Topological properties of closed G2, SL(3;C) and SL(3;R)2 forms on manifolds

Abstract

This paper uses algebro-topological techniques such as characteristic classes and obstruction theory, together with the h-principles for G2 and SL(3;R)2 forms recently established by the author and the h-principle for SL(3;C) forms established by Donaldson, to prove results on the topological properties of closed G2, SL(3;C) and SL(3;R)2 forms on oriented 6- and 7-manifolds. Specifically, a criterion for an arbitrary oriented 7-manifold to admit a closed (resp. coclosed) G2-structure is obtained, proving a conjecture of L\e; a generalisation of Donaldson's 'G2-cobordisms' to G2, SL(3;C) and SL(3;R)2 forms is introduced, with homotopic SL(3;C) and SL(3;R)2 forms in a given cohomology class shown to be G2-cobordant, a result which currently has no analogue in the G2 case; and a complete classification of closed SL(3;C) forms up to homotopy is provided. Additionally, a lower bound on the number of homotopy classes of closed SL(3;R)2 forms on a given manifold is obtained, and the question of which closed SL(3;C) or SL(3;R)2 forms arise as the boundary values of closed G2-structures on oriented 7-manifolds is investigated.