The geometry of (3)-harmonic maps

Abstract

In this paper, we motivate and extend the study of harmonic maps or (1)-harmonic maps (cf [15], Remark 1.3 (iii)), -harmonic maps or (2)-harmonic maps (cf. [24], Remark 1.3 (v)), and explore geometric properties of (3)-harmonic maps by unified geometric analytic methods. We define the notion of (3)-harmonic maps and obtain the first variation formula and the second variation formula of the (3)-energy functional E_(3). By using a stress-energy tensor, the (3)-conservation law, a monotonicity formula, and the asymptotic assumption of maps at infinity, we prove Liouville type results for (3)-harmonic maps. We introduce the notion of (3)-Superstrongly Unstable ((3)-SSU) manifold and provide many interesting examples. By using an extrinsic average variational method in the calculus of variations (cf. [51, 49]), we find (3)-SSU manifold and prove that for i=1,2,3, every compact (i)-SSU manifold is (i)-SU, and hence is (i)-U (cf. Theorem 9.3). As consequences, we obtain topological vanishing theorems and sphere theorems by employing a (3)-harmoic map as a catalyst. This is in contrast to the approaches of utilizing a geodesic ([45]), minimal surface, stable rectifiable current ([34, 29, 50]), p-harmonic map (cf. [53]), etc., as catalysts. These mysterious phenomena are analogs of harmonic maps or (1)-harmonic maps, p-harmonic maps, S-harmonic maps, S,p-harmonic maps, (2)-harmonic maps, etc., (cf. [21, 40, 42, 41, 12, 13]).