Generalized S1-stability theorem
Abstract
We use the equivariant μ-bubbles technique to prove that for any compact manifold Mn with non-empty boundary, n∈\3,5,6\, the Yamabe invariant of Mn is positive if and only if the Yamabe invariant of Mn× S1 is positive. This generalized the S1-stability conjecture of Rosenberg to compact manifolds with boundary.
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