The renormalized φ44-trajectory by perturbation theory in a running coupling II: the continuous renormalization group

Abstract

The renormalized trajectory of massless φ4-theory on four dimensional Euclidean space-time is investigated as a renormalization group invariant curve in the center manifold of the trivial fixed point, tangent to the φ4-interaction. We use an exact functional differential equation for its dependence on the running φ4-coupling. It is solved by means of perturbation theory. The expansion is proved to be finite to all orders. The proof includes a large momentum bound on amputated connected momentum space Green's functions.

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