Horofunctions and metric compactification of noncompact Hermitian symmetric spaces

Abstract

Given a Hermitian symmetric space M of noncompact type, we give a complete description of the horofunctions in the metric compactification of M with respect to the Carath\'eodory distance, via the realisation of M as the open unit ball D of a Banach space (V,\|·\|) equipped with a Jordan structure, called a JB*-triple. The Carath\'eodory distance on D has a Finsler structure. It is the integrated distance of the Carath\'eodory differential metric, and the norm \|·\| in the realisation is the Carath\'eodory norm with respect to the origin 0∈ D. We also identify the horofunctions of the metric compactification of (V,\|·\|) and relate its geometry and global topology to the closed dual unit ball (i.e., the polar of D). Moreover, we show that the exponential map 0 V D at 0∈ D extends to a homeomorphism between the metric compactifications of (V,\|·\|) and (D,), preserving the geometric structure. Consequently, the metric compactification of M admits a concrete realisation as the closed dual unit ball of (V,\|·\|).