We write general one-loop anomalies of string field theory as path integrals on a torus for the corresponding nonlinear sigma model. This extends the work of Alvarez-Gaumé and Witten from quantum mechanics to two dimensions. Higher world-volume loops contribute in general to nontopological anomalies and a formalism to compute these is developed. We claim that (i) for general anomalies one should not use the propagator widely used in string theory but rather the one obtained by generalization from quantum mechanics, but (ii) for chiral anomalies both propagators give the same result. As a check of this claim in a simpler model we compute trace anomalies in quantum mechanics. The propagator with a center-of-mass zero mode indeed does not give the correct result for the trace anomaly while the propagator for fluctuations $q^i (\tau)$ satisfying $q^i (\tau = -1) = q^i (\tau = 0) = 0$ yields in $d=2$ and $d=4$ dimensions the correct results from two- and three-loop graphs. We then return to heterotic string theory and calculate the contributions to the anomaly from the different spin structures for $d=2$. We obtain agreement with the work of Pilch, Schellekens and Warner and that of Li in the sector with spacetime fermions. In the other sectors, where no explicit computations have been performed in the past and for which one needs higher loops, we find a genuine divergence, whose interpretation is unclear to us. We discuss whether or not this leads to a new anomaly.
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机译:我们将字符串场理论的一般一环异常写为对应非线性sigma模型的圆环上的路径积分。这将Alvarez-Gaumé和Witten的工作从量子力学扩展到了二维。较高的世界体积环通常会导致非拓扑异常,因此开发了形式化的方法来计算这些异常。我们声称(i)对于一般异常,不应使用弦理论中广泛使用的传播子,而应使用从量子力学中通过泛化获得的传播子,而(ii)对于手征异常,两个传播子都可以得到相同的结果。作为在一个更简单模型中对此主张的检验,我们计算了量子力学中的迹线异常。当波动$ q ^ i(\ tau)$满足$ q ^ i(\ tau = -1)= q的传播子时,质心为零的传播子确实没有给出正确的迹线结果。 ^ i(\ tau = 0)= 0 $在$ d = 2 $和$ d = 4 $维度上生成的两环图和三环图的正确结果。然后,我们返回到杂散弦理论,并针对$ d = 2 $计算来自不同自旋结构的异常贡献。我们与Pilch,Schellekens和Warner以及Li在时空费米子领域的工作取得了一致。在过去没有进行过显式计算并且需要更高循环的其他领域中,我们发现了真正的分歧,我们对此尚不清楚。我们讨论这是否导致新的异常。
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