Growth Estimates for Generalized Harmonic Forms on Noncompact Manifolds with Geometric Applications

Abstract

We introduce Condition W \,(1.2) for a smooth differential form ω on a complete noncompact Riemannian manifold M. We prove that ω is a harmonic form on M if and only if ω is both closed and co-closed on M\, , where ω has 2-balanced growth either for q=2, or for 1 < q( 2) < 3\, with ω satisfying Condition W \,(1.2). In particular, every L2 harmonic form, or every Lq harmonic form, 1<q( 2)<3\, satisfying Condition W \,(1.2) is both closed and co-closed (cf. Theorem 1.1). This generalizes the work of A. Andreotti and E. Vesentini [AV] for every L2 harmonic form ω\, . In extending ω in L2 to Lq, for q 2, Condition W \,(1.2) has to be imposed due to counter-examples of D. Alexandru-Rugina( [AR] p. 81, Remarque 3). We then study nonlinear partial differential inequalities for differential forms ω, ω 0, in which solutions ω can be viewed as generalized harmonic forms. We prove that under the same growth assumption on ω\, (as in Theorem 1.1, or 1.2, or 1.3), the following six statements: (i) ω, ω 0\, , (ii) ω = 0\, , (iii) d\, ω = dω = 0\, , (iv) \, ω, \, ω 0\, , (v) \, ω = 0\, , and (vi) d\, \, ω = d \, ω = 0\, are equivalent (cf. Theorem 4.1). We also study As geometric applications, we employ the theory in [DW] and [W3], solve constant Dirichlet problems for generalized harmonic 1-forms and F-harmomic maps (cf. Theorems 10.3 and 10.2), derive monotonicity formulas for 2-balanced solutions, and vanishing theorems for 2-moderate solutions of ω, ω 0\, on M (cf. Theorem 8.2 and Theorem 9.3).