Denseness of robust exponential mixing for singular-hyperbolic attracting sets
Abstract
There exists a C2-open and C1-dense subset of vector fields exhibiting singular-hyperbolic attracting sets (with codimension-two stable bundle), in any d-dimensional compact manifold (d3), which mix exponentiallu with respect to any physical/SRB invariant probability measure. More precisely, we show that given any connected singular-hyperbolic attracting set for a C2-vector field X, there exists a C1-close multiple of X of class C2, generating a topologically equivalent flow, which is robustly exponentially mixing with respect to any physical measure for all vector fields in a C2 neighborhood. That is, every singular-hyperbolic attracting set mixes exponentially with respect to its physical measures modulo an arbitrarily small change in the speed of the flow.
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