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@ARTICLE{Manohar:602590,
author = {Manohar, Aneesh V. and Pagès, Julie and Roosmale Nepveu,
Jasper},
title = {{F}ield {R}edefinitions and {I}nfinite {F}ield {A}nomalous
{D}imensions},
reportid = {PUBDB-2024-00666, DESY-24-020. arXiv:2402.08715},
year = {2024},
note = {10+6 pages, 2 figures},
abstract = {Field redefinitions are commonly used to reduce the number
of operators in the Lagrangian by removing redundant
operators and transforming to a minimal operator basis. We
give a general argument that such field redefinitions, while
leaving the $S$-matrix invariant and consequently finite,
lead not only to infinite Green's functions, but also to
infinite field anomalous dimensions $\gamma_\phi$. These
divergences cannot be removed by counterterms without
reintroducing redundant operators.},
keywords = {anomalous dimension (INSPIRE) / Green function (INSPIRE) /
S-matrix (INSPIRE) / effective field theory (INSPIRE)},
cin = {T},
cid = {I:(DE-H253)T-20120731},
pnm = {611 - Fundamental Particles and Forces (POF4-611) / GRK
2575 - GRK 2575: Überdenken der Quantenfeldtheorie
(417533893) / ASYMMETRY - Essential Asymmetries of Nature
(101086085)},
pid = {G:(DE-HGF)POF4-611 / G:(GEPRIS)417533893 /
G:(EU-Grant)101086085},
experiment = {EXP:(DE-MLZ)NOSPEC-20140101},
typ = {PUB:(DE-HGF)25},
eprint = {2402.08715},
howpublished = {arXiv:2402.08715},
archivePrefix = {arXiv},
SLACcitation = {$\%\%CITATION$ = $arXiv:2402.08715;\%\%$},
doi = {10.3204/PUBDB-2024-00666},
url = {https://bib-pubdb1.desy.de/record/602590},
}
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