Abstract:
Finite energy particle-like solutions of conformally invariant theories in flat
space are ruled out by Coleman, Deser and Pagels arguments, so there are no
purely Yang-Mills solitons for usual YM action in flat space. Meanwhile, such
solitons do exist, if the YM fields are governed by the non-Abelian Born-Infeld
effective action arising in string theory. These are similar to Bartnik McKinnon
particle-like solutions in Einstein-Yang-Mills theory. Both theories break
conformal symmetry of the classical action thus avoiding the above no-go
result. Topologically they are similar to sphalerons of the electroweak theory,
where breaking of conformal symmetry is due to the Higgs field. We review
these and others solutions including Einstein-Yang-Mills vortices, and discuss
some other effects of breaking of conformal symmetry on classical YM fields:
stabilization of chaos and cosmological inflation.