{"id":67103,"date":"2024-03-19T10:17:54","date_gmt":"2024-03-19T10:17:54","guid":{"rendered":"https:\/\/science-hub.click\/%E3%82%AA%E3%82%A4%E3%83%A9%E3%83%BC%E3%83%BB%E3%83%9E%E3%82%B9%E3%82%B1%E3%83%AD%E3%83%BC%E3%83%8B%E5%AE%9A%E6%95%B0%E3%81%AB%E3%81%A4%E3%81%84%E3%81%A6%E8%A9%B3%E3%81%97%E3%81%8F%E8%A7%A3%E8%AA%AC\/"},"modified":"2024-03-19T10:17:54","modified_gmt":"2024-03-19T10:17:54","slug":"%E3%82%AA%E3%82%A4%E3%83%A9%E3%83%BC%E3%83%BB%E3%83%9E%E3%82%B9%E3%82%B1%E3%83%AD%E3%83%BC%E3%83%8B%E5%AE%9A%E6%95%B0%E3%81%AB%E3%81%A4%E3%81%84%E3%81%A6%E8%A9%B3%E3%81%97%E3%81%8F%E8%A7%A3%E8%AA%AC","status":"publish","type":"post","link":"https:\/\/science-hub.click\/?p=67103","title":{"rendered":"\u30aa\u30a4\u30e9\u30fc\u30fb\u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u306b\u3064\u3044\u3066\u8a73\u3057\u304f\u89e3\u8aac"},"content":{"rendered":"

\u6570\u5b66\u3067\u306f\u3001\u30aa\u30a4\u30e9\u30fc \u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u306f<\/strong>\u3001\u4e3b\u306b\u6570\u8ad6\u3067\u4f7f\u7528\u3055\u308c\u308b\u6570\u5b66\u7684\u5b9a\u6570\u3067\u3042\u308a\u3001\u8abf\u548c\u7d1a\u6570\u3068\u81ea\u7136\u5bfe\u6570\u306e\u5dee\u306e\u9650\u754c\u3068\u3057\u3066\u5b9a\u7fa9\u3055\u308c\u307e\u3059\u3002<\/p>

\u610f\u5473<\/a><\/span><\/span><\/h2>

\u30aa\u30a4\u30e9\u30fc\u30fb\u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u03b3<\/span>\u306f\u6b21\u306e\u3088\u3046\u306b\u5b9a\u7fa9\u3055\u308c\u307e\u3059\u3002 <\/p>

$$ {\\gamma = \\lim_{n \\rightarrow \\infty } \\left( 1+ \\frac{1}{2} + \\frac{1}{3} + \\frac{1}{4} + … + \\frac{1}{n} – \\ln(n) \\right)} $$<\/div> \u3001<\/dd><\/dl>

\u307e\u305f\u306f\u3001\u5727\u7e2e\u3055\u308c\u305f\u5f62\u5f0f\u3067: <\/p>

$$ {\\gamma = \\lim_{n \\rightarrow \\infty } \\left( \\sum_{k=1}^{n} \\frac {1}{k} – \\ln(n) \\right)} $$<\/div> \u3002<\/dd><\/dl>

\u8abf\u548c<\/a><\/span>\u7cfb\u5217\u306f\u3001\u4e00\u822c\u7684\u306a\u7528\u8a9e\u30b7\u30fc\u30b1\u30f3\u30b9ln( n<\/i> )<\/span>\u3068\u540c\u69d8<\/a><\/span>\u306b\u767a\u6563\u3057\u307e\u3059\u3002\u3053\u306e\u5b9a\u6570\u306e\u5b58\u5728\u306f\u30012 \u3064\u306e\u5f0f\u304c\u6f38\u8fd1\u7684\u306b\u95a2\u9023\u3057\u3066\u3044\u308b\u3053\u3068\u3092\u793a\u3057\u307e\u3059\u3002<\/p>

\n\"\u30aa\u30a4\u30e9\u30fc\u30fb\u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u306b\u3064\u3044\u3066\u8a73\u3057\u304f\u89e3\u8aac\"<\/figure>

\u30d7\u30ed\u30d1\u30c6\u30a3<\/span><\/h2>

\u4e00\u822c\u7684\u306a\u30d7\u30ed\u30d1\u30c6\u30a3<\/span><\/h3>

\u30aa\u30a4\u30e9\u30fc\u30fb\u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u304c\u6709\u7406\u6570<\/a><\/span>\u3067\u3042\u308b\u304b\u3069\u3046\u304b\u306f\u307e\u3060\u4e0d\u660e\u3067\u3059\u3002\u305f\u3060\u3057\u3001\u5b9a\u6570\u306e\u9023\u5206\u6570\u5206\u6790\u306b\u3088\u308a\u3001\u5b9a\u6570\u304c\u6709\u7406\u6570\u3067\u3042\u308c\u3070<\/a><\/span>\u3001\u5206\u6bcd\u306e 10 \u9032\u6570\u304c 10 242080<\/sup>\u6841\u3092\u8d85\u3048\u308b\u3053\u3068\u304c\u308f\u304b\u308a\u307e\u3059\u3002<\/p>

\u305d\u306e\u4ed6\u306e\u6587\u8a00<\/span><\/h3>

\u5b9a\u6570\u306f\u3001(\u30aa\u30a4\u30e9\u30fc\u306b\u3088\u3063\u3066\u5c0e\u5165\u3055\u308c\u305f\u3088\u3046\u306b) \u7d1a\u6570\u306e\u660e\u793a\u7684\u306a\u5f62\u5f0f\u3067\u5b9a\u7fa9\u3067\u304d\u307e\u3059\u3002 <\/p>

$$ {\\gamma = \\sum_{k=1}^\\infty \\left[ \\frac{1}{k} – \\log \\left( 1 + \\frac{1}{k} \\right) \\right].} $$<\/div><\/dd><\/dl>

\u3053\u308c\u306f\u3044\u304f\u3064\u304b\u306e\u7a4d\u5206\u306b\u3088\u3063\u3066\u3082\u4e0e\u3048\u3089\u308c\u307e\u3059<\/span>\u3002 <\/p>

$$ {\\gamma = \\int_1^\\infty\\left({1\\over E(x)}-{1\\over x}\\right)\\,dx} $$<\/div> ( E<\/i><\/span>\u306f\u6574\u6570\u90e8\u5206\u306e\u95a2\u6570) <\/dd>
$$ {= – \\int_0^\\infty { e^{-x} \\log x }\\,dx} $$<\/div><\/dd>
$$ {= – \\int_0^1 { \\log\\log\\left(\\frac{1}{x}\\right) }\\,dx} $$<\/div><\/dd>
$$ {= \\int_0^\\infty {\\left(\\frac{1}{1-e^{-x}}-\\frac{1}{x} \\right)e^{-x} }\\,dx} $$<\/div><\/dd>
$$ {= \\int_0^\\infty { \\frac{1}{x} \\left( \\frac{1}{1+x}-e^{-x} \\right) }\\,dx} $$<\/div> \u3002<\/dd><\/dl><\/dd><\/dl>

\u03b3 \u3092<\/span>\u542b\u3080\u4ed6\u306e\u7a4d\u5206\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059\u3002 <\/p>

$$ {\\int_0^\\infty { e^{-x^2} \\log(x) }\\,dx = -1\/4(\\gamma+2 \\log 2) \\sqrt{\\pi}} $$<\/div><\/dd>
$$ {\\int_0^\\infty { e^{-x} (\\log(x))^2 }\\,dx = \\gamma^2 + \\frac{\\pi^2}{6}} $$<\/div> \u3002<\/dd><\/dl>

\u03b3 \u3092<\/span>\u4e8c\u91cd\u7a4d\u5206<\/a><\/span>\u306e\u5f62\u3067\u8868\u3059\u3053\u3068\u304c\u3067\u304d\u307e\u3059 (\u3053\u3053\u3067\u306f\u7b49\u4fa1\u7d1a\u6570\u3092\u4f7f\u7528\u3057\u307e\u3059)\u3002 <\/p>

$$ {\\gamma = \\int_{0}^{1}\\int_{0}^{1} \\frac{x-1}{(1-x\\,y)\\log(x\\,y)} \\, dx\\,dy = \\sum_{n=1}^\\infty \\left( \\frac{1}{n}-\\log \\left( \\frac{n+1}{n} \\right) \\right)} $$<\/div> \u3002<\/dd><\/dl>

\u3055\u3089\u306b \uff1a <\/p>

$$ {\\log \\left( \\frac{4}{\\pi} \\right) = \\int_{0}^{1}\\int_{0}^{1} \\frac{x-1}{(1+x\\,y)\\log(x\\,y)} \\, dx\\,dy = \\sum_{n=1}^\\infty (-1)^{n-1} \\left( \\frac{1}{n}-\\log \\left( \\frac{n+1}{n} \\right) \\right)} $$<\/div> \u3002<\/dd><\/dl>

2 \u3064\u306e\u5b9a\u6570\u306f\u30012 \u3064\u306e\u7cfb\u5217\u306b\u3088\u3063\u3066\u3082\u30ea\u30f3\u30af\u3055\u308c\u3066\u3044\u307e\u3059\u3002 <\/p>

$$ {\\gamma = \\sum_{n=1}^\\infty \\frac{N_1(n) + N_0(n)}{2n(2n+1)}} $$<\/div><\/dd>
$$ {\\log \\left( \\frac{4}{\\pi} \\right) = \\sum_{n=1}^\\infty \\frac{N_1(n) – N_0(n)}{2n(2n+1)}} $$<\/div><\/dd><\/dl>

\u3053\u3053\u3067\u3001 N<\/i> 1<\/sub> ( n<\/i> )<\/span>\u3068N<\/i> 0<\/sub> ( n<\/i> )<\/span>\u306f\u3001 n \u3092<\/i><\/span>\u57fa\u6570 2 \u3067\u8868\u3059\u3068\u304d\u306e 1 \u3068 0 \u306e\u6570<\/a><\/span>\u3067\u3059\u3002<\/p>

\u30aa\u30a4\u30e9\u30fc\u5b9a\u6570\u306e\u305d\u306e\u4ed6\u306e\u975e\u53e4\u5178\u7684\u8868\u73fe\u306b\u3064\u3044\u3066\u306f\u3001\u300c\u4e8c\u6b21\u6e2c\u5b9a\u300d\u306e\u8a18\u4e8b\u3092\u53c2\u7167\u3057\u3066\u304f\u3060\u3055\u3044\u3002<\/p>

\n\"\u30aa\u30a4\u30e9\u30fc\u30fb\u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u306b\u3064\u3044\u3066\u8a73\u3057\u304f\u89e3\u8aac\"<\/figure>

\u7279\u5b9a\u306e\u6a5f\u80fd\u3068\u306e\u95a2\u4fc2<\/span><\/h3>

\u30aa\u30a4\u30e9\u30fc\u30fb\u30de\u30b9\u30b1\u30ed\u30fc\u30cb\u5b9a\u6570\u306b\u306f\u3001\u4ed6\u306e\u7279\u5b9a\u306e\u95a2\u6570\u3068\u306e\u30ea\u30f3\u30af\u304c\u3042\u308a\u307e\u3059\u3002<\/p>