a4\u30f3\u30fb\u30de\u30eb\u30de\u30f3\u3001\u30cf\u30fc\u30f3\u30fb\u30d0\u30ca\u30c3\u30cf\u3001\u30d0\u30ca\u30c3\u30cf\u30fb\u30a2\u30e9\u30aa\u30b0\u30eb\u306b\u3088\u308b\u5211\u306e\u52a9\u3051\u3092\u501f\u308a\u3066\u5c0e\u304d\u51fa\u3059\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002 [\u521d\u3081]        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4\u6b21\u306e\u3088\u3046\u306b\u6307\u5b9a\u3067\u304d\u307e\u3059\u3002 [2] \u30b3\u30f3\u30d1\u30af\u30c8\u306a\u30cf\u30a6\u30bd\u30eb\u30d5\u306e\u90e8\u5c4b\u304c\u3042\u308a\u307e\u3059 X\u2260\u2205{displaystyle xneq emptyset} \u6a5f\u80fd\u7684\u4ee3\u6570        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4C=C(X,C){displaystyle c = c\uff08x\u3001mathbb {c}\uff09} \u4e00\u5b9a\u306e\u8907\u96d1\u306a\u95a2\u6570 f:X\u2192C{displaystyle fcolon xto mathbb {c}} \u3002  \u305d\u306e\u4e2d\u306b\u306f\u9589\u3058\u305f\u975e\u59d4\u54e1\u304c\u3042\u308a\u307e\u3059 A\u2286C{displaystyle asubseteq c} \u4e0e\u3048\u3089\u308c\u305f g\u2208C{displaystyle gin c} \u3002         (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4A{displaystyle a} \u5b9a\u6570\u95a2\u6570\u3068\u6b21\u306e\u6761\u4ef6\u3082\u542b\u307e\u308c\u3066\u3044\u307e\u3059\u3002  \u306f E\u2286X{displaystyle Esubseteq X}\u4efb\u610f\u306e\u6700\u5927 A{displaystyle A} – \u6297\u5bfe\u79f0\u6027\u306e\u90e8\u5206\u91cf\u306a\u306e\u3067\u3001\u5e38\u306b1\u3064\u3042\u308a\u307e\u3059 f\u2208A{displaystyle fin A}\u3068 g(x)=f(x){displaystyle g(x)=f(x)}\u3059\u3079\u3066\u306e\u305f\u3081\u306b x\u2208E{displaystyle xin E}\u3002   \u305d\u308c\u304b\u3089 g\u2208A{displaystylegin a} \u3002 \u8aac\u660e\u3068\u30b3\u30e1\u30f3\u30c8 [ \u7de8\u96c6 | \u30bd\u30fc\u30b9\u30c6\u30ad\u30b9\u30c8\u3092\u7de8\u96c6\u3057\u307e\u3059 ] \u6a5f\u80fd\u7684\u4ee3\u6570 c {displaystyle c} \u3044\u3064\u3082\u306e\u3088\u3046\u306b\u3001Supremum Standard\u304c\u63d0\u4f9b\u3055\u308c\u307e\u3059\u3002 \u95a2\u6570\u4ee3\u6570\u5185\u306e\u5b8c\u5168\u6027 c {displaystyle c} Supremums\u57fa\u6e96\u304b\u3089\u547c\u3073\u51fa\u3055\u308c\u305f\u5747\u4e00\u306a\u53ce\u675f\u306e\u30c8\u30dd\u30ed\u30b8\u30fc\u306e\u610f\u5473\u3067\u7406\u89e3\u3055\u308c\u308b\u3079\u304d\u3067\u3059\u3002 \u6a5f\u80fd\u7684\u4ee3\u6570\u3067 c {displaystyle c} \u306f a \u2286 c {displaystyle asubseteq c} \u6b63\u78ba\u306b\u3001\u6b21\u306b\u672a\u30c6\u30e9\u30eb\u30d6\u30e9\u306e\u5834\u5408 a {displaystyle a} \u306e\u7dda\u5f62\u30b5\u30d6\u30b9\u30da\u30fc\u30b9 c {displaystyle c} \u305d\u308c\u305e\u308c2\u3064\u306e\u30d7\u30ed\u30d1\u30c6\u30a3\u3092\u6301\u3063\u3066\u3044\u307e\u3059 f1\u2208 a {displaystyle f_ {1} in} \u3068 f2\u2208 a {displaystyle f_ {2} in} \u8907\u96d1\u306a\u4e57\u7b97\u304b\u3089\u751f\u3058\u308b\u95a2\u6570\u306e\u305f\u3081\u306b f1f2\uff1a \u30d0\u30c4 \u2192 C\u3001 \u30d0\u30c4 \u21a6 f1\uff08 \u30d0\u30c4 \uff09\uff09 f2\uff08 \u30d0\u30c4 \uff09\uff09 \u3001 {displaystyle f_ {1} f_ {2} colon xto mathbb {c};\u3001; xmapsto f_ {1}\uff08x\uff09f_ {2}\uff08x\uff09;\u3001;} \u306e a {displaystyle a} \u542b\u307e\u308c\u3066\u3044\u307e\u3059\u3002 \u90e8\u5206 \u3068 \u2286 \u30d0\u30c4 {displaystylesubseteq x} \u306a\u308a\u307e\u3059 A{displaystyle a} -Antisymmetrisch \u305f\u3073\u306b\u547c\u3070\u308c\u307e\u3059 f \u2208 a {displaystyle fin a} \u3068 f \uff08 \u3068 \uff09\uff09 \u2286 R{displaystyle f\uff08e\uff09subseteq {mathbb {r}}} \u5e38\u306b\u4e00\u5b9a\u306e\u95a2\u6570\u3067\u3059\u3002 \u6700\u5927 a {displaystyle a} -Antisimmetrical Sub -Quantity\u306f\u4ed6\u306e\u3082\u306e\u3067\u306f\u306a\u3044\u3082\u306e\u3067\u3059 a {displaystyle a} -AntisImmetrical Subset\u306f\u672c\u5f53\u306b\u69cb\u6210\u3055\u308c\u3066\u3044\u307e\u3059\u3002 \u3059\u3079\u3066\u306e\u6700\u5927 a {displaystyle a} -Antisimmetrical\u30b5\u30d6\u91cf\u306f\u30c8\u30dd\u30ed\u30b8\u30ab\u30eb\u9818\u57df\u5185\u306b\u3042\u308a\u307e\u3059 \u30d0\u30c4 {displaystyle x} \u5b8c\u4e86\u3057\u307e\u3057\u305f\u3002 \u3059\u3079\u3066\u306e\u6700\u5927\u306e\u6570\u91cf\u30b7\u30b9\u30c6\u30e0 a {displaystyle a} -AntisImmetrical Subset\u306f\u3001\u306e\u89e3\u4f53\u3092\u5f62\u6210\u3057\u307e\u3059 \u30d0\u30c4 {displaystyle x} \u3002 Stone-Weierstra\u00df\u306e\u8fd1\u4f3c\u7387\u306f\u3001\u8fd1\u4f3c\u901f\u5ea6\u3067\u884c\u308f\u308c\u305f\u6761\u4ef6\u306e\u305f\u3081\u306b\u3001Bishop\u306e\u5224\u6c7a\u304b\u3089\u5f97\u3089\u308c\u307e\u3059\u3002 a {displaystyle a} -Antisymtrical\u30b5\u30d6\u30bb\u30c3\u30c8\u306b\u306f\u30012\u3064\u4ee5\u4e0a\u306e\u30dd\u30a4\u30f3\u30c8\u3092\u542b\u3081\u308b\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002 \u30d6\u30e9\u30b8\u30eb\u306e\u6570\u5b66\u8005\u3067\u3042\u308b\u30b7\u30eb\u30d3\u30aa\u30fb\u30de\u30c1\u30e3\u30c9\u306f\u3001\u53f8\u6559\u306e\u5211\u3068\u30b9\u30c8\u30fc\u30f3\u30fb\u30ef\u30a4\u30a2\u30b9\u30c8\u30e9\u30b9\u306e\u6982\u5ff5\u306e\u305f\u3081\u306b\u88dc\u984c\u3092\u5c4a\u3051\u307e\u3057\u305f\u3002\u305d\u308c\u304c\u7d9a\u304d\u307e\u3059 \u975e\u5efa\u8a2d\u7684 \u30d1\u30b9\u3001\u3059\u306a\u308f\u3061\u30be\u30fc\u30f3\u88dc\u984c\u3092\u4f7f\u7528\u3057\u307e\u3059\u3002\u30de\u30c1\u30e3\u30c9\u306e\u88dc\u984c\u306f\u3001\u6b21\u306e\u3088\u3046\u306b\u6307\u5b9a\u3067\u304d\u307e\u3059\u3002 [3] \u30cf\u30a6\u30b9\u30b2\u30fc\u30c8\u30eb\u30fc\u30e0\u304c\u3042\u308a\u307e\u3059 X\u2260\u2205{displaystyle xneq emptyset} \u6a5f\u80fd\u7684\u4ee3\u6570 C0=C0(X,K){displaystyle c_ {0} = c_ {0}\uff08x\u3001mathbb {k}\uff09} \u7121\u9650\u6d88\u5931\u95a2\u6570\u306e\u5b9a\u6570\u95a2\u6570 f:X\u2192K{displaystyle fcolon xto mathbb {k}} \u3001\u305d\u308c\u306b\u3088\u3063\u3066 K{displaystyle {mathbb {k}}} \u5b9f\u6570\u306e\u672c\u4f53\u307e\u305f\u306f\u8907\u96d1\u306a\u6570\u306e\u672c\u4f53\u306f\u305d\u3046\u304b\u3082\u3057\u308c\u307e\u305b\u3093\u3002  \u3055\u3089\u306b A{displaystyle a} \u304b\u3089\u5b8c\u6210\u3057\u305fUnteralgebra\u304b\u3089 C0{displaystyle c_ {0}} \u3068 f0\u2208C0{displaystyle f_ {0} in c_ {0}} \u3002  \u6b21\u306b\u3001\u6b21\u306e\u3053\u3068\u304c\u9069\u7528\u3055\u308c\u307e\u3059\u3002 \u7a7a\u3067\u306f\u306a\u3044\u5b8c\u6210\u304c\u3042\u308a\u307e\u3059 A{displaystyle a} -Antisimmetrical\u30b5\u30d6\u91cf E\u2286X{displaystylesubseteq x} \u5f0f\u306e\u30d7\u30ed\u30d1\u30c6\u30a3\u3067 distE(f0,A)=distX(f0,A){displaystyle {operatorname {dist}} _ {e}\uff08f_ {0}\u3001a\uff09= {operatorname {dist}} _ {x}\uff08f_ {0}\u3001a\uff09}} \u6e80\u8db3\u3057\u3066\u3044\u307e\u3059\u3002 \u8aac\u660e\u3068\u30b3\u30e1\u30f3\u30c8 [ \u7de8\u96c6 | \u30bd\u30fc\u30b9\u30c6\u30ad\u30b9\u30c8\u3092\u7de8\u96c6\u3057\u307e\u3059 ] Stone-WeierStra\u00df\u306e\u8fd1\u4f3c\u7387\u306e\u4e00\u822c\u5316\u30d0\u30fc\u30b8\u30e7\u30f3 [ \u7de8\u96c6 | \u30bd\u30fc\u30b9\u30c6\u30ad\u30b9\u30c8\u3092\u7de8\u96c6\u3057\u307e\u3059 ] \u8a00\u3046\uff1a [4] \u30de\u30c1\u30e3\u30c9\u306e\u30de\u30c1\u30e3\u30c9\u306e\u88dc\u984c\u306b\u767b\u5834\u3059\u308bUnteralgebra\u304c\u3042\u308a\u307e\u3059 A\u2286C0{displaystyle asubseteq c_ {0}} \u8fd1\u4f3c\u901f\u5ea6\u3067\u8a00\u53ca\u3055\u308c\u3066\u3044\u308b\u4e00\u822c\u7684\u306a\u7279\u6027\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059 A=C0{displaystyle a = c_ {0}} \u3002 \u3064\u307e\u308a\u3001\u6b21\u306e\u3053\u3068\u3092\u610f\u5473\u3057\u307e\u3059\u3002 \u5b8c\u6210\u3057\u305f\u3059\u3079\u3066\u306e\u672a\u6765\u306e\u305f\u3081\u306b A\u2286C0{displaystyle asubseteq c_ {0}} \u6b21\u306e3\u3064\u306e\u30d7\u30ed\u30d1\u30c6\u30a3\u3001\u3064\u307e\u308a\uff1a   \u521d\u3081\u3002 2\u3064\u306e\u7570\u306a\u308b\u3082\u306e x,y\u2208X{displaystyle x,yin X}a f\u2208A{displaystyle fin A}\u3067\u5b58\u5728\u3057\u307e\u3057\u305f f(x)\u2260f(y){displaystyle f(x)neq f(y)}\u3001  2\u3002 \u305d\u308c\u305e\u308c\u306b\u3064\u3044\u3066 x\u2208X{displaystyle xin X}a g\u2208A{displaystyle gin A}\u3067\u5b58\u5728\u3057\u307e\u3057\u305f g(x)\u22600{displaystyle g(x)neq 0}\u3001  3\u3002 \u305d\u308c – \u5834\u5408 K=C{displaystyle mathbb {K} =mathbb {C} } – \u307f\u3093\u306a\u3068 f\u2208A{displaystyle fin A}\u307e\u305f\u3001\u95a2\u9023\u3059\u308b\u5171\u5f79\u3001\u8907\u96d1\u306a\u95a2\u6570 f\u00af:X\u2192K,x\u21a6f(x)\u00af,{displaystyle {overline {f}}colon Xto mathbb {K} ,xmapsto {overline {f(x)}},}\u306e A{displaystyle A}\u542b\u307e\u308c\u3066\u3044\u307e\u3059  \u9069\u7528\u3082\u9069\u7528\u3055\u308c\u307e\u3059 A=C0{displaystyle a = c_ {0}} \u3002 \u7d39\u4ecb\u3055\u308c\u305f\u30d3\u30b7\u30e7\u30c3\u30d7\uff1a \u30b9\u30c8\u30fc\u30f3\u30ef\u30a4\u30a2\u30fc\u30c8\u30e9\u30b9\u5b9a\u7406\u306e\u4e00\u822c\u5316 \u3002\u306e\uff1a Pacific Journal of Mathematics \u3002 \u30d0\u30f3\u30c9  11 \u30011961\u5e74\u3001 S.  777\u2013783 \uff08 MR0133676 \uff09\u3002  Silvio Machado\uff1a \u53f8\u6559\u306e\u30ef\u30a4\u30a2\u30fc\u30ba\u30c8\u30e9\u30b9\u30b9\u30c8\u30fc\u30f3\u5b9a\u7406\u306e\u4e00\u822c\u5316\u306b\u3064\u3044\u3066 \u3002\u306e\uff1a \u6570\u5b66\u306e\u8abf\u67fb \u3002 \u30d0\u30f3\u30c9  39 \u30011977\u5e74\u3001 S.  218\u2013224 \uff08 MR0448046 \uff09\u3002  Friedrich Hirzebruch\u3001Winfried Scharlau\uff1a \u6a5f\u80fd\u5206\u6790\u306e\u7d39\u4ecb \uff08= \u30b7\u30ea\u30fc\u30ba\u300cB. I.\u9ad8\u6821\u306e\u30dd\u30b1\u30c3\u30c8\u30d6\u30c3\u30af\u300d \u3002 \u30d0\u30f3\u30c9  296 \uff09\u3002\u66f8\u8a8c\u7814\u7a76\u6240\u3001\u30de\u30f3\u30cf\u30a4\u30e0\u3001\u30a6\u30a3\u30fc\u30f3\u3001\u30c1\u30e5\u30fc\u30ea\u30c3\u30d21971\u3001ISBN 3-411-00296-4\uff08 MR0463864 \uff09\u3002  \u30c8\u30fc\u30de\u30b9\u30fbJ\u30fb\u30e9\u30f3\u30b9\u30d5\u30a9\u30fc\u30c9\uff1a \u53f8\u6559\u306e\u30b9\u30c8\u30fc\u30f3\u30fb\u30a6\u30a7\u30a4\u30a2\u30fc\u30c8\u30e9\u30b9\u5b9a\u7406\u306e\u77ed\u3044\u57fa\u672c\u7684\u306a\u8a3c\u62e0 \u3002\u306e\uff1a \u30b1\u30f3\u30d6\u30ea\u30c3\u30b8\u54f2\u5b66\u5354\u4f1a\u306e\u6570\u5b66\u7684\u624b\u7d9a\u304d \u3002 \u30d0\u30f3\u30c9  96 \u30011984\u5e74\u3001 S.  309\u2013311 \uff08 MR0757664 \uff09\u3002  \u30a6\u30a9\u30eb\u30bf\u30fc\u30fb\u30eb\u30fc\u30c7\u30a3\u30f3\uff1a \u6a5f\u80fd\u7684\u89e3\u6790 \uff08= \u7d14\u7c8b\u304a\u3088\u3073\u5fdc\u7528\u6570\u5b66\u306e\u56fd\u969b\u30b7\u30ea\u30fc\u30ba \uff09\u3002\u7b2c2\u7248\u200b\u200b\u3002 McGraw-Hill\u3001New York 1991\u3001ISBN 0-07-054236-8\uff08 MR1157815 \uff09\u3002  M\u00edche\u00e1l\u00f3Searcod\uff1a \u62bd\u8c61\u5206\u6790\u306e\u8981\u7d20 \uff08= \u30b9\u30d7\u30ea\u30f3\u30ac\u30fc\u306e\u5b66\u90e8\u6570\u5b66\u30b7\u30ea\u30fc\u30ba \u3002 \u30d0\u30f3\u30c9  15 \uff09\u3002 Springer Verlag\u3001\u30ed\u30f3\u30c9\u30f3\uff08u\u3002a\u3002\uff092002\u3001ISBN 1-85233-424-X\uff08 MR1870768 \uff09\u3002  \u30b9\u30c6\u30a3\u30fc\u30d6\u30f3\u30fb\u30a6\u30a3\u30e9\u30fc\u30c9\uff1a \u4e00\u822c\u7684\u306a\u30c8\u30dd\u30ed\u30b8 \uff08= \u6570\u5b66\u306eAddison-Wesley\u30b7\u30ea\u30fc\u30ba \uff09\u3002 Addison-Wesley\u3001\u8aad\u66f8\u3001\u30de\u30b5\u30c1\u30e5\u30fc\u30bb\u30c3\u30c4\uff08u\u3002a\u3002\uff091970\uff08 MR0264581 \uff09\u3002  \u2191  \u30a6\u30a9\u30eb\u30bf\u30fc\u30fb\u30eb\u30fc\u30c7\u30a3\u30f3\uff1a \u6a5f\u80fd\u7684\u89e3\u6790\u3002 1991\u3001S\u3002121FF  \u2191  \u30eb\u30fc\u30c7\u30a3\u30f3\u3001op\u3002 cit\u3002\u3001S\u3002121  \u2191  M\u00edche\u00e1l\u00f3Searcod\uff1a \u62bd\u8c61\u5206\u6790\u306e\u8981\u7d20\u3002 2002\u3001S\u3002241  \u2191  \u546a\u3044\u304b\u3089\u3001op\u3002 cit\u3002\u3001S\u3002243        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4"},{"@context":"http:\/\/schema.org\/","@type":"BreadcrumbList","itemListElement":[{"@type":"ListItem","position":1,"item":{"@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/#breadcrumbitem","name":"Enzyklop\u00e4die"}},{"@type":"ListItem","position":2,"item":{"@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/9148#breadcrumbitem","name":"\u53f8\u6559\u306e\u53f8\u6559 – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2"}}]}]