Аннотация:
We review and elaborate on some aspects of classically scale-invariant
renormalizable 4-derivative scalar theory $L= \p \del^4 \p + g (\del \p)^4$ in
4 dimensions. Similar models appear, e.g., in the context of conformal
supergravity or in the description of crystalline phase of membranes.
Considering this theory in Minkowski signature we discuss how to define
consistent (Lorentz-invariant) scattering amplitudes by assuming that only
oscillating (non-growing) modes appear as external states. In the shiftsymmetric interacting theory the corresponding S-matrix is IR-soft despite
having $1/p^4$ internal propagators. We demonstrate how non-unitarity of
this theory manifests itself at the level of the one-loop scattering amplitude.