Spectral Flow in Instanton Computations and the \boldmath{$\b$} functions
Abstract
We discuss various differences in the instanton-based calculations of the functions in theories such as Yang-Mills and on one hand, and theory with Symanzik's sign-reversed prescription for the coupling constant on the other hand. Although the aforementioned theories are asymptotically free, in the first two theories, instantons are topological, whereas the Fubini-Lipatov instanton in the third theory is topologically trivial. The spectral structure in the background of the Fubini-Lipatov instanton can be continuously deformed into that in the flat background, establishing a one-to-one correspondence between the two spectra. However, when considering topologically nontrivial backgrounds for Yang-Mills and theories, the spectrum undergoes restructuring. In these cases, a mismatch between the spectra around the instanton and the trivial vacuum occurs.
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Cite
@article{arxiv.2307.09119,
title = {Spectral Flow in Instanton Computations and the \boldmath{$\b$} functions},
author = {Alexander Monin and Mikhail Shifman and Arkady Vainshtein},
journal= {arXiv preprint arXiv:2307.09119},
year = {2023}
}
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22 pages