A Twistor Space Action for Yang-Mills Theory

Abstract

We consider the twistor space P6 R4× CP1 of R4 with a non-integrable almost complex structure J such that the canonical bundle of the almost complex manifold ( P6, J) is trivial. It is shown that J-holomorphic Chern-Simons theory on a real (6|2)-dimensional graded extension P6|2 of the twistor space P6 is equivalent to self-dual Yang-Mills theory on Euclidean space R4 with Lorentz invariant action. It is also shown that adding a local term to a Chern-Simons-type action on P6|2, one can extend it to a twistor action describing full Yang-Mills theory.