p-dimensional cones and applications
Abstract
We introduce a notion of p-dimensional cones made of p-dimensional subspaces and gauges on these cones, giving rise to a contraction principle which generalizes the one for Birkhoff cones. Using tools on the grassmannian and the exterior algebra, we prove a spectral gap result for the p largest eigenvalues of an operator and a regularity result for the characteristic exponents of a random product of cone-contracting operators.
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