A geometric flow in the space of \(G^2\)-structures on the cone over \(S^3\times S^3\)
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Publication:259840
DOI10.1134/S0037446615060130zbMath1343.53063MaRDI QIDQ259840
Publication date: 18 March 2016
Published in: Siberian Mathematical Journal (Search for Journal in Brave)
Cites Work
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- Complete Riemannian metrics with holonomy group \(G_2\) on deformations of cones over \(S^3\times S^3\)
- Riemannian manifolds with structure group \(G_ 2\)
- Einstein metrics on \(S^ 3\), \(R^ 3\) and \(R^ 4\) bundles
- On the construction of some complete metrics with exceptional holonomy
- Compact Riemannian 7-manifolds with holonomy \(G_ 2\). I
- Short-time behaviour of a modified Laplacian coflow of \(G_2\)-structures
- FLOWS OF G2-STRUCTURES, I
- Calabi's conjecture and some new results in algebraic geometry
- Twisted connected sums and special Riemannian holonomy
- Gauge theory at large \(N\) and new \(G_2\) holonomy metrics
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