Stability of systolic inequalities for the M\"obius strip and Klein bottle

Abstract

The systolic area αsys of a nonsimply connected compact Riemannian surface (M,g) is defined as its area divided by the square of the systole, where the systole is equal to the length of a shortest noncontractible closed curve. The systolic inequality due to Bavard states that on the Klein bottle, the systolic area has the optimal lower bound 22π. Bavard also constructed metrics of minimal systolic area in any given conformal class. We give an alternative proof of these results, which also yields an estimate on the systolic defect αsys-22π in terms of the L2-distance of the conformal factor to the metric which minimizes the systolic area. On the M\"obius strip, we also prove similar estimates for metrics in fixed conformal classes.

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