730 research outputs found
Learning in Monopolies with Delayed Price Information
We call the intercept of the price function with the vertical axis the maximum price and the slope of the price function the marginal price. In this paper it is assumed that a monopoly has full information about the marginal price and its own cost function but is uncertain on the maximum price. However, by repeated interaction with the market, the obtained price observations give a basis for an adaptive learning process. It is also assumed that the price observations have fixed delays, so the learning process can be described by a delayed differential equation. In the cases of one or two delays, the asymptotic behavior of the resulting dynamic process is examined, stability conditions are derived and the occurrence of Hopf bifurcation is shown at the critical values. It is also shown that the nonlinear learning process can generate complex dynamics when the steady state is locally unstable ane the delay is long enough
Production of Open-End Hybrid Yarn
Article先進繊維技術科学に関する研究報告 平成11年度成果報告 6: 43-44(2000)research repor
Heterogeneous Agent Model with Three Delays
This paper considers a continuous-time heterogeneous agent model of a financial market with one risky asset, two types of agents (i.e., the fundamentalists and the chartists), and three time delays. The chartist demand is determined through a nonlinear function of the difference between the current price and a weighted moving average of the delayed prices whereas the fundamentalist demand is governed by the difference between the current price and the fundamental value. The asset price dynamics is described by a nonloiniear delay differential eqation. Two main results are analytically and numerically shown:(i) the delay destabilizes the market price and generates cyclic oscillations around the equilibrium;(ii) under multiple delays, stability loss and gain repeatedly occurs as a length of the delay increases
Analytic solutions of nonlinear Cournot duopoly game
We construct a Cournot duopoly model with production externality in which reaction functions are unimodal. We consider the case of a Cournot model which has a stable equilibrium point. Then we show the existence of analytic solutions of the model. Moreover, we seek general solutions of the model in the form of nonlinear second-order difference equation
The Asymptotic Behavior in a Nonlinear Cobweb Model with Time Delays
We study the effects of production delays on the local as well as global
dynamics of nonlinear cobweb models in a continuous-time framework. After
reviewing a single delay model, we proceed to two models with two delays.
When the two delays are used to form an expected price or feedback for price
adjustment, we have a winding stability switching curve and in consequence
obtain repetition of stability losses and gains via Hopf bifurcation. When
the two delays are involved in two interrelated markets, we find that the
stability switching occurs on straight lines and complicated dynamics can
arise in unstable markets
Superconductivity in undoped T' cuprates with Tc over 30 K
Undoped cuprates have long been considered to be antiferromagnetic
insulators. In this article, however, we report that superconductivity is
achieved in undoped T'-RE2CuO4 (RE = Pr, Nd, Sm, Eu, and Gd). Our discovery was
performed by using metal-organic decomposition (MOD), an inexpensive and
easy-to-implement thin-film process. The keys to prepare the superconducting
films are firing with low partial-pressure of oxygen and reduction at low
temperatures. The highest Tc of undoped T'-RE2CuO4 is over 30 K, substantially
higher than "electron-doped" analogs. Remarkably, Gd2CuO4, even the derivatives
of which have not shown superconductivity so far, gets superconducting with
Tconset as high as ~ 20 K. The implication of our discovery is briefly
discussed.Comment: 22 pages, 5 figures, submitted to Physical Review Letter
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