جدول معاملات كلبسش-غوردان

الصيغة

الصيغة:Formulation

معاملات كلبسش-غوردان هي حلول ل:

| (j_{1} j_{2}) j m ⟩ = \sum_{m_{1} = - j_{1}}^{j_{1}} \sum_{m_{2} = - j_{2}}^{j_{2}} | j_{1} m_{1} j_{2} m_{2} ⟩ ⟨ j_{1} j_{2}; m_{1} m_{2} | j_{1} j_{2}; j m ⟩

بشكل مباشر (صريح) إلى:

\begin{array}{r} ⟨ j_{1} j_{2}; m_{1} m_{2} | j_{1} j_{2}; j m ⟩ = & δ_{m, m_{1} + m_{2}} \sqrt{\frac{(2 j + 1) (j + j_{1} - j_{2})! (j - j_{1} + j_{2})! (j_{1} + j_{2} - j)!}{(j_{1} + j_{2} + j + 1)!}} \times \\ \sqrt{(j + m)! (j - m)! (j_{1} - m_{1})! (j_{1} + m_{1})! (j_{2} - m_{2})! (j_{2} + m_{2})!} \times \\ \sum_{k} \frac{(- 1)^{k}}{k! (j_{1} + j_{2} - j - k)! (j_{1} - m_{1} - k)! (j_{2} + m_{2} - k)! (j - j_{2} + m_{1} + k)! (j - j_{1} - m_{2} + k)!} . \end{array}

The summation is extended over all integer $k$ for which the argument of every factorial is nonnegative.^[1]

For brevity, solutions with $m < 0$ and $j 1 < j 2$ are omitted. They may be calculated using the simple relations

⟨ j_{1} j_{2}; m_{1} m_{2} | j_{1} j_{2}; j m ⟩ = (- 1)^{j - j_{1} - j_{2}} ⟨ j_{1} j_{2}; - m_{1}, - m_{2} | j_{1} j_{2}; j, - m ⟩

.

و

⟨ j_{1} j_{2}; m_{1} m_{2} | j_{1} j_{2}; j m ⟩ = (- 1)^{j - j_{1} - j_{2}} ⟨ j_{2} j_{1}; m_{2} m_{1} | j_{2} j_{1}; j m ⟩

.

القائمة الكاملة ^[2]

$j 2 =0$

عندما تكون j₂=0، فإن معاملات كلبسش-غوردان تعطي $δ_{j, j_{1}} δ_{m, m_{1}}$ .

$j 1 = 1 / 2, j 2 = 1 / 2$

m =1

j

m 1, m 2

	1
1/2, 1/2	$1$

m =0

j

m 1, m 2

	1	0
1/2, -1/2	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{2}}$
-1/2, 1/2	$\sqrt{\frac{1}{2}}$	$- \sqrt{\frac{1}{2}}$

$j 1 =1, j 2 = 1 / 2$

m = 3 / 2

j

m 1, m 2

	3/2
1, 1/2	$1$

m = 1 / 2

j

m 1, m 2

	3/2	1/2
1, -1/2	$\sqrt{\frac{1}{3}}$	$\sqrt{\frac{2}{3}}$
0, 1/2	$\sqrt{\frac{2}{3}}$	$- \sqrt{\frac{1}{3}}$

$j 1 =1, j 2 =1$

m =2

j

m 1, m 2

	2
1, 1	$1$

m =1

j

m 1, m 2

	2	1
1, 0	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{2}}$
0, 1	$\sqrt{\frac{1}{2}}$	$- \sqrt{\frac{1}{2}}$

m =0

j

m 1, m 2

	2	1	0
1, -1	$\sqrt{\frac{1}{6}}$	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{3}}$
0, 0	$\sqrt{\frac{2}{3}}$	$0$	$- \sqrt{\frac{1}{3}}$
-1, 1	$\sqrt{\frac{1}{6}}$	$- \sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{3}}$

$j 1 = 3 / 2, j 2 = 1 / 2$

m =2

j

m 1, m 2

	2
3/2, 1/2	$1$

m =1

j

m 1, m 2

	2	1
3/2, -1/2	$\frac{1}{2}$	$\sqrt{\frac{3}{4}}$
1/2, 1/2	$\sqrt{\frac{3}{4}}$	$- \frac{1}{2}$

m =0

j

m 1, m 2

	2	1
1/2, -1/2	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{2}}$
-1/2, 1/2	$\sqrt{\frac{1}{2}}$	$- \sqrt{\frac{1}{2}}$

$j 1 = 3 / 2, j 2 =1$

m = 5 / 2

j

m 1, m 2

	5/2
3/2, 1	$1$

m = 3 / 2

j

m 1, m 2

	5/2	3/2
3/2, 0	$\sqrt{\frac{2}{5}}$	$\sqrt{\frac{3}{5}}$
1/2, 1	$\sqrt{\frac{3}{5}}$	$- \sqrt{\frac{2}{5}}$

m = 1 / 2

j

m 1, m 2

	5/2	3/2	1/2
3/2, -1	$\sqrt{\frac{1}{10}}$	$\sqrt{\frac{2}{5}}$	$\sqrt{\frac{1}{2}}$
1/2, 0	$\sqrt{\frac{3}{5}}$	$\sqrt{\frac{1}{15}}$	$- \sqrt{\frac{1}{3}}$
-1/2, 1	$\sqrt{\frac{3}{10}}$	$- \sqrt{\frac{8}{15}}$	$\sqrt{\frac{1}{6}}$

$j 1 = 3 / 2, j 2 = 3 / 2$

m =3

j

m 1, m 2

	3
3/2, 3/2	$1$

m =2

j

m 1, m 2

	3	2
3/2, 1/2	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{2}}$
1/2, 3/2	$\sqrt{\frac{1}{2}}$	$- \sqrt{\frac{1}{2}}$

m =1

j

m 1, m 2

	3	2	1
3/2, -1/2	$\sqrt{\frac{1}{5}}$	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{3}{10}}$
1/2, 1/2	$\sqrt{\frac{3}{5}}$	$0$	$- \sqrt{\frac{2}{5}}$
-1/2, 3/2	$\sqrt{\frac{1}{5}}$	$- \sqrt{\frac{1}{2}}$	$\sqrt{\frac{3}{10}}$

m =0

j

m 1, m 2

	3	2	1	0
3/2, -3/2	$\sqrt{\frac{1}{20}}$	$\frac{1}{2}$	$\sqrt{\frac{9}{20}}$	$\frac{1}{2}$
1/2, -1/2	$\sqrt{\frac{9}{20}}$	$\frac{1}{2}$	$- \sqrt{\frac{1}{20}}$	$- \frac{1}{2}$
-1/2, 1/2	$\sqrt{\frac{9}{20}}$	$- \frac{1}{2}$	$- \sqrt{\frac{1}{20}}$	$\frac{1}{2}$
-3/2, 3/2	$\sqrt{\frac{1}{20}}$	$- \frac{1}{2}$	$\sqrt{\frac{9}{20}}$	$- \frac{1}{2}$

$j 1 =2, j 2 = 1 / 2$

m = 5 / 2

j

m 1, m 2

	5/2
2, 1/2	$1$

m = 3 / 2

j

m 1, m 2

	5/2	3/2
2, -1/2	$\sqrt{\frac{1}{5}}$	$\sqrt{\frac{4}{5}}$
1, 1/2	$\sqrt{\frac{4}{5}}$	$- \sqrt{\frac{1}{5}}$

m = 1 / 2

j

m 1, m 2

	5/2	3/2
1, -1/2	$\sqrt{\frac{2}{5}}$	$\sqrt{\frac{3}{5}}$
0, 1/2	$\sqrt{\frac{3}{5}}$	$- \sqrt{\frac{2}{5}}$

$j 1 =2, j 2 =1$

m =3

j

m 1, m 2

	3
2, 1	$1$

m =2

j

m 1, m 2

	3	2
2, 0	$\sqrt{\frac{1}{3}}$	$\sqrt{\frac{2}{3}}$
1, 1	$\sqrt{\frac{2}{3}}$	$- \sqrt{\frac{1}{3}}$

m =1

j

m 1, m 2

	3	2	1
2, -1	$\sqrt{\frac{1}{15}}$	$\sqrt{\frac{1}{3}}$	$\sqrt{\frac{3}{5}}$
1, 0	$\sqrt{\frac{8}{15}}$	$\sqrt{\frac{1}{6}}$	$- \sqrt{\frac{3}{10}}$
0, 1	$\sqrt{\frac{2}{5}}$	$- \sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{10}}$

m =0

j

m 1, m 2

	3	2	1
1, -1	$\sqrt{\frac{1}{5}}$	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{3}{10}}$
0, 0	$\sqrt{\frac{3}{5}}$	$0$	$- \sqrt{\frac{2}{5}}$
-1, 1	$\sqrt{\frac{1}{5}}$	$- \sqrt{\frac{1}{2}}$	$\sqrt{\frac{3}{10}}$

$j 1 =2, j 2 = 3 / 2$

m = 7 / 2

j

m 1, m 2

	7/2
2, 3/2	$1$

m = 5 / 2

j

m 1, m 2

	7/2	5/2
2, 1/2	$\sqrt{\frac{3}{7}}$	$\sqrt{\frac{4}{7}}$
1, 3/2	$\sqrt{\frac{4}{7}}$	$- \sqrt{\frac{3}{7}}$

m = 3 / 2

j

m 1, m 2

	7/2	5/2	3/2
2, -1/2	$\sqrt{\frac{1}{7}}$	$\sqrt{\frac{16}{35}}$	$\sqrt{\frac{2}{5}}$
1, 1/2	$\sqrt{\frac{4}{7}}$	$\sqrt{\frac{1}{35}}$	$- \sqrt{\frac{2}{5}}$
0, 3/2	$\sqrt{\frac{2}{7}}$	$- \sqrt{\frac{18}{35}}$	$\sqrt{\frac{1}{5}}$

m = 1 / 2

j

m 1, m 2

	7/2	5/2	3/2	1/2
2, -3/2	$\sqrt{\frac{1}{35}}$	$\sqrt{\frac{6}{35}}$	$\sqrt{\frac{2}{5}}$	$\sqrt{\frac{2}{5}}$
1, -1/2	$\sqrt{\frac{12}{35}}$	$\sqrt{\frac{5}{14}}$	$0$	$- \sqrt{\frac{3}{10}}$
0, 1/2	$\sqrt{\frac{18}{35}}$	$- \sqrt{\frac{3}{35}}$	$- \sqrt{\frac{1}{5}}$	$\sqrt{\frac{1}{5}}$
-1, 3/2	$\sqrt{\frac{4}{35}}$	$- \sqrt{\frac{27}{70}}$	$\sqrt{\frac{2}{5}}$	$- \sqrt{\frac{1}{10}}$

$j 1 =2, j 2 =2$

m =4

j

m 1, m 2

	4
2, 2	$1$

m =3

j

m 1, m 2

	4	3
2, 1	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{2}}$
1, 2	$\sqrt{\frac{1}{2}}$	$- \sqrt{\frac{1}{2}}$

m =2

j

m 1, m 2

	4	3	2
2, 0	$\sqrt{\frac{3}{14}}$	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{2}{7}}$
1, 1	$\sqrt{\frac{4}{7}}$	$0$	$- \sqrt{\frac{3}{7}}$
0, 2	$\sqrt{\frac{3}{14}}$	$- \sqrt{\frac{1}{2}}$	$\sqrt{\frac{2}{7}}$

m =1

j

m 1, m 2

	4	3	2	1
2, -1	$\sqrt{\frac{1}{14}}$	$\sqrt{\frac{3}{10}}$	$\sqrt{\frac{3}{7}}$	$\sqrt{\frac{1}{5}}$
1, 0	$\sqrt{\frac{3}{7}}$	$\sqrt{\frac{1}{5}}$	$- \sqrt{\frac{1}{14}}$	$- \sqrt{\frac{3}{10}}$
0, 1	$\sqrt{\frac{3}{7}}$	$- \sqrt{\frac{1}{5}}$	$- \sqrt{\frac{1}{14}}$	$\sqrt{\frac{3}{10}}$
-1, 2	$\sqrt{\frac{1}{14}}$	$- \sqrt{\frac{3}{10}}$	$\sqrt{\frac{3}{7}}$	$- \sqrt{\frac{1}{5}}$

m =0

j

m 1, m 2

	4	3	2	1	0
2, -2	$\sqrt{\frac{1}{70}}$	$\sqrt{\frac{1}{10}}$	$\sqrt{\frac{2}{7}}$	$\sqrt{\frac{2}{5}}$	$\sqrt{\frac{1}{5}}$
1, -1	$\sqrt{\frac{8}{35}}$	$\sqrt{\frac{2}{5}}$	$\sqrt{\frac{1}{14}}$	$- \sqrt{\frac{1}{10}}$	$- \sqrt{\frac{1}{5}}$
0, 0	$\sqrt{\frac{18}{35}}$	$0$	$- \sqrt{\frac{2}{7}}$	$0$	$\sqrt{\frac{1}{5}}$
-1, 1	$\sqrt{\frac{8}{35}}$	$- \sqrt{\frac{2}{5}}$	$\sqrt{\frac{1}{14}}$	$\sqrt{\frac{1}{10}}$	$- \sqrt{\frac{1}{5}}$
-2, 2	$\sqrt{\frac{1}{70}}$	$- \sqrt{\frac{1}{10}}$	$\sqrt{\frac{2}{7}}$	$- \sqrt{\frac{2}{5}}$	$\sqrt{\frac{1}{5}}$

$j 1 = 5 / 2, j 2 = 1 / 2$

m =3

j

m 1, m 2

	3
5/2, 1/2	$1$

m =2

j

m 1, m 2

	3	2
5/2, -1/2	$\sqrt{\frac{1}{6}}$	$\sqrt{\frac{5}{6}}$
3/2, 1/2	$\sqrt{\frac{5}{6}}$	$- \sqrt{\frac{1}{6}}$

m =1

j

m 1, m 2

	3	2
3/2, -1/2	$\sqrt{\frac{1}{3}}$	$\sqrt{\frac{2}{3}}$
1/2, 1/2	$\sqrt{\frac{2}{3}}$	$- \sqrt{\frac{1}{3}}$

m =0

j

m 1, m 2

	3	2
1/2, -1/2	$\sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{2}}$
-1/2, 1/2	$\sqrt{\frac{1}{2}}$	$- \sqrt{\frac{1}{2}}$

$j 1 = 5 / 2, j 2 =1$

m = 7 / 2

j

m 1, m 2

	7/2
5/2, 1	$1$

m = 5 / 2

j

m 1, m 2

	7/2	5/2
5/2, 0	$\sqrt{\frac{2}{7}}$	$\sqrt{\frac{5}{7}}$
3/2, 1	$\sqrt{\frac{5}{7}}$	$- \sqrt{\frac{2}{7}}$

m = 3 / 2

j

m 1, m 2

	7/2	5/2	3/2
5/2, -1	$\sqrt{\frac{1}{21}}$	$\sqrt{\frac{2}{7}}$	$\sqrt{\frac{2}{3}}$
3/2, 0	$\sqrt{\frac{10}{21}}$	$\sqrt{\frac{9}{35}}$	$- \sqrt{\frac{4}{15}}$
1/2, 1	$\sqrt{\frac{10}{21}}$	$- \sqrt{\frac{16}{35}}$	$\sqrt{\frac{1}{15}}$

m = 1 / 2

j

m 1, m 2

	7/2	5/2	3/2
3/2, -1	$\sqrt{\frac{1}{7}}$	$\sqrt{\frac{16}{35}}$	$\sqrt{\frac{2}{5}}$
1/2, 0	$\sqrt{\frac{4}{7}}$	$\sqrt{\frac{1}{35}}$	$- \sqrt{\frac{2}{5}}$
-1/2, 1	$\sqrt{\frac{2}{7}}$	$- \sqrt{\frac{18}{35}}$	$\sqrt{\frac{1}{5}}$

$j 1 = 5 / 2, j 2 = 3 / 2$

m =4

j

m 1, m 2

	4
5/2, 3/2	$1$

m =3

j

m 1, m 2

	4	3
5/2, 1/2	$\sqrt{\frac{3}{8}}$	$\sqrt{\frac{5}{8}}$
3/2, 3/2	$\sqrt{\frac{5}{8}}$	$- \sqrt{\frac{3}{8}}$

m =2

j

m 1, m 2

	4	3	2
5/2, -1/2	$\sqrt{\frac{3}{28}}$	$\sqrt{\frac{5}{12}}$	$\sqrt{\frac{10}{21}}$
3/2, 1/2	$\sqrt{\frac{15}{28}}$	$\sqrt{\frac{1}{12}}$	$- \sqrt{\frac{8}{21}}$
1/2, 3/2	$\sqrt{\frac{5}{14}}$	$- \sqrt{\frac{1}{2}}$	$\sqrt{\frac{1}{7}}$

m =1

j

m 1, m 2

	4	3	2	1
5/2, -3/2	$\sqrt{\frac{1}{56}}$	$\sqrt{\frac{1}{8}}$	$\sqrt{\frac{5}{14}}$	$\sqrt{\frac{1}{2}}$
3/2, -1/2	$\sqrt{\frac{15}{56}}$	$\sqrt{\frac{49}{120}}$	$\sqrt{\frac{1}{42}}$	$- \sqrt{\frac{3}{10}}$
1/2, 1/2	$\sqrt{\frac{15}{28}}$	$- \sqrt{\frac{1}{60}}$	$- \sqrt{\frac{25}{84}}$	$\sqrt{\frac{3}{20}}$
-1/2, 3/2	$\sqrt{\frac{5}{28}}$	$- \sqrt{\frac{9}{20}}$	$\sqrt{\frac{9}{28}}$	$- \sqrt{\frac{1}{20}}$

m =0

j

m 1, m 2

	4	3	2	1
3/2, -3/2	$\sqrt{\frac{1}{14}}$	$\sqrt{\frac{3}{10}}$	$\sqrt{\frac{3}{7}}$	$\sqrt{\frac{1}{5}}$
1/2, -1/2	$\sqrt{\frac{3}{7}}$	$\sqrt{\frac{1}{5}}$	$- \sqrt{\frac{1}{14}}$	$- \sqrt{\frac{3}{10}}$
-1/2, 1/2	$\sqrt{\frac{3}{7}}$	$- \sqrt{\frac{1}{5}}$	$- \sqrt{\frac{1}{14}}$	$\sqrt{\frac{3}{10}}$
-3/2, 3/2	$\sqrt{\frac{1}{14}}$	$- \sqrt{\frac{3}{10}}$	$\sqrt{\frac{3}{7}}$	$- \sqrt{\frac{1}{5}}$

$j 1 = 5 / 2, j 2 =2$

m = 9 / 2

j

m 1, m 2

	9/2
5/2, 2	$1$

m = 7 / 2

j

m 1, m 2

	9/2	7/2
5/2, 1	$\frac{2}{3}$	$\sqrt{\frac{5}{9}}$
3/2, 2	$\sqrt{\frac{5}{9}}$	$- \frac{2}{3}$

m = 5 / 2

j

m 1, m 2

	9/2	7/2	5/2
5/2, 0	$\sqrt{\frac{1}{6}}$	$\sqrt{\frac{10}{21}}$	$\sqrt{\frac{5}{14}}$
3/2, 1	$\sqrt{\frac{5}{9}}$	$\sqrt{\frac{1}{63}}$	$- \sqrt{\frac{3}{7}}$
1/2, 2	$\sqrt{\frac{5}{18}}$	$- \sqrt{\frac{32}{63}}$	$\sqrt{\frac{3}{14}}$

m = 3 / 2

j

m 1, m 2

	9/2	7/2	5/2	3/2
5/2, -1	$\sqrt{\frac{1}{21}}$	$\sqrt{\frac{5}{21}}$	$\sqrt{\frac{3}{7}}$	$\sqrt{\frac{2}{7}}$
3/2, 0	$\sqrt{\frac{5}{14}}$	$\sqrt{\frac{2}{7}}$	$- \sqrt{\frac{1}{70}}$	$- \sqrt{\frac{12}{35}}$
1/2, 1	$\sqrt{\frac{10}{21}}$	$- \sqrt{\frac{2}{21}}$	$- \sqrt{\frac{6}{35}}$	$\sqrt{\frac{9}{35}}$
-1/2, 2	$\sqrt{\frac{5}{42}}$	$- \sqrt{\frac{8}{21}}$	$\sqrt{\frac{27}{70}}$	$- \sqrt{\frac{4}{35}}$

m = 1 / 2

j

m 1, m 2

	9/2	7/2	5/2	3/2	1/2
5/2, -2	$\sqrt{\frac{1}{126}}$	$\sqrt{\frac{4}{63}}$	$\sqrt{\frac{3}{14}}$	$\sqrt{\frac{8}{21}}$	$\sqrt{\frac{1}{3}}$
3/2, -1	$\sqrt{\frac{10}{63}}$	$\sqrt{\frac{121}{315}}$	$\sqrt{\frac{6}{35}}$	$- \sqrt{\frac{2}{105}}$	$- \sqrt{\frac{4}{15}}$
1/2, 0	$\sqrt{\frac{10}{21}}$	$\sqrt{\frac{4}{105}}$	$- \sqrt{\frac{8}{35}}$	$- \sqrt{\frac{2}{35}}$	$\sqrt{\frac{1}{5}}$
-1/2, 1	$\sqrt{\frac{20}{63}}$	$- \sqrt{\frac{14}{45}}$	$0$	$\sqrt{\frac{5}{21}}$	$- \sqrt{\frac{2}{15}}$
-3/2, 2	$\sqrt{\frac{5}{126}}$	$- \sqrt{\frac{64}{315}}$	$\sqrt{\frac{27}{70}}$	$- \sqrt{\frac{32}{105}}$	$\sqrt{\frac{1}{15}}$

وصلات خارجية

Online, جاوة-based Clebsch-Gordan Coefficient Calculator by Paul Stevenson
Other formulae for Clebsch–Gordan coefficients.
Web interface for tabulating SU(N) Clebsch-Gordan coefficients

مصادر ومراجع

^ (2.41), p. 172, Quantum Mechanics: Foundations and Applications, Arno Bohm, M. Loewe, New York: Springer-Verlag, 3rd ed., 1993, ISBN 0-387-95330-2.
^ Weisbluth، Michael (1978). Atoms and molecules. ACADEMIC PRESS. ص. 28. ISBN:0-12-744450-5. Table 1.4 resumes the most common.

طالع أيضا

بوابة رياضيات

[1] (2.41), p. 172, Quantum Mechanics: Foundations and Applications, Arno Bohm, M. Loewe, New York: Springer-Verlag, 3rd ed., 1993, ISBN 0-387-95330-2.

[2] Weisbluth، Michael (1978). Atoms and molecules. ACADEMIC PRESS. ص. 28. ISBN:0-12-744450-5. Table 1.4 resumes the most common.

[1]

[2]

جدول معاملات كلبسش-غوردان

الصيغة

القائمة الكاملة [2]

j2=0

j1=1/2, j2=1/2

j1=1, j2=1/2

j1=1, j2=1

j1=3/2, j2=1/2

j1=3/2, j2=1

j1=3/2, j2=3/2

j1=2, j2=1/2

j1=2, j2=1

j1=2, j2=3/2

j1=2, j2=2

j1=5/2, j2=1/2

j1=5/2, j2=1

j1=5/2, j2=3/2

j1=5/2, j2=2