An ergodic theorem on Banach lattices |
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Authors: | M A Akcoglu L Sucheston |
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Institution: | (1) Department of Mathematics, University of Toronto, M5S 1A1 Ontario, Canada;(2) Department of Mathematics, The Ohio State University, 43210 Columbus, OH, USA |
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Abstract: | E is a Banach lattice that is weakly sequentially complete and has a weak unitu. TLf
n=ϕ means that the infimum of |f
n−ϕ| andu converges strongly to zero.T is a positive contraction operator onE andA
n=(1/n)(I+T+...+T
n−1). Without an additional assumption onE, the “truncated limit” TLA
nf need not exist forf inE. This limit exists for eachf ifE satisfies the following additional assumption (C): For everyf inE
+ and for every numberα>0, there is a numberβ=β(f, α) such that ifg is inE
+, ‖g‖≦1, 0≦f′≦f and ‖f′‖>α then ‖f′+g‖≧‖g‖+β.
Research of this author is partially supported by NSERC Grant A3974.
Research of this author is partially supported by NSF Grant 8301619. |
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Keywords: | |
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