[{"@context":"http:\/\/schema.org\/","@type":"BlogPosting","@id":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/16535#BlogPosting","mainEntityOfPage":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/16535","headline":"\u624b\u6a5f\u80fd – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2\u3001\u7121\u6599\u200b\u200b\u306e\u767e\u79d1\u4e8b\u5178","name":"\u624b\u6a5f\u80fd – \u30a6\u30a3\u30ad\u30da\u30c7\u30a3\u30a2\u3001\u7121\u6599\u200b\u200b\u306e\u767e\u79d1\u4e8b\u5178","description":"before-content-x4 \u306e\u30b0\u30e9\u30d5 WHO\uff08 \u30d0\u30c4 \uff09\uff09 \u8d64\u3068 \u3068\u3068\u3082\u306b\uff08 \u30d0\u30c4 \uff09\uff09 \u9752\u3002 \u98a8\u901a\u3057\u306e\u826f\u3044\u6a5f\u80fd WHO\uff08 \u30d0\u30c4 \uff09\u3053\u308c\u306f\u3001\u82f1\u56fd\u306e\u5929\u6587\u5b66\u8005\u30b8\u30e7\u30fc\u30b8\u30fb\u30d3\u30c7\u30eb\u30fb\u30a8\u30a2\u30ea\u30fc\uff081801\u20131892\uff09\u306b\u3061\u306a\u3093\u3067\u540d\u4ed8\u3051\u3089\u308c\u305f\u7279\u5225\u306a\u6a5f\u80fd\u3067\u3059\u3002\u95a2\u6570 WHO\uff08 \u30d0\u30c4 \uff09\uff09 \u304a\u3088\u3073\u95a2\u9023\u3059\u308b\u95a2\u6570 \u3068\u3068\u3082\u306b\uff08 \u30d0\u30c4","datePublished":"2020-05-13","dateModified":"2020-05-13","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:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/6\/61\/Airy_Functions.svg\/300px-Airy_Functions.svg.png","url":"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/6\/61\/Airy_Functions.svg\/300px-Airy_Functions.svg.png","height":"192","width":"300"},"url":"https:\/\/wiki.edu.vn\/all2jp\/wiki11\/archives\/16535","wordCount":5157,"articleBody":"     (adsbygoogle = window.adsbygoogle || []).push({});before-content-x4 \u306e\u30b0\u30e9\u30d5 WHO\uff08 \u30d0\u30c4 \uff09\uff09 \u8d64\u3068 \u3068\u3068\u3082\u306b\uff08 \u30d0\u30c4 \uff09\uff09 \u9752\u3002  \u98a8\u901a\u3057\u306e\u826f\u3044\u6a5f\u80fd WHO\uff08 \u30d0\u30c4 \uff09\u3053\u308c\u306f\u3001\u82f1\u56fd\u306e\u5929\u6587\u5b66\u8005\u30b8\u30e7\u30fc\u30b8\u30fb\u30d3\u30c7\u30eb\u30fb\u30a8\u30a2\u30ea\u30fc\uff081801\u20131892\uff09\u306b\u3061\u306a\u3093\u3067\u540d\u4ed8\u3051\u3089\u308c\u305f\u7279\u5225\u306a\u6a5f\u80fd\u3067\u3059\u3002\u95a2\u6570 WHO\uff08 \u30d0\u30c4 \uff09\uff09 \u304a\u3088\u3073\u95a2\u9023\u3059\u308b\u95a2\u6570 \u3068\u3068\u3082\u306b\uff08 \u30d0\u30c4 \uff09\uff09 \u3001\u6642\u306b\u306f\u98a8\u901a\u3057\u306e\u826f\u3044\u6a5f\u80fd\u3068\u3082\u547c\u3070\u308c\u307e\u3059\u304c\u3001\u305d\u308c\u3089\u306f\u901a\u5e38\u306e\u5fae\u5206\u65b9\u7a0b\u5f0f\u306e\u76f4\u7dda\u7684\u306b\u72ec\u7acb\u3057\u305f\u89e3\u3067\u3059\u3002 \uff08 \u521d\u3081 \uff09\uff09 d2ydx2 –  \u30d0\u30c4 \u3068 = 0 {displaystyle {frac {d^{2} y} {dx^{2}} -xy = 0\u3001\uff01} \u3002        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4\u3053\u306e\u5fae\u5206\u65b9\u7a0b\u5f0f\u306f\u547c\u3073\u51fa\u3055\u308c\u307e\u3059 \u98a8\u901a\u3057\u306e\u826f\u3044\u65b9\u7a0b\u5f0f o \u30b9\u30c8\u30fc\u30af\u30b9\u65b9\u7a0b\u5f0f \u3002\u3053\u308c\u306f\u3001\u6eb6\u6db2\u304c\u632f\u52d5\u6319\u52d5\u3092\u884c\u3046\u3053\u3068\u304b\u3089\u6307\u6570\u95a2\u6570\u7684\u6210\u9577\u3078\u3068\u9032\u3080\u30dd\u30a4\u30f3\u30c8\u3092\u6301\u3064\u6700\u3082\u5358\u7d14\u306a\u7dda\u5f62\u5fae\u5206\u65b9\u7a0b\u5f0f\u3067\u3059\u3002 \u3055\u3089\u306b\u3001Airy\u306e\u95a2\u6570\u306f\u3001\u4e09\u89d2\u5f62\u306e\u96fb\u4f4d\u4e95\u6238\u5185\u306e\u9589\u3058\u8fbc\u3081\u3089\u308c\u305f\u7c92\u5b50\u306e\u30b7\u30e5\u30ec\u30c7\u30a3\u30f3\u30ac\u30fc\u65b9\u7a0b\u5f0f\u306e\u89e3\u3068\u307e\u305f\u3001\u4e00\u5b9a\u306e\u529b\u306b\u3088\u3063\u3066\u5f71\u97ff\u3092\u53d7\u3051\u308b\u91cf\u5b50\u7c92\u5b50\u306e\u4e00\u6b21\u5143\u306e\u52d5\u304d\u306e\u89e3\u3068\u307e\u305f\u3001\u89e3\u6c7a\u7b56\u3067\u3059\u3002        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4Table of Contents\u5b9a\u7fa9 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u30d7\u30ed\u30d1\u30c6\u30a3 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u30a2\u30d7\u30ea\u30b1\u30fc\u30b7\u30e7\u30f3 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u30a2\u30b7\u30f3\u30c8\u30fc\u30b7\u30b9\u5f0f [ \u7de8\u96c6\u3057\u307e\u3059 ] \u8907\u96d1\u306a\u8b70\u8ad6 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u30b0\u30e9\u30d5\u30a3\u30c3\u30af [ \u7de8\u96c6\u3057\u307e\u3059 ] \u53c2\u7167 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u5916\u90e8\u30ea\u30f3\u30af [ \u7de8\u96c6\u3057\u307e\u3059 ] \u5b9a\u7fa9 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u306e\u5b9f\u969b\u306e\u5024\u306e\u305f\u3081 \u30d0\u30c4 \u3001\u98a8\u901a\u3057\u306e\u826f\u3044\u95a2\u6570\u306f\u3001\u7a4d\u5206\u306b\u3088\u3063\u3066\u5b9a\u7fa9\u3055\u308c\u307e\u3059\u3002 a \u79c1 \uff08 \u30d0\u30c4 \uff09\uff09 = 1\u03c0\u222b 0\u221ecos \u2061 \uff08 t33+xt\uff09\uff09 d t \u3002 {displaystyle mathrm {ai}\uff08x\uff09= {frac {1} {pi}} int _ {0}^{infty} cos left\uff08{frac {t^{3}} {3}}+xtright\uff09\u3001dt\u3002}  \u3053\u308c\u306f\u3001\u632f\u52d5\u306e\u6b63\u3068\u8ca0\u306e\u90e8\u5206\u304c\u4e92\u3044\u306b\u30ad\u30e3\u30f3\u30bb\u30eb\u3055\u308c\u308b\u305f\u3081\uff08\u90e8\u54c1\u3054\u3068\u306b\u7d71\u5408\u3059\u308b\u3053\u3068\u3067\u691c\u8a3c\u3067\u304d\u308b\u305f\u3081\uff09\u53ce\u675f\u3057\u307e\u3059\u3002 \u7d71\u5408\u8a18\u53f7\u5185\u3067\u5c0e\u51fa\u3055\u308c\u308b\u3068\u3001\u3053\u306e\u95a2\u6570\u304c\u5fae\u5206\u65b9\u7a0b\u5f0f\u3092\u6e80\u305f\u3059\u3053\u3068\u304c\u308f\u304b\u308a\u307e\u3059\uff08 \u521d\u3081 \uff09\u3002        (adsbygoogle = window.adsbygoogle || []).push({});after-content-x4\u3053\u306e\u65b9\u7a0b\u5f0f\u306b\u306f\u30012\u3064\u306e\u7dda\u5f62\u72ec\u7acb\u3057\u305f\u30bd\u30ea\u30e5\u30fc\u30b7\u30e7\u30f3\u304c\u3042\u308a\u307e\u3059\u3002\u4ed6\u306e\u30bd\u30ea\u30e5\u30fc\u30b7\u30e7\u30f3\u306e\u6a19\u6e96\u7684\u306a\u9078\u629e\u306f\u3001BI\u3068\u547c\u3070\u308c\u308b2\u756a\u76ee\u306e\u30bf\u30a4\u30d7\u306e\u98a8\u901a\u3057\u306e\u826f\u3044\u95a2\u6570\u3067\u3059\uff08 \u30d0\u30c4 \uff09\u3002\u3053\u308c\u306f\u3001AI\u3068\u540c\u3058\u632f\u5e45\u306e\u632f\u5e45\u3092\u6301\u3064\u6eb6\u6db2\u3068\u3057\u3066\u5b9a\u7fa9\u3055\u308c\u307e\u3059\uff08AI\uff09 \u30d0\u30c4 \uff09 \u3068\u3057\u3066 \u30d0\u30c4 \u5f7c\u306f-\u221e\u306b\u884c\u304d\u3001\u03c0\/2\u306e\u9045\u308c\u3092\u6301\u3063\u3066\u3044\u307e\u3059\uff1a b \u79c1 \uff08 \u30d0\u30c4 \uff09\uff09 = 1\u03c0\u222b 0\u221e[ exp\u2061(\u221213t3+xt)+sin\u2061(13t3+xt)] d t \u3002 {displaystyle mathrm {bi}\uff08x\uff09= {frac {1} {pi}} int _ {0}^{infty} \u3002} \u3002 \u30d7\u30ed\u30d1\u30c6\u30a3 [ \u7de8\u96c6\u3057\u307e\u3059 ] ai\u5024\uff08 \u30d0\u30c4 y bi\uff08 \u30d0\u30c4 \uff09\u304a\u3088\u3073\u305d\u306e\u8d77\u6e90\u306e\u6d3e\u751f\u7269\uff08 \u30d0\u30c4 = 0\uff09\u304c\u4e0e\u3048\u3089\u308c\u307e\u3059\uff1a Ai(0)=132\/3\u0393(23),Ai\u2032(0)=\u2212131\/3\u0393(13),Bi(0)=131\/6\u0393(23),Bi\u2032(0)=31\/6\u0393(13).{displaystyle {begin {aligned} mathrm {ai}\uff080\uff09\uff06{} = {frac {1} {3^{2\/3} gamma\uff08{frac {2}}}}}}}}}\u3001\uff06quad mathrm {ai} ma\uff08{frac {1} {3}}\uff09}}\u3001\\ mathrm {bi}\uff080\uff09\uff06{} = {frac {1} {3^{1\/6} gamma\uff08{frac {2} {3}}\uff09}}}} }} {gamma\uff08{frac {1} {3}}\uff09}}\u3002end {aligned}}}}}  \u3053\u3053\u3067\u3001\u03b3\u306f\u30ac\u30f3\u30de\u95a2\u6570\u3092\u793a\u3057\u307e\u3059\u3002\u4e0a\u8a18\u306f\u3001AI\u306eWronskian\u3092\u610f\u5473\u3057\u307e\u3059 \u30d0\u30c4 y bi\uff08 \u30d0\u30c4 \uff09\u306f1\/\u03c0\u3067\u3059\u3002 \u3068 \u30d0\u30c4 \u305d\u308c\u306f\u30dd\u30b8\u30c6\u30a3\u30d6\u3067\u3059\u3001ai\uff08 \u30d0\u30c4 \uff09\u967d\u6027\u3067\u3042\u308a\u3001\u51f8\u3067\u3001\u6307\u6570\u95a2\u6570\u7684\u306b\u30bc\u30ed\u306b\u6e1b\u5c11\u3057\u3001bi\uff08 \u30d0\u30c4 \uff09\u967d\u6027\u3067\u51f8\u3067\u3001\u6307\u6570\u95a2\u6570\u7684\u306b\u6210\u9577\u3057\u307e\u3059\u3002\u3044\u3064 \u30d0\u30c4 \u30cd\u30ac\u30c6\u30a3\u30d6\u3067\u3059\u3001ai\uff08 \u30d0\u30c4 \uff09y b\uff08 \u30d0\u30c4 \uff09\u5468\u6ce2\u6570\u304c\u5897\u52a0\u3057\u3001\u632f\u5e45\u304c\u6e1b\u5c11\u3059\u308b\u3068\u3001\u30bc\u30ed\u524d\u5f8c\u306b\u632f\u52d5\u3057\u307e\u3059\u3002\u3053\u308c\u306f\u3001\u4ee5\u4e0b\u306e\u6f38\u8fd1\u5f0f\u3068\u4e00\u81f4\u3057\u307e\u3059\u3002 \u30a2\u30d7\u30ea\u30b1\u30fc\u30b7\u30e7\u30f3 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u5358\u4e00\u5bf8\u6cd5\u3067\u79fb\u52d5\u3057\u3001\u7dda\u5f62\u96fb\u4f4d\uff08\u96fb\u5b50\u4e0a\u306e\u5747\u4e00\u306a\u96fb\u754c\u306b\u3088\u3063\u3066\u751f\u6210\u3055\u308c\u308b\u3082\u306e\u306a\u3069\uff09\u306e\u5f71\u97ff\u3092\u53d7\u3051\u308b\u7c92\u5b50\u306b\u5bfe\u3059\u308b\u30b7\u30e5\u30ec\u30c7\u30a3\u30f3\u30ac\u30fc\u306e\u65b9\u7a0b\u5f0f\u306f \u2212\u210f22md2\u03c8(x)dx2+ f \u30d0\u30c4 \u03c6 \uff08 \u30d0\u30c4 \uff09\uff09 = \u3068 \u03c6 \uff08 \u30d0\u30c4 \uff09\uff09 {displaystyle {frac {-hbar^{2}} {2m}} {frac {d^{2} psi\uff08x\uff09} {dx^{2}}}}+fxpsi\uff08x\uff09= epsi\uff08x\uff09}}  \u3069\u3053 f {displaystyle f} \u7c92\u5b50\u306b\u52a0\u3048\u3089\u308c\u308b\u306e\u306f\u529b\u3067\u3059\u3002\u5909\u6570\u3092\u5909\u66f4\u3057\u307e\u3059\uff1a \u306e = (2m\u210f2F2)1\/3\uff08 f \u30d0\u30c4  –  \u3068 \uff09\uff09 {displaystyle u = left\uff08{frac {2m} {hbar^{2} f^{2}}}\u53f3\uff09^{1\/3}\uff08fx-e\uff09}  \u6b21\u306b\u3001\u30c1\u30a7\u30fc\u30f3\u30eb\u30fc\u30eb\u306b\u3088\u3063\u3066\uff1a ddx= \u2202u\u2202xddu= (2mF\u210f2)1\/3ddu{displaystyle {frac {dx} {dx}} = {frac {partial u} {partial x}} {frac {du}} = left\uff08{frac {2mf} {hbar ^{2}}} {du} {1\/3} {du} {du} {du}  \u3068\u3057\u3066 \u306e {displaystyleu} \u305d\u308c\u306f\u7dda\u5f62\u3067\u3059\uff1a d2dx2= (2mF\u210f2)2\/3d2du2{displaystyle {frac {d^{2}} {dx^{2}}} = left\uff08{frac {2mf} {hbar^{2}}}\u53f3\uff09^{2\/3} {frac {d^{2}}} {du^{2}}}}} {  Schr\u00f6dinger\u65b9\u7a0b\u5f0f\u306b\u7f6e\u304d\u63db\u3048\u308b\uff1a \u210f22m(2mF\u210f2)2\/3d2\u03c8(u)du2 –  (2m\u210f2F2)\u22121\/3\u306e \u03c6 \uff08 \u306e \uff09\uff09 = 0 {displaystyle {frac {hbar ^{2}} {2m}}\u5de6\uff08{frac {2mf} {hbar ^{2}}}\u53f3\uff09 ^{2\/3} {frac {d ^{2} psi\uff08u\uff09} {{2m {{2m} {2m} {2m} {2m} {2m} 2} f^{2}}}\u53f3\uff09^{ –  1\/3} upsi\uff08u\uff09= 0}  \u3067\u639b\u3051\u307e\u3059 \uff08 2m\u210f2F\uff09\uff09 2 \/3 {displaystyle left\uff08{frac {2m} {hbar ^{2} f}}\u53f3\uff09 ^{2\/3}}  d2\u03c8(u)du2 –  \u306e \u03c6 \uff08 \u306e \uff09\uff09 = 0 {displaystyle {frac {d^{2} psi\uff08u\uff09} {di^{2}}}}}}  –  upsi\uff08u\uff09= 0}}}}}}}}}}}}}}  \u3053\u308c\u306f\u98a8\u901a\u3057\u306e\u826f\u3044\u65b9\u7a0b\u5f0f\u3067\u3059\u3002\u6b21\u306b\u3001\u30b7\u30e5\u30ec\u30c7\u30a3\u30f3\u30ac\u30fc\u65b9\u7a0b\u5f0f\u306e\u4e00\u822c\u7684\u306a\u89e3\u306f\u98a8\u901a\u3057\u306e\u826f\u3044\u95a2\u6570\u306e\u89b3\u70b9\u304b\u3089\u3067\u3059\u3002 \u03c6 \uff08 \u30d0\u30c4 \uff09\uff09 = a WHO \u2061 \uff08 \u306e \uff09\uff09 + b \u3068\u3068\u3082\u306b \u2061 \uff08 \u306e \uff09\uff09 = a WHO \u2061 [ (2m\u210f2F)1\/3(Fx\u2212E)] + b \u3068\u3068\u3082\u306b \u2061 [ (2m\u210f2F)1\/3(Fx\u2212E)] {displaystyle psi\uff08x\uff09= aoperatorname {ai}\uff08u\uff09+boperatorname {bi}\uff08u\uff09= aoperatorname {ai}\u5de6[{frac {2m} {hbar ^{2} f}}\u53f3] ^{1\/3}\uff08fix-e\uff09\uff08fix-e\uff09{fix-e\uff09 {2m} {hbar ^{2} f}}\u53f3\uff09 ^{1\/3}\uff08fx-e\uff09\u53f3]}  \u30a2\u30b7\u30f3\u30c8\u30fc\u30b7\u30b9\u5f0f [ \u7de8\u96c6\u3057\u307e\u3059 ] \u30a8\u30a2\u30ea\u30fc\u6a5f\u80fd\u306e\u6f38\u8fd1\u6319\u52d5\u306fAs\u3067\u3059 \u30d0\u30c4 +\u221e\u304c\u4e0e\u3048\u3089\u308c\u308b\u50be\u5411\u304c\u3042\u308a\u307e\u3059 Ai(x)\u223ce\u221223x3\/22\u03c0x1\/4Bi(x)\u223ce23x3\/2\u03c0x1\/4.{displaystyle {begin {aligned} mathrm {ai}\uff08x\uff09\uff06{} sim {frac {e^{ –  {frac {2} {3}} x^{3\/2}}}} {2 {sqrt {pi}} sim {frac {e^{{frac {2} {3}} x^{3\/2}}} {{sqrt {pi}}\u3001x^{1\/4}}}\u3002  \u307e\u305f\u3001\u3053\u308c\u3089\u306e\u5236\u9650\uff08Abramowitz and Stegun\u30011954\uff09\u304a\u3088\u3073\uff08Olver\u30011974\uff09\u306b\u30ea\u30b9\u30c8\u3055\u308c\u3066\u3044\u308b\u6f38\u8fd1\u62e1\u5f35\u3082\u3042\u308a\u307e\u3059\u3002 \u8907\u96d1\u306a\u8b70\u8ad6 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u98a8\u901a\u3057\u306e\u826f\u3044\u95a2\u6570\u306e\u5b9a\u7fa9\u306f\u3001\u6b21\u306e\u3088\u3046\u306b\u8907\u96d1\u306a\u5e73\u9762\u306b\u62e1\u5f35\u3067\u304d\u307e\u3059\u3002 a \u79c1 \uff08 \u3068 \uff09\uff09 = 12\u03c0i\u222b Cexp \u2061 \uff08 t33\u2212zt\uff09\uff09 d t \u3001 {displaystyle mathrm {ai}\uff08z\uff09= {frac {1} {2pi i}} int _ {c} exp\uff08{frac {t^{3}} {3}}  –  ztright\uff09\u3001dt\u3001}  \u7a4d\u5206\u304c\u8ecc\u8de1\u3067\u884c\u308f\u308c\u308b\u5834\u5408 c {displaystyle c} \u8b70\u8ad6\u306e\u3042\u308b\u7121\u9650\u306e\u30dd\u30a4\u30f3\u30c8\u304b\u3089\u59cb\u307e\u308a\u307e\u3059 – \uff081\/3\uff09\u03c0\u3068\u3001\u5f15\u6570\uff081\/3\uff09\u03c0\u3067\u7121\u9650\u306e\u30dd\u30a4\u30f3\u30c8\u3067\u7d42\u308f\u308a\u307e\u3059\u3002\u307e\u305f\u306f\u3001\u65b9\u7a0b\u5f0f\u3092\u4f7f\u7528\u3067\u304d\u307e\u3059 \u3068 \u300c  –  \u30d0\u30c4 \u3068 = 0 {displaystyle y ” -xy = 0} \u305d\u3053\u306b\u4f38\u3073\u308b\uff08 \u30d0\u30c4 y bi\uff08 \u30d0\u30c4 \uff09\u8907\u96d1\u306a\u5e73\u9762\u5185\u306e\u6a5f\u80fd\u5168\u4f53\u306b\u3002 \u30b0\u30e9\u30d5\u30a3\u30c3\u30af [ \u7de8\u96c6\u3057\u307e\u3059 ] \u53c2\u7167 [ \u7de8\u96c6\u3057\u307e\u3059 ] \u30df\u30eb\u30c8\u30f3\u30fb\u30a2\u30d6\u30e9\u30e2\u30a6\u30a3\u30c3\u30c4\u3068\u30a2\u30a4\u30ea\u30fc\u30f3\u30fbA\u30fb\u30b9\u30c6\u30fc\u30ac\u30f3\uff081954\uff09\u3002 \u6570\u5f0f\u3001\u30b0\u30e9\u30d5\u3001\u6570\u5b66\u306e\u30c6\u30fc\u30d6\u30eb\u3092\u4f7f\u7528\u3057\u305f\u6570\u5b66\u6a5f\u80fd\u306e\u30cf\u30f3\u30c9\u30d6\u30c3\u30af \u3001 \uff08\u00a710.4\u3092\u53c2\u7167\uff09 \u3002\u56fd\u7acb\u6a19\u6e96\u5c40\u3002 Airy\uff081838\uff09\u3002\u82db\u6027\u306e\u8fd1\u304f\u306e\u5149\u306e\u5f37\u3055\u306b\u3064\u3044\u3066\u3002 \u30b1\u30f3\u30d6\u30ea\u30c3\u30b8\u54f2\u5b66\u5354\u4f1a\u306e\u53d6\u5f15\u3001  6 \u3001379\u2013402\u3002 Olver\uff081974\uff09\u3002 \u6f38\u8fd1\u7684\u304a\u3088\u3073\u7279\u5225\u306a\u6a5f\u80fd\u3001 \u7b2c11\u7ae0\u3002\u30a2\u30ab\u30c7\u30df\u30c3\u30af\u30d7\u30ec\u30b9\u3001\u30cb\u30e5\u30fc\u30e8\u30fc\u30af\u3002 OlivierVall\u00e9eandManuel Soares\uff082004\uff09\u3001\u300c\u30a8\u30a2\u30ea\u30fc\u306a\u6a5f\u80fd\u3068\u7269\u7406\u5b66\u3078\u306e\u5fdc\u7528\u300d\u3001\u30ed\u30f3\u30c9\u30f3\u306eImperial College Press\u3002 \u30cf\u30ed\u30eb\u30c9\u30fb\u30ea\u30c1\u30e3\u30fc\u30c9\u30fb\u30b9\u30a4\u30fc\u30bf\u30fc\uff081994\uff09\u3002 \u661f\u30c6\u30b9\u30c8\u5929\u6587\u5b66\u671b\u9060\u93e1\uff1a\u5149\u5b66\u8a55\u4fa1\u3068\u8abf\u6574\u306e\u305f\u3081\u306e\u30de\u30cb\u30e5\u30a2\u30eb \u3002\u30d0\u30fc\u30b8\u30cb\u30a2\u5dde\u30ea\u30c3\u30c1\u30e2\u30f3\u30c9\uff1a\u30a6\u30a3\u30eb\u30de\u30f3\u30d9\u30eb\u3002 ISBN 978-0-943396-44-6 \u3002  \uff08 \u591a\u304f\u306e\u4f8b\u306e\u753b\u50cf\u304c\u3042\u308a\u307e\u3059 \uff09\uff09 \u5916\u90e8\u30ea\u30f3\u30af [ \u7de8\u96c6\u3057\u307e\u3059 ]          (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\/16535#breadcrumbitem","name":"\u624b\u6a5f\u80fd – 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