Reduced Properties and Applications of Y(sl(2)) Algebra for a Two-Spin System
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Abstract
By taking a special constraint for a general realization of Y(sl(2)), two sets of sl(2) algebras are presented, in which a u(1) algebra is hidden. With the help of this constraint, the block-diagonal form can be written to the generator J of Yangian algebras, and especially it is a rotational transformation of a spin in the elementary quantum mechanics. This sheds new light on the physical meaning of Y(sl(2)).
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TIAN Li-Jun, YANG Guo-Hong, ZHANG Hong-Biao, HOU Jing-Min. Reduced Properties and Applications of Y(sl(2)) Algebra for a Two-Spin System[J]. Chin. Phys. Lett., 2006, 23(7): 1659-1661.
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TIAN Li-Jun, YANG Guo-Hong, ZHANG Hong-Biao, HOU Jing-Min. Reduced Properties and Applications of Y(sl(2)) Algebra for a Two-Spin System[J]. Chin. Phys. Lett., 2006, 23(7): 1659-1661.
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TIAN Li-Jun, YANG Guo-Hong, ZHANG Hong-Biao, HOU Jing-Min. Reduced Properties and Applications of Y(sl(2)) Algebra for a Two-Spin System[J]. Chin. Phys. Lett., 2006, 23(7): 1659-1661.
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TIAN Li-Jun, YANG Guo-Hong, ZHANG Hong-Biao, HOU Jing-Min. Reduced Properties and Applications of Y(sl(2)) Algebra for a Two-Spin System[J]. Chin. Phys. Lett., 2006, 23(7): 1659-1661.
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