Laplacian coflow on the 7-dimensional Heisenberg group
Abstract
We study the Laplacian coflow and the modified Laplacian coflow of G2-structures on the 7-dimensional Heisenberg group. For the Laplacian coflow we show that the solution is always ancient, that is it is defined in some interval (-∞,T), with 0<T<+∞. However, for the modified Laplacian coflow, we prove that in some cases the solution is defined only on a finite interval while in other cases the solution is ancient or eternal, that is it is defined on (-∞, ∞).
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