Momentum maps and the K\"ahler property for base spaces of reductive principal bundles
Abstract
We investigate the complex geometry of total spaces of reductive principal bundles over compact base spaces and establish a close relation between the K\"ahler property of the base, momentum maps for the action of a maximal compact subgroup on the total space, and the K\"ahler property of special equivariant compactifications. We provide many examples illustrating that the main result is optimal.
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