An alternative spontaneous symmetry breaking pattern for U(1) with no gapless Goldstone mode
Abstract
An emergent gapless Goldstone mode originates from continuous spontaneous symmetry breaking, which has become a doctrine since the pioneering work by Goldstone [J. Goldstone, Nuovo Cimento 19, 154 (1961)]. However, we argue that it is possible for a continuous symmetry group U(1) to make an exceptional case, simply due to the well-known mathematical result that a continuous symmetry group U(1) may be regarded as a limit of a discrete symmetry group Zq when q tends to infinity. As a consequence, spontaneous symmetry breaking for such a continuous symmetry group U(1) does not necessarily lead to any gapless Goldstone mode. This is explicitly explained for an anisotropic extension of the ferromagnetic spin-1 biquadratic model. In a sense, this model provides an illustrative example regarding the dichotomy between continuity and discreteness.
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