Discrete degree of symmetry of manifolds
Abstract
We define the discrete degree of symmetry disc-sym(X) of a closed n-manifold X as the biggest m≥ 0 such that X supports an effective action of ( Z/r)m for arbitrarily big values of r. We prove that if X is connected then disc-sym(X)≤ 3n/2. We propose the question of whether for every closed connected n-manifold X the inequality disc-sym(X)≤ n holds true, and whether the only closed connected n-manifold X for which disc-sym(X)=n is the torus Tn. We prove partial results providing evidence for an affirmative answer to this question.
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