Quarter-pinched Einstein metrics interpolating between real and complex hyperbolic metrics

Abstract

We show that the one-loop quantum deformation of the universal hypermultiplet provides a family of complete 1/4-pinched negatively curved quaternionic K\"ahler (i.e. half conformally flat Einstein) metrics gc, c 0, on R4. The metric g0 is the complex hyperbolic metric whereas the family (gc)c>0 is equivalent to a family of metrics (hb)b>0 depending on b=1/c and smoothly extending to b=0 for which h0 is the real hyperbolic metric. In this sense the one-loop deformation interpolates between the real and the complex hyperbolic metrics. We also determine the (singular) conformal structure at infinity for the above families.