Using a Gibbs distribution developed in the theory of statistical physics and a long−range percolation theory, we present a new model of a stock price process for explaining the fat tail in the distribution of stock returns. We consider two types of traders, Group A and Group B : Group A traders analyze the past data on the stock market to determine their present trading positions. The way to determine their trading positions is not deterministic but obeys a Gibbs distribution with interactions between the past data and the present trading positions. On the other hand, Group B traders follow the advice reached through the long−range percolation system from the investment adviser. As the resulting stock price process, we derive a Lévy proces...
We present a nonlinear stochastic differential equation (SDE) which mimics the probability density f...
This paper establishes a continuous-time stochastic asset pricing model in a speculative financial m...
High-frequency data in finance have led to a deeper understanding on probability distributions of ma...
Using a Gibbs distribution developed in the theory of statistical physics and a long−range percolati...
It is widely known that distributions of stock-price fluctuations show afat tails.” This report expl...
It's commonly known that the correlation between stocks increases during market turbulent periods. I...
It is well-known that financial asset returns exhibit fat-tailed distributions and long-term memory....
We propose a random walk model of asset returns where the parameters depend on market stress. Stress...
We present a simple model of a stock market where a random communication structure between agents ge...
In complex systems such as turbulent flows and financial markets, the dynamics in long and short ti...
We explore the effects of fat tails on the equilibrium implications of the long run risks model of a...
Large deviations for fat tailed distributions, i.e. those that decay slower than exponential, are no...
In this paper we study the possible microscopic origin of heavy-tailed probability density distribut...
Using a simultaneous-move herding model of rational traders who infer other traders\u27private infor...
We investigate the general problem of how to model the kinematics of stock prices without considerin...
We present a nonlinear stochastic differential equation (SDE) which mimics the probability density f...
This paper establishes a continuous-time stochastic asset pricing model in a speculative financial m...
High-frequency data in finance have led to a deeper understanding on probability distributions of ma...
Using a Gibbs distribution developed in the theory of statistical physics and a long−range percolati...
It is widely known that distributions of stock-price fluctuations show afat tails.” This report expl...
It's commonly known that the correlation between stocks increases during market turbulent periods. I...
It is well-known that financial asset returns exhibit fat-tailed distributions and long-term memory....
We propose a random walk model of asset returns where the parameters depend on market stress. Stress...
We present a simple model of a stock market where a random communication structure between agents ge...
In complex systems such as turbulent flows and financial markets, the dynamics in long and short ti...
We explore the effects of fat tails on the equilibrium implications of the long run risks model of a...
Large deviations for fat tailed distributions, i.e. those that decay slower than exponential, are no...
In this paper we study the possible microscopic origin of heavy-tailed probability density distribut...
Using a simultaneous-move herding model of rational traders who infer other traders\u27private infor...
We investigate the general problem of how to model the kinematics of stock prices without considerin...
We present a nonlinear stochastic differential equation (SDE) which mimics the probability density f...
This paper establishes a continuous-time stochastic asset pricing model in a speculative financial m...
High-frequency data in finance have led to a deeper understanding on probability distributions of ma...