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Asymptotic Behaviour of Iterates of Volterra Operators on L p (0, 1)

Authors:

S P Eveson

Institution:

(1) Department of Mathematics, University of York, Heslington, York, YO10 5DD, England

Abstract:

Given k ∈ L¹ (0,1) satisfying certain smoothness and growth conditions at 0, we consider the Volterra convolution operator V_k defined on L^p (0,1) by

$(V_{k}u)(t)= \int_{0}^{t} {k(t-s)u(s){\text{d}}s},$

and its iterates $(V_{k}^{n})_{n \in {\mathbb{N}}}.$ We construct some much simpler sequences which, as n → ∞, are asymptotically equal in the operator norm to V_kⁿ. This leads to a simple asymptotic formula for ||V_kⁿ|| and to a simple ‘asymptotically extremal sequence’; that is, a sequence (u_n) in L^p (0, 1) with ||u_n||_p=1 and $||V_{k}^{n} u_{n}|| \sim ||V_{k}^{n}||$ as n → ∞. As an application, we derive a limit theorem for large deviations, which appears to be beyond the established theory.

Keywords:

Mathematics Subject Classification (2000)" target="_blank">Mathematics Subject Classification (2000) 47G10

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