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Main Authors: Bochicchio, Marco, Pallante, Elisabetta
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2402.16490
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author Bochicchio, Marco
Pallante, Elisabetta
author_facet Bochicchio, Marco
Pallante, Elisabetta
contents We revisit a low-energy theorem (LET) of NSVZ type in SU($N$) QCD with $N_f$ massless quarks derived in [1] by implementing it in dimensional regularization. The LET relates $n$-point correlators in the lhs to $n+1$-point correlators with the extra insertion of Tr$F^2$ at zero momentum in the rhs. First, we demonstrate that, for $2$-point correlators of an operator $O$ in the lhs, the LET implies that, in general, the integrated $3$-point correlator in the rhs needs in perturbation theory an infinite additive renormalization in addition to the multiplicative one. Second, we relate the above counterterm -- that is completely fixed by the LET -- to a corresponding divergent contact term in a certain coefficient of the OPE of Tr$F^2$ with $O$ in the momentum representation, thus extending by means of the LET to any operator $O$ an independent argument that first appeared for $O$=Tr$F^2$ in [2]. Third, we verify by direct computation that the latter divergent contact term first computed in [3] to order $g^4$ in perturbation theory and to all orders in [2] actually agrees with the one implied by the LET. Fourth, we evaluate the divergent contact terms for the above OPE coefficient both in the coordinate and momentum representation and discuss their relation. Fifth, we demonstrate that in the asymptotically free phase of QCD the aforementioned counterterm in the LET -- though divergent order by order in perturbation theory -- is actually finite nonperturbatively after resummation to all perturbative orders. Finally, we briefly recall the implications of the LET in the gauge-invariant framework of dimensional regularization for the perturbative and nonperturbative renormalization in large-$N$ QCD. The implications of the LET inside and above the conformal window of SU($N$) QCD with $N_f$ massless quarks will appear in a forthcoming paper.
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publishDate 2024
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spellingShingle Low-energy theorem revisited and OPE in massless QCD
Bochicchio, Marco
Pallante, Elisabetta
High Energy Physics - Theory
High Energy Physics - Phenomenology
We revisit a low-energy theorem (LET) of NSVZ type in SU($N$) QCD with $N_f$ massless quarks derived in [1] by implementing it in dimensional regularization. The LET relates $n$-point correlators in the lhs to $n+1$-point correlators with the extra insertion of Tr$F^2$ at zero momentum in the rhs. First, we demonstrate that, for $2$-point correlators of an operator $O$ in the lhs, the LET implies that, in general, the integrated $3$-point correlator in the rhs needs in perturbation theory an infinite additive renormalization in addition to the multiplicative one. Second, we relate the above counterterm -- that is completely fixed by the LET -- to a corresponding divergent contact term in a certain coefficient of the OPE of Tr$F^2$ with $O$ in the momentum representation, thus extending by means of the LET to any operator $O$ an independent argument that first appeared for $O$=Tr$F^2$ in [2]. Third, we verify by direct computation that the latter divergent contact term first computed in [3] to order $g^4$ in perturbation theory and to all orders in [2] actually agrees with the one implied by the LET. Fourth, we evaluate the divergent contact terms for the above OPE coefficient both in the coordinate and momentum representation and discuss their relation. Fifth, we demonstrate that in the asymptotically free phase of QCD the aforementioned counterterm in the LET -- though divergent order by order in perturbation theory -- is actually finite nonperturbatively after resummation to all perturbative orders. Finally, we briefly recall the implications of the LET in the gauge-invariant framework of dimensional regularization for the perturbative and nonperturbative renormalization in large-$N$ QCD. The implications of the LET inside and above the conformal window of SU($N$) QCD with $N_f$ massless quarks will appear in a forthcoming paper.
title Low-energy theorem revisited and OPE in massless QCD
topic High Energy Physics - Theory
High Energy Physics - Phenomenology
url https://arxiv.org/abs/2402.16490