Stability and Related Properties of Vacua and Ground States
Abstract
We consider the formal non relativistc limit (nrl) of the :φ4:s+1 relativistic quantum field theory (rqft), where s is the space dimension. Following work of R. Jackiw, we show that, for s=2 and a given value of the ultraviolet cutoff , there are two ways to perform the nrl: i.) fixing the renormalized mass m2 equal to the bare mass m02; ii.) keeping the renormalized mass fixed and different from the bare mass m02. In the (infinite-volume) two-particle sector the scattering amplitude tends to zero as -> ∞ in case i.) and, in case ii.), there is a bound state, indicating that the interaction potential is attractive. As a consequence, stability of matter fails for our boson system. We discuss why both alternatives do not reproduce the low-energy behaviour of the full rqft. The singular nature of the nrl is also nicely illustrated for s=1 by a rigorous stability/instability result of a different nature.
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