On the center of the group of quasi-isometries of the real line
Abstract
Let QI(R) denote the group of all quasi-isometries f:R R. Let Q+( and~ Q-) denote the subgroup of QI(R) consisting of elements which are identity near -∞ (resp. +∞). We denote by QI+( R) the index 2 subgroup of QI( R) that fixes the ends +∞, -∞. We show that QI+( R) Q+× Q-. Using this we show that the center of the group QI(R) is trivial.
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