{"type":"rich","categories":[],"published":"2018-08-12 19:49:51","height":"190","author_url":"https://blog.hatena.ne.jp/fortran66/","width":"100%","blog_title":"fortran66\u306e\u30d6\u30ed\u30b0","provider_name":"Hatena Blog","url":"https://fortran66.hatenablog.com/entry/2018/08/12/194951","provider_url":"https://hatena.blog","image_url":"https://images-fe.ssl-images-amazon.com/images/I/5131KTOV37L._SL160_.jpg","html":"<iframe src=\"https://hatenablog-parts.com/embed?url=https%3A%2F%2Ffortran66.hatenablog.com%2Fentry%2F2018%2F08%2F12%2F194951\" title=\"\u3010\u30e1\u30e2\u5e33\u3011\u5236\u9650\u4ed8\u304d\u5206\u5272 p(n,5)  - fortran66\u306e\u30d6\u30ed\u30b0\" class=\"embed-card embed-blogcard\" scrolling=\"no\" frameborder=\"0\" style=\"display: block; width: 100%; height: 190px; max-width: 500px; margin: 10px 0px;\"></iframe>","blog_url":"https://fortran66.hatenablog.com/","description":"Andrews & Eriksson \u300c\u6574\u6570\u306e\u5206\u5272\u300d\u6f14\u7fd2 88 \u3060\u3044\u3076\u6614\u306b\u8aad\u3093\u3067\u305f\u30a2\u30f3\u30c9\u30ea\u30e5\u30fc\u30ba\u3068\u30a8\u30ea\u30af\u30bd\u30f3\u306e\u300c\u6574\u6570\u306e\u5206\u5272\u300d\u306e\u6f14\u7fd2\u554f\u984c 88. \u304c\u9762\u5012\u304f\u3055\u304b\u3063\u305f\u306e\u3067\u98db\u3070\u3057\u3066\u3044\u305f\u306e\u3067\u3059\u304c\u3001\u590f\u4f11\u307f\u306a\u306e\u3067\u6687\u3064\u3076\u3057\u306b Maple/Mathematica \u306e\u624b\u3092\u501f\u308a\u3066\u3084\u3063\u3066\u307f\u307e\u3057\u305f\u3002\u3059\u3050\u5fd8\u308c\u308b\u306e\u3067\u30e1\u30e2\u3057\u3066\u304a\u304d\u307e\u3059\u3002\u6574\u6570\u306e\u5206\u5272\u4f5c\u8005: \u30b8\u30e7\u30fc\u30b8\u30fb\u30a2\u30f3\u30c9\u30ea\u30e5\u30fc\u30b9,\u30ad\u30e0\u30e2\u30fb\u30a8\u30ea\u30af\u30bd\u30f3,\u4f50\u85e4\u6587\u5e83\u51fa\u7248\u793e/\u30e1\u30fc\u30ab\u30fc: \u6570\u5b66\u66f8\u623f\u767a\u58f2\u65e5: 2006/05\u30e1\u30c7\u30a3\u30a2: \u5358\u884c\u672c\u3053\u306e\u5546\u54c1\u3092\u542b\u3080\u30d6\u30ed\u30b0\u3092\u898b\u308b\u304d\u3093\u3082\u30fc\u3063\u2606\u30fb\u30a8\u30ea\u30af\u30bd\u30f3 Integer Partitions\u4f5c\u8005: George E. Andrews,Kimmo Erik\u2026","title":"\u3010\u30e1\u30e2\u5e33\u3011\u5236\u9650\u4ed8\u304d\u5206\u5272 p(n,5) ","author_name":"fortran66","version":"1.0"}