{"id":87439,"date":"2024-05-06T23:58:57","date_gmt":"2024-05-06T23:58:57","guid":{"rendered":"https:\/\/science-hub.click\/%E3%83%8F%E3%82%A4%E3%82%BC%E3%83%B3%E3%83%99%E3%83%AB%E3%82%AF%E4%B8%8D%E7%AD%89%E5%BC%8F%E3%81%AE%E9%A3%BD%E5%92%8C%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":"2024-05-06T23:58:57","modified_gmt":"2024-05-06T23:58:57","slug":"%E3%83%8F%E3%82%A4%E3%82%BC%E3%83%B3%E3%83%99%E3%83%AB%E3%82%AF%E4%B8%8D%E7%AD%89%E5%BC%8F%E3%81%AE%E9%A3%BD%E5%92%8C%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=87439","title":{"rendered":"\u30cf\u30a4\u30bc\u30f3\u30d9\u30eb\u30af\u4e0d\u7b49\u5f0f\u306e\u98fd\u548c\u306b\u3064\u3044\u3066\u8a73\u3057\u304f\u89e3\u8aac"},"content":{"rendered":"

\u5c0e\u5165<\/h2>

\u91cf\u5b50\u529b\u5b66\u306b\u304a\u3051\u308b\u30cf\u30a4\u30bc\u30f3\u30d9\u30eb\u30af\u306e\u4e0d\u78ba\u5b9a\u6027\u539f\u7406\u306f\u3001\u4e0d\u7b49\u5f0f\u5b9a\u7406\u306b\u95a2\u9023\u3057\u3066\u3044\u307e\u3059\u3002\u3053\u306e\u4e0d\u5e73\u7b49\u306f\u3001\u5e73\u7b49\u304c\u3042\u308b\u5834\u5408\u306b\u306f\u98fd\u548c\u3059\u308b<\/b>\u3068\u8a00\u308f\u308c\u307e\u3059\u3002\u3053\u306e\u98fd\u548c\u304c\u78ba\u8a8d\u3055\u308c\u308b\u3068\u3001\u72b6\u614b | \u03c8<\/span> > \u306f\u7814\u7a76\u3059\u308b\u3068\u8208\u5473\u6df1\u3044\u3053\u3068\u304c\u3088\u304f\u3042\u308a\u307e\u3059\u3002<\/p>

A \u3068 B \u3092\u4ea4\u63db\u3057\u306a\u3044 2 \u3064\u306e\u89b3\u5bdf\u53ef\u80fd\u306a\u6f14\u7b97\u5b50\u3068\u3057\u3001iC \u3092\u305d\u306e\u4ea4\u63db\u5b50\u3068\u3057\u3001A \u3068 B \u3092\u4e2d\u5fc3\u306b\u7f6e\u304f\u3068\u3001\u305b\u3044\u305c\u3044<\/p>

$$ {<\\psi|\\hat A^2|\\psi>\\cdot <\\psi|\\hat B^2|\\psi> = {1 \\over 4}<\\psi|\\hat C^2|\\psi>} $$<\/div><\/tr><\/table><\/td><\/tr><\/table><\/center>
\n\"\u30cf\u30a4\u30bc\u30f3\u30d9\u30eb\u30af\u4e0d\u7b49\u5f0f\u306e\u98fd\u548c\u306b\u3064\u3044\u3066\u8a73\u3057\u304f\u89e3\u8aac\"<\/figure>

\u4e0d\u7b49\u5f0f\u5b9a\u7406\u306e\u8a3c\u660e\u306e\u601d\u3044\u51fa<\/h2>

\u5b9a\u7406\u306e\u8aac\u660e\u306f\u6b21\u306e\u3068\u304a\u308a\u3067\u3059 (\u4e0d\u78ba\u5b9a\u6027\u539f\u7406\u3092\u53c2\u7167)\u3002<\/p>

<\/center>

A \u3068 B \u3092\u53ef\u63db\u3067\u306a\u3044 2 \u3064\u306e\u89b3\u6e2c\u53ef\u80fd\u306a\u6f14\u7b97\u5b50\u3068\u3057\u307e\u3059\u3002\u305d\u306e\u5834\u5408\u3001A \u3068 B \u3092\u540c\u6642\u306b\u6e2c\u5b9a\u3059\u308b\u3053\u3068\u306f\u3067\u304d\u307e\u305b\u3093\u3002\u7cbe\u5ea6\u306e\u6b20\u5982\u306f iC \u30b9\u30a4\u30c3\u30c1\u306b\u95a2\u9023\u3057\u3066\u3044\u307e\u3059\u3002 C\u6f14\u7b97\u5b50<\/a><\/span>\u306fHermitian<\/a><\/span>\u306a\u306e\u3067\u3001\u672c\u7269\u3067\u3059\u3002\u3069\u3061\u3089\u304b\u306e\u72b6\u614b | \u03c8<\/span> \u3001var(A) \u306f A \u306e\u5206\u6563<\/a><\/span>\u3001\u540c\u69d8\u306b var(B) \u3001B \u306e\u5206\u6563\u3082\u3001\u4e0d\u7b49\u5f0f\u304c\u66f8\u304d\u63db\u3048\u3089\u308c\u307e\u3059\u3002 <\/c><\/p>

$$ {<\\psi|\\hat{var}(A)|\\psi>\\cdot <\\psi|\\hat{var}(B)|\\psi> = {1 \\over 4}<\\psi|\\hat{var}(C)|\\psi>} $$<\/div><\/tr><\/table><\/td><\/tr><\/table><\/center>

\u30c7\u30e2\u30f3\u30b9\u30c8\u30ec\u30fc\u30b7\u30e7\u30f3<\/b>:<\/p>

A1 \u3092\u4e2d\u5fc3\u306b\u3042\u308b\u30aa\u30d6\u30b6\u30fc\u30d0\u30d6\u30eb<\/a><\/span>\u3068\u3057\u307e\u3059\u3002 := A – ; var(A)=<\/a> .(B1\u3082\u540c\u69d8)<\/a><\/a1\u00b2><\/p>

|f> := A1| \u306b\u9069\u7528\u3055\u308c\u308b\u30b7\u30e5\u30ef\u30eb\u30c4\u306e\u4e0d\u7b49\u5f0f\u03c8<\/span> > \u304a\u3088\u3073 |g> = B1| \u03c8<\/span> ><\/p>

var(A).var(B) > | \u3092\u4e0e\u3048\u307e\u3059\u3002 |\u00b2 \u3002<\/f|g><\/p>

\u307e\u305f\u306f A1.B1 = So\/2 +iC\/2 (2So := A1.B1 + B1.A1 \u3067\u3042\u308b\u305f\u3081)\u672c\u7269\u3067\u3059\uff09<\/so><\/p>

\u3057\u305f\u304c\u3063\u3066\u3001var(A).var(B) > 1\/4 \u00b2 + 1\/4 \u00b2\u3001\u5f69\u5ea6\u3042\u308a ( |f> = k |g> \u306e\u5834\u5408)<\/c><\/so><\/p>

\u81ea\u7531\u7c92\u5b50\u3078\u306e\u5fdc\u7528<\/h2>

\u7c92\u5b50\u304c\u81ea\u7531\u306a\u5834\u5408\u3001A = \u6f14\u7b97\u5b50 P \u304a\u3088\u3073 B = \u6f14\u7b97\u5b50 X \u3092\u8003\u616e\u3059\u308b\u3068\u3001\u6b21\u306e\u3053\u3068\u304c\u3059\u3050\u306b\u308f\u304b\u308a\u307e\u3059\u3002 <\/p>

$$ {[P,X]= -i\\hbar} $$<\/div> \u3001 \u305d\u308c\u3067
$$ {C= -1\\hbar} $$<\/div>\u3057\u305f\u304c\u3063\u3066\u3001k \u306e\u5024\u306f k = -i \u3068\u306a\u308a\u307e\u3059\u3002
$$ {2var(X)\/ \\hbar } $$<\/div> \u3001\u98fd\u548c\u72b6\u614b\u3067\u306f (P-p0) = k (X-x0) \u3068\u306a\u308a\u307e\u3059\u3002\u3053\u306e\u4e00\u6b21<\/b>\u5fae\u5206\u65b9\u7a0b\u5f0f\u3092\u89e3\u304f\u3053\u3068\u3067\u3001\u6b21\u306e\u3088\u3046\u306b\u306a\u308a\u307e\u3059\u3002 <\/p>

$$ { \\psi(x) = N exp-[\\frac{(x-x0)^2}{4v(X)}] } $$<\/div> \u3002
$$ {exp[\\frac{ip_0 x}{\\hbar}]} $$<\/div> \u3001 \u3068
$$ {N = \\frac{1}{[2\\pi var(X)]^\\frac{1}{4}}} $$<\/div><\/p>

\u3053\u308c\u306f\u30ac\u30a6\u30b9\u6ce2\u30d1\u30b1\u30c3\u30c8\u3067\u3042\u308a\u3001\u660e\u3089\u304b\u306b var(X).var(P)=1\/4 \u3067\u3059\u3002

$$ {\\hbar^2} $$<\/div> \u3002<\/p>

\u30ac\u30a6\u30b9\u5206\u5e03\u3092\u898b\u3064\u3051\u308b\u3053\u3068\u306f\u305d\u308c\u307b\u3069\u9a5a\u304f\u3079\u304d\u3053\u3068\u3067\u306f\u3042\u308a\u307e\u305b\u3093\u3002\u3057\u304b\u3057\u3001 \u03c8( x<\/i> , t<\/i> )<\/span>\u306e\u5206\u6563\u304c<\/a><\/span>\u907f\u3051\u3089\u308c\u306a\u3044\u305f\u3081\u3001\u6642\u9593\u4f9d\u5b58\u6027\u306b\u91cd\u8981\u306a\u6b20\u9665\u304c\u751f\u3058\u307e\u3059\u3002\u3064\u307e\u308a\u3001\u6ce2\u675f\u306f\u6642\u9593\u306e\u7d4c\u904e\u3068\u3068\u3082\u306b\u5e83\u304c\u308a\u307e\u3059<\/b>\u3002\u3057\u305f\u304c\u3063\u3066\u3001\u5206\u6563\u3092\u5236\u9650\u3059\u308b\u306b\u306f\u96fb\u4f4d\u304c\u4ecb\u5165\u3059\u308b\u5fc5\u8981\u304c\u3042\u308a\u307e\u3059\u3002\u3053\u308c\u306f\u8abf\u548c\u767a\u632f\u5668<\/a><\/span>\u306e\u5834\u5408\u306b\u5f53\u3066\u306f\u307e\u308a\u307e\u3059\u3002<\/p>

\n\"\u30cf\u30a4\u30bc\u30f3\u30d9\u30eb\u30af\u4e0d\u7b49\u5f0f\u306e\u98fd\u548c\u306b\u3064\u3044\u3066\u8a73\u3057\u304f\u89e3\u8aac\"<\/figure>

\u98fd\u548c<\/h2>

A1 | \u306e\u5834\u5408\u306f\u98fd\u548c\u304c\u3042\u308a\u307e\u3059\u3002 \u03c8<\/span> > = k B1 | \u03c8<\/span> >: \u3053\u306e\u72b6\u614b\u306f\u6700\u5c0f\u306e\u4e0d\u78ba\u5b9f\u6027\u3092\u9054\u6210\u3057\u307e\u3059\u3002<\/p>

\u52a0\u7b97<\/a><\/span>\u306b\u3088\u308a\u3001 k var(A) +1\/k var(B) = 2\u3053\u306e\u5834\u5408\u3001\u3053\u308c\u306f\u30bc\u30ed\u3067\u3059 (A \u3068 B \u306e\u91cf\u5b50\u76f8\u95a2\u306f\u30bc\u30ed\u3067\u3042\u308b\u3068\u8a00\u308f\u308c\u308b\u3053\u3068\u304c\u3042\u308a\u307e\u3059)\u3002\u305d\u3057\u3066\u5f15\u304d\u7b97<\/a><\/span>\u306b\u3088\u308a k var(A) -1\/k var(B) = i \u3001<\/c><\/so><\/p>

\u3057\u305f\u304c\u3063\u3066\u3001k \u306e\u5024\u306f k = i \u3068\u306a\u308a\u307e\u3059\u3002 \/2var(A) = -2var(B)\/i ;\u3053\u308c\u306b\u3088\u308a\u3001\u591a\u304f\u306e\u5834\u5408\u3001k \u3092\u8a55\u4fa1\u3067\u304d\u308b\u3088\u3046\u306b\u306a\u308a\u307e\u3059\u3002<\/c><\/c><\/p>

\u6b21\u306b\u3001A1-k.B1 \u304c\u98fd\u548c\u72b6\u614b\u3092\u6d88\u6ec5\u3055\u305b\u308b\u3068\u8a00\u3044\u307e\u3059\u3002<\/p>

\u30dc\u30a6\u30eb\u3078\u306e\u5857\u5e03 1\/n A x^n<\/h2>

\u7e70\u308a\u8fd4\u3057\u307e\u3059\u304c\u3001\u57fa\u5e95\u72b6\u614b\u306f<\/a><\/span>\u98fd\u548c\u306b\u5bfe\u5fdc\u3057\u3001\u3053\u306e\u7279\u6027\u306b\u3088\u308a= 1\/4\u3002

$$ {\\hbar^2} $$<\/div> \/mv(X)\u3002\u305d\u3057\u3066\u30d3\u30ea\u30a2\u30eb\u5b9a\u7406\u306f\u6b21\u306e\u3088\u3046\u306b\u306a\u308a\u307e\u3059\/n-1 = = Eo\/n;\u3053\u308c\u306b\u3088\u308a\u3001(\u6b21\u5143\u89e3\u6790\u306e\u307f\u306e\u5834\u5408): <\/ep><\/ec><\/ec><\/p>