论超几何振幅的单一性

arXiv - PHYS - High Energy Physics - Theory Pub Date : 2024-09-14 DOI:arxiv-2409.09561

Gareth Mansfield, Marcus Spradlin

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引用次数: 0

摘要

超几何振幅是玻色弦理论中四点超速粒子散射的威尼斯振幅的单参数变形，它与$S$矩阵引导约束相一致。在本文中，我们为超弦类型理论构建了一个类似的委内瑞拉振幅超几何广义。然后，我们排除了$(r,m^2,D)$参数空间的一大块非单元性区域，并建立了$(r,m^2, D)$参数空间的另一大子集，其中所有偏波系数都是正的。我们还分析了各种极限和特例中的正相关性。作为我们分析的一个推论，我们能够直接证明比其他地方提出的更广泛的委内瑞拉振幅偏波系数集的正向性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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On Unitarity of the Hypergeometric Amplitude

The hypergeometric amplitude is a one-parameter deformation of the Veneziano amplitude for four-point tachyon scattering in bosonic string theory that is consistent with $S$-matrix bootstrap constraints. In this article we construct a similar hypergeometric generalization of the Veneziano amplitude for type-I superstring theory. We then rule out a large region of the $(r,m^2,D)$ parameter space as non-unitary, and establish another large subset of the $(r, m^2, D)$ parameter space where all partial wave coefficients are positive. We also analyze positivity in various limits and special cases. As a corollary to our analysis, we are able to directly demonstrate positivity of a wider set of Veneziano amplitude partial wave coefficients than what has been presented elsewhere.

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arXiv - PHYS - High Energy Physics - Theory

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