The bundle of the 2-forms over a 6-dimensional base manifold decomposes to three subbundles such that Lambda(2)(R-6) Lambda(2)(1) 619 Lambda(2)(6) circle plus Lambda(2)(8) with dimensions 1, 6 and 8, respectively. A duality notion for the 2-forms called Phi-duality is given by equation eta = lambda(*Phi) (eta boolean AND Phi) and an anti self dual SU(3) Yang-Mills theory is studied on the subbundle Lambda(2)(6). The curvature 2-form in such a theory is closed and its components are constants. The integral of the total action is bounded by the second Chern class of the bundle such that integral(M) L-m (F) >= -87 pi(2) integral(M) ch(2) boolean AND Phi This bound created a stability case for the total action integral. This stability case is satisfied by the coupling constant. Thus the total pseudo energy becomes proportional to that of Yang-Mills action integral, and at the same time to the Phi-topological charge. Also one sees that, when the base manifold is M = S-4 subset of R-6, this stability case serves the quantization condition like in the sense of Dirac. At the origin and infinity of the four dimensional sphere S-4, the connection becomes flat.

• 出版日期2017