Low-energy theorem for γ 3π: surface terms against π a1-mixing

Abstract

We reconsider the contribution due to π a1-mixing to the anomalous γπ+π0π- amplitude from the standpoint of the low-energy theorem Fπ=e fπ2 F3π, which relates the electromagnetic form factor Fπ0γγ=Fπ with the form factor Fγπ+π0π-=F3π both taken at vanishing momenta of mesons. Our approach is based on a recently proposed covariant diagonalization of π a1-mixing within a standard effective QCD-inspired meson Lagrangian obtained in the framework of the Nambu-Jona-Lasinio model. We show that the two surface terms appearing in the calculation of the anomalous triangle quark diagrams or AVV- and AAA-type amplitudes are uniquely fixed by this theorem. As a result, both form factors Fπ and F3π are not affected by the π a1-mixing, but the concept of vector meson dominance (VMD) fails for γπ+π0π-.