Lfp harmonic 1-forms on complete non-compact smooth metric measure spaces

Abstract

This paper studies complete non-compact smooth metric measure space (Mn,g,e-fdv) with positive first spectrum λ1(f) or satisfying a weighted Poincar\'e inequality with weight function . We establish two splitting and vanishing theorems for Lfp harmonic 1-forms under the assumption that m-Bakry-\'Emery Ricci curvature Ricm,n≥ -aλ1(f) or Ricm,n≥ -a-b for particular constants a and b>0. These results are inspired by the work of Han-Lin and are Lfp generalizations of previous works by Dung-Sung and Vieira for L2 harmonic 1-forms.