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引用次数: 0
摘要
对无穷实谱三重的狄拉克算子计算了费米子函数积分。对每个 KO 维度的复积分、实积分和手性功能积分进行了非三维考虑,并指出了定义中的相位差。
Fermion functional integrals are calculated for the Dirac operator of a
finite real spectral triple. Complex, real and chiral functional integrals are
considered for each KO-dimension where they are non-trivial, and phase
ambiguities in the definition are noted.
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