Explicit eigenvalue estimates for transfer operators
classification
🧮 math.DS
math.FA
keywords
transferactingeigenvalueexplicitlambdaoperatorsbergmanbounded
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We consider transfer operators acting on spaces of holomorphic functions, and provide explicit bounds for their eigenvalues. More precisely, if D is any open set in C^d, and L is a suitable transfer operator acting on Bergman space A^2(D), its eigenvalue sequence lambda_n(L) is bounded by |lambda_n(L)| \leq A\exp(-a n^{1/d}), where a, A are explicitly given.
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