On splitting rank of non-compact type symmetric spaces and bounded cohomology

Abstract

Let X=G/K be a higher rank symmetric space of non-compact type, where G is the connected component of the isometry group of X. We define the splitting rank of X, denoted by srk(X), to be the maximal dimension of a totally geodesic submanifold Y⊂ X which splits off an isometric R-factor. We compute explicitly the splitting rank for each irreducible symmetric space. For an arbitrary (not necessarily irreducible) symmetric space, we show that the comparison map η:H*c,b(G,R)→ H*c(G,R) is surjective in degrees *≥ srk(X)+2, provided X has no small direct factors.