Abstract
AbstractWe prove that if a sequence of geodesically complete CAT(0)-spaces $$X_j$$ X j with uniformly cocompact discrete groups of isometries converges in the Gromov-Hausdorff sense to $$X_\infty $$ X ∞ , then the dimension of the maximal Euclidean factor splitted off by $$X_\infty $$ X ∞ and $$X_j$$ X j is the same, for j big enough. In other words, no additional Euclidean factors can appear in the limit.
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