Turnpike in infinite dimension

Abstract: Let Φ be a correspondence from a normed vector space X into itself, let u : X → R be a function, and I be an ideal on N. Also, assume that the restriction of u on the fixed points of Φ has a unique maximizer η ⋆ . Then, we consider feasible paths (x 0 , x 1 , . . .) with values in X such that x n+1 ∈ Φ(x n ) for all n ≥ 0. Under certain additional conditions, we prove the following turnpike result: every feasible path (x 0 , x 1 , . . .) which maximizes the smallest I-cluster point of the sequence (u(x 0 ), u(… Show more