Mirror symmetry aspects for compact G2 manifolds

Abstract

The present paper deals with mirror symmetry aspects of compact ``barely'' G2 manifolds, that is, G2 manifolds of the form (CY× S1)/Z2. We propose that the mirror of any barely G2 manifold is another barely one and which is constructed as a fibration of the mirror of the CY base. Also, we describe the Joyce manifolds of the first kind as ``barely'' and we show that the underlying CY of all the family is self-mirror with h1,1=h2,1=19. We thus propose that the mirror of a Joyce space of the first kind will be another Joyce space of the first kind.We also suggest that this self-mirror CY family is dual to K3× S1 in the heterotic/M-theory sense, and that arise as a particular case of the Borcea-Voisin construction. As a spin-off we conclude from this analysis that no 5-brane instantons are present in compactifications of eleven dimensional supergravity over Joyce manifolds of the first kind.