I am working on Gromov-Hausdorff convergence spaces, on folds of a hyper-Kahllerian manifold of dimension n>3, My determination is to see that if the metric is "extensive" enough then the directions of a curvature are not necessarily negative ? I even think that the way to deal with HyperKahlerian metrics, may be if we extend a g-curve on Cu(n), this would be that K(g_{ij, k}):= n(1), where either an self-product of the Cu(n)-curves, it can predict the set of non-negative slopes of a possibly increasing Ricci-curvature.
I am working on Gromov-Hausdorff convergence spaces, on folds of a hyper-Kahllerian manifold of dimension n>3, My determination is to see that if the metric is "extensive" enough then the directions of a curvature are not necessarily negative ? I even think that the way to deal with HyperKahlerian metrics, may be if we extend a g-curve on Cu(n), this would be that K(g_{ij, k}):= n(1), where either an self-product of the Cu(n)-curves, it can predict the set of non-negative slopes of a possibly increasing Ricci-curvature.
Lectures about Hamilton mechanics
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Update , coronavirus and ocean Mathematics!
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(2/3+2/3):(2^3:3^2):(3/4+1/3) where all 1/12 are virtual . two cubed by three squared magnifying network between trillionth and trillion
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where's x?
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