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Main Authors: de Rham, Claudia, Tolley, Andrew J., Wang, Zhuo-Hui, Zhou, Shuang-Yong
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2506.22546
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author de Rham, Claudia
Tolley, Andrew J.
Wang, Zhuo-Hui
Zhou, Shuang-Yong
author_facet de Rham, Claudia
Tolley, Andrew J.
Wang, Zhuo-Hui
Zhou, Shuang-Yong
contents We propose a new method for constructing the consistent space of scattering amplitudes by parameterizing the imaginary parts of partial waves and utilizing dispersion relations, crossing symmetry, and full unitarity. Using this framework, we explicitly compute bounds on the leading couplings and examine the Regge behaviors of the constructed amplitudes. The method also readily accommodates spinning bound states, which we use to constrain glueball couplings. By incorporating dispersion relations, our approach inherently satisfies the Froissart-Martin/Jin-Martin bounds or softer high-energy behaviors by construction. This, in turn, allows us to formulate a new class of fractionally subtracted dispersion relations, through which we investigate the sensitivity of coupling bounds to the asymptotic growth rate.
format Preprint
id arxiv_https___arxiv_org_abs_2506_22546
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Primal S-matrix bootstrap with dispersion relations
de Rham, Claudia
Tolley, Andrew J.
Wang, Zhuo-Hui
Zhou, Shuang-Yong
High Energy Physics - Theory
We propose a new method for constructing the consistent space of scattering amplitudes by parameterizing the imaginary parts of partial waves and utilizing dispersion relations, crossing symmetry, and full unitarity. Using this framework, we explicitly compute bounds on the leading couplings and examine the Regge behaviors of the constructed amplitudes. The method also readily accommodates spinning bound states, which we use to constrain glueball couplings. By incorporating dispersion relations, our approach inherently satisfies the Froissart-Martin/Jin-Martin bounds or softer high-energy behaviors by construction. This, in turn, allows us to formulate a new class of fractionally subtracted dispersion relations, through which we investigate the sensitivity of coupling bounds to the asymptotic growth rate.
title Primal S-matrix bootstrap with dispersion relations
topic High Energy Physics - Theory
url https://arxiv.org/abs/2506.22546