PCR-K\"ahler equivalent metrics in the Siegel domain

Abstract

Let H be the Heisenberg group. From the standard CR structure H of H we construct the complex hyperbolic structure of the Siegel domain. Additionally, using the same minimal data for H, that is, its Sasakian structure, we provide the Siegel domain with yet another K\"ahler structure: this structure is of unbounded negative sectional curvature, and its complex structure does not commute with the standard complex structure. However, we show that those two K\"ahler structures are PCR K\"ahler equivalent, that is to say, essentially the same when restricted to H.