Mathematical models of economic dynamics and growth are usually expressed in terms of diefrential equations/inclusions (in the case of continuous time) or diefrence equations/inclusions (if discrete time is assumed). 3 hTis class of models includes von Neumann-Leontief-Gale type dynamic input-output models to which the paper refers. eTh paper focuses on the turnpike stability of optimal growth processes in a Gale non-stationary economy with discrete time in the neighbourhood of von Neumann dynamic equilibrium states (so-called growth equilibrium). eTh paper refers to Panek (2019, 2020) and shows an intermediate result between the strong and very strong turnpike theorem in the non-stationary Gale economy with changing technology assuming that the prices of temporary equilibrium in such an economy (so-called von Neumann prices) do not change rapidly. eTh aim of the paper is to bring mathematical proof that the introduction of these assumptions making the model more realistic does not change its asymptotic (turnpike-like) properties.
Artykuł wpisuje się w nurt nielicznych prac z ekonomii matematycznej, zawierających dowody tzw. twierdzeń o magistrali w modelach niestacjonarnych gospodarek typu Neumanna-Gale’a. Wykorzystując ideę dowodu twierdzenia 5 przedstawionego w pracy Panek (2013b) udowodniono wersję pośrednią- między „silną” i „bardzo silną” - twierdzenia o magistrali w niestacjonarnej gospodarce Gale’a głoszącą, że jeżeli w niestacjonarnej gospodarce Gale’a optymalny proces wzrostu w pewnym okresie czasu dociera do magistrali, a ceny (von Neumanna) nie zmieniają się zbyt gwałtownie, to niezależnie od długości horyzontu proces taki przez wszystkie kolejne okresy (za wyjątkiem co najwyżej ostatniego) przebiega w pobliżu magistrali.
EN
This article is part of a trend of few works of mathematical economics containing proofs of the so-called turnpike theorems in the non-stationary Neumann-Gale economies. Using the idea of the proof of theorem 5 in the article Panek (2013b) the intermediate version was proven, that stands between the “strong” and the “very strony” turnpike theorem in the non-stationary Gale economy. It states that if in the non-stationary Gale’s economy the optimal growth process in a certain period of time reaches the turnpike and the (von Neumann) prices do not change to abruptly, than irrespectively of the length of the horizon, such a process for all subsequent periods (except for perhaps the final time) can be found in the turnpike’s proximity.
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