Gauge-covariant diagonalization of π-a1 mixing and the resolution of a low energy theorem

Abstract

Using a recently proposed gauge covariant diagonalization of π a1-mixing we show that the low energy theorem Fπ=e fπ2 F3π of current algebra, relating the anomalous form factor Fγ π+π0π- = F3π and the anomalous neutral pion form factor Fπ0 γγ=Fπ, is fulfilled in the framework of the Nambu-Jona-Lasinio (NJL) model, solving a long standing problem encountered in the extension including vector and axial-vector mesons. At the heart of the solution is the presence of a γ π q q vertex which is absent in the conventional treatment of diagonalization and leads to a deviation from the vector meson dominance (VMD) picture. It contributes to a gauge invariant anomalous tri-axial (AAA) vertex as a pure surface term.