The Yamabe problem for almost Hermitian manifolds
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...We mention also the work [17] where a similar problem for the J-scalar curvature is studied, which is derived from the Riemannian curvature....
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"The Yamabe problem for almost Hermi..." refers background or methods in this paper
...Of course, our selection is made to simplify the conformal analysis of s J and not that of s, as the above mentioned authors do. We take advantage of the following result, an inhomogeneous version of a theorem of R. Graham (see [ 8 ]) that turns out to be essential in our proof....
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...We do this by working in a special set of normal coordinates, in the same way as these coordinates were used by Lee and Parker [ 8 ]....
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...We feel this illustrates the essence of the conformal analysis nearby a point carried out by Lee and Parker [ 8 ] (and based on work of R. Graham), and broadens the applicability of that type of idea....
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...The error term/~ (e, u) in (6.4) may be estimated by the same arguments in [ 8 ] (see p. 50- 5 !). In fact, we easily conclude that the first two integrals in the right side of (6.4) are of the order O (a2m-2), negligible in comparison with S(e, oe)....
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...By (5.4), the first integral on the right side above can be estimated in terms of A, e and ot (see [ 8 ], p. 50, for details)....
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