Anexo:Tabla de coeficientes de Clebsch-Gordan

Para ver su formulación y definición formal vea coeficientes Clebsch—Gordan.

Esta es una tabla de coeficientes de Clebsch-Gordan usada para sumar momentos angulares en mecánica cuántica. El signo global de los coeficientes para cada conjunto de $j_{1}$ , $j_{2}$ y $j$ constantes es en cierto grado arbitrario y ha sido fijado de acuerdo con la convención de Condon-Shortley y Wigner como viene dada en Baird and Biedenharn .^[1] Tablas con la misma convención de signos pueden ser encontradas en Review of Particle Properties ^[2] del Particle Data Group y en tablas en línea.^[3]

Formulación[editar]

Los estados de momento angular total pueden ser expandidos usando la relación de completitud en las bases de momentos angulares parciales como

|(j_{1}j_{2})JM\rangle =\sum _{m_{1}=-j_{1}}^{j_{1}}\sum _{m_{2}=-j_{2}}^{j_{2}}|j_{1}m_{1}j_{2}m_{2}\rangle \langle j_{1}m_{1}j_{2}m_{2}|JM\rangle =\sum _{m_{1}=-j_{1}}^{j_{1}}\sum _{m_{2}=-j_{2}}^{j_{2}}|j_{1}m_{1}\rangle |j_{2}m_{2}\rangle \langle j_{1}m_{1}j_{2}m_{2}|JM\rangle

Los coeficientes $\langle j_{1}m_{1}j_{2}m_{2}|JM\rangle$ de la expansión son los coeficientes de Clebsch–Gordan. Estos se pueden escribir explícitamente como

\langle j_{1}m_{1}j_{2}m_{2}|jm\rangle =\delta _{m,m_{1}+m_{2}}{\sqrt {\frac {(2j+1)(j+j_{1}-j_{2})!(j-j_{1}+j_{2})!(j_{1}+j_{2}-j)!}{(j_{1}+j_{2}+j+1)!}}}\ \times

${\sqrt {(j+m)!(j-m)!(j_{1}-m_{1})!(j_{1}+m_{1})!(j_{2}-m_{2})!(j_{2}+m_{2})!}}\ \times$

$\sum _{k}{\frac {(-1)^{k}}{k!(j_{1}+j_{2}-j-k)!(j_{1}-m_{1}-k)!(j_{2}+m_{2}-k)!(j-j_{2}+m_{1}+k)!(j-j_{1}-m_{2}+k)!}}.$

Donde la suma se hace sobre todos los k enteros para los para los que los argumentos de todos los factoriales involucrados sean no negativos.^[4] Por brevedad, las soluciones con $m<0$ son omitidas, pero pueden ser calculadas usando la siguiente relación

\langle j_{1},m_{1},j_{2},m_{2}|j,m\rangle =(-1)^{j-j_{1}-j_{2}}\langle j_{1},-m_{1},j_{2},-m_{2}|j,-m\rangle

.

j₁=1/2, j₂=1/2[editar]

m=1

j=

m₁, m₂=

	1
1/2, 1/2	$1\!\,$

m=0

j=

m₁, m₂=

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

j₁=1, j₂=1/2[editar]

m=3/2

j=

m₁, m₂=

	3/2
1, 1/2	$1\!\,$

m=1/2

j=

m₁, m₂=

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

j₁=1, j₂=1[editar]

m=2

j=

m₁, m₂=

	2
1, 1	$1\!\,$

m=1

j=

m₁, m₂=

	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=

m₁, m₂=

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

j₁=3/2, j₂=1/2[editar]

m=2

j=

m₁, m₂=

	2
3/2, 1/2	$1\!\,$

m=1

j=

m₁, m₂=

	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=

m₁, m₂=

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

j₁=3/2, j₂=1[editar]

m=5/2

j=

m₁, m₂=

	5/2
3/2, 1	$1\!\,$

m=3/2

j=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {3}{10}}}\!\,$	$-{\sqrt {\frac {8}{15}}}\!\,$	${\sqrt {\frac {1}{6}}}\!\,$

j₁=3/2, j₂=3/2[editar]

m=3

j=

m₁, m₂=

	3
3/2, 3/2	$1\!\,$

m=2

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {1}{20}}}\!\,$	$-{\frac {1}{2}}\!\,$	${\sqrt {\frac {9}{20}}}\!\,$	$-{\frac {1}{2}}\!\,$

j₁=2, j₂=1/2[editar]

m=5/2

j=

m₁, m₂=

	5/2
2, 1/2	$1\!\,$

m=3/2

j=

m₁, m₂=

	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=

m₁, m₂=

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

j₁=2, j₂=1[editar]

m=3

j=

m₁, m₂=

	3
2, 1	$1\!\,$

m=2

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

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

j₁=2, j₂=3/2[editar]

m=7/2

j=

m₁, m₂=

	7/2
2, 3/2	$1\!\,$

m=5/2

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {4}{35}}}\!\,$	$-{\sqrt {\frac {27}{70}}}\!\,$	${\sqrt {\frac {2}{5}}}\!\,$	$-{\sqrt {\frac {1}{10}}}\!\,$

j₁=2, j₂=2[editar]

m=4

j=

m₁, m₂=

	4
2, 2	$1\!\,$

m=3

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {1}{70}}}\!\,$	$-{\sqrt {\frac {1}{10}}}\!\,$	${\sqrt {\frac {2}{7}}}\!\,$	$-{\sqrt {\frac {2}{5}}}\!\,$	${\sqrt {\frac {1}{5}}}\!\,$

j₁=5/2, j₂=1/2[editar]

m=3

j=

m₁, m₂=

	3
5/2, 1/2	$1\!\,$

m=2

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

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

j₁=5/2, j₂=1[editar]

m=7/2

j=

m₁, m₂=

	7/2
5/2, 1	$1\!\,$

m=5/2

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {2}{7}}}\!\,$	$-{\sqrt {\frac {18}{35}}}\!\,$	${\sqrt {\frac {1}{5}}}\!\,$

j₁=5/2, j₂=3/2[editar]

m=4

j=

m₁, m₂=

	4
5/2, 3/2	$1\!\,$

m=3

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {1}{14}}}\!\,$	$-{\sqrt {\frac {3}{10}}}\!\,$	${\sqrt {\frac {3}{7}}}\!\,$	$-{\sqrt {\frac {1}{5}}}\!\,$

j₁=5/2, j₂=2[editar]

m=9/2

j=

m₁, m₂=

	9/2
5/2, 2	$1\!\,$

m=7/2

j=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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=

m₁, m₂=

	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	${\sqrt {\frac {5}{126}}}\!\,$	$-{\sqrt {\frac {64}{315}}}\!\,$	${\sqrt {\frac {27}{70}}}\!\,$	$-{\sqrt {\frac {32}{105}}}\!\,$	${\sqrt {\frac {1}{15}}}\!\,$

Referencias[editar]

↑ Baird, C.E.; L. C. Biedenharn (octubre de 1964). «On the Representations of the Semisimple Lie Groups. III. The Explicit Conjugation Operation for SU_n». J. Math. Phys. 5: 1723-1730. doi:10.1063/1.1704095. Consultado el 20 de diciembre de 2007.
↑ Hagiwara, K.; et al. (julio de 2002). «Review of Particle Properties» (PDF). Phys. Rev. D 66: 010001. doi:10.1103/PhysRevD.66.010001. Consultado el 20 de diciembre de 2007.
↑ Mathar, Richard J. (14 de agosto de 2006). «SO(3) Clebsch Gordan coefficients» (txt). Consultado el 20 de diciembre de 2007.
↑ (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.

Enlaces externos[editar]

Calculadora de coeficientes de Clebsch-Gordan online basada en Java, de Paul Stevenson.
Otras fórmulas de coeficientes de Clebsch-Gordan.

[1] Baird, C.E.; L. C. Biedenharn (octubre de 1964). «On the Representations of the Semisimple Lie Groups. III. The Explicit Conjugation Operation for SU_n». J. Math. Phys. 5: 1723-1730. doi:10.1063/1.1704095. Consultado el 20 de diciembre de 2007.

[2] Hagiwara, K.; et al. (julio de 2002). «Review of Particle Properties» (PDF). Phys. Rev. D 66: 010001. doi:10.1103/PhysRevD.66.010001. Consultado el 20 de diciembre de 2007.

[3] Mathar, Richard J. (14 de agosto de 2006). «SO(3) Clebsch Gordan coefficients» (txt). Consultado el 20 de diciembre de 2007.

[4] (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.

[1]

[2]

[3]

[4]

Formulación[editar]

j1=1/2, j2=1/2[editar]

j1=1, j2=1/2[editar]

j1=1, j2=1[editar]

j1=3/2, j2=1/2[editar]

j1=3/2, j2=1[editar]

j1=3/2, j2=3/2[editar]

j1=2, j2=1/2[editar]

j1=2, j2=1[editar]

j1=2, j2=3/2[editar]

j1=2, j2=2[editar]

j1=5/2, j2=1/2[editar]

j1=5/2, j2=1[editar]

j1=5/2, j2=3/2[editar]

j1=5/2, j2=2[editar]

Referencias[editar]

Enlaces externos[editar]

j₁=1/2, j₂=1/2[editar]

j₁=1, j₂=1/2[editar]

j₁=1, j₂=1[editar]

j₁=3/2, j₂=1/2[editar]

j₁=3/2, j₂=1[editar]

j₁=3/2, j₂=3/2[editar]

j₁=2, j₂=1/2[editar]

j₁=2, j₂=1[editar]

j₁=2, j₂=3/2[editar]

j₁=2, j₂=2[editar]

j₁=5/2, j₂=1/2[editar]

j₁=5/2, j₂=1[editar]

j₁=5/2, j₂=3/2[editar]

j₁=5/2, j₂=2[editar]