On the Hodge-type decomposition and cohomolgy groups of k-Cauchy-Fueter complexes over domains in the quaternionic space

Abstract

The k-Cauchy-Fueter operator D0(k) on one dimensional quaternionic space H is the Euclidean version of helicity k 2 massless field operator on the Minkowski space in physics. The k-Cauchy-Fueter equation for k≥ 2 is overdetermined and its compatibility condition is given by the k-Cauchy-Fueter complex. In quaternionic analysis, these complexes play the role of Dolbeault complex in several complex variables. We prove that a natural boundary value problem associated to this complex is regular. Then by using the theory of regular boundary value problems, we show the Hodge-type orthogonal decomposition, and the fact that the non-homogeneous k-Cauchy-Fueter equation D0(k) u=f on a smooth domain in H is solvable if and only if f satisfies the compatibility condition and is orthogonal to the set H1 (k) () of Hodge-type elements. This set is isomorphic to the first cohomology group of the k-Cauchy-Fueter complex over , which is finite dimensional, while the second cohomology group is always trivial.