Arguably the most important problem in quantitative finance is to understand the nature of stochastic processes that underlie market dynamics. One aspect of the solution to this problem involves determining characteristics of the distribution of fluctuations in returns. Empirical studies conducted over the last decade have reported that they arenon-Gaussian, scale in time, and have power-law(or fat) tails. However, because they use sliding interval methods of analysis, these studies implicitly assume that the underlying process has stationary increments. We explicitly show that this assumption is not valid for the Euro-Dollar exchange rate between 1999-2004. In addition, we find that fluctuations in returns of the exchange rate are uncorrel...
The performance of the well-known stochastic processes used for the empirical distribution of the ex...
A stochastic analysis of financial data is presented. In particular we investigate how the statistic...
Most of the papers that study the distributional and fractal properties of financial instruments foc...
Arguably the most important problem in quantitative finance is to understand the nature of stochasti...
The statistical properties of the increments x(t+T) - x(t) of a financial time series depend on the ...
We study the distribution of fluctuations of the S&P 500 index over a time scale Δt by analyzing thr...
We measure the influence of different time-scales on the intraday dynamics of financial markets. Thi...
The condition for stationary increments, not scaling, detemines long time pair autocorrelations. An ...
We conclude from a careful analysis of high resolution NYSE data that, contrary to previous argument...
A central problem of Quantitative Finance is that of formulating a probabilistic model of the time e...
A necessary precondition for modeling financial markets is a complete understanding of their statist...
A necessary precondition for modeling financial markets is a complete understanding of their statist...
A central problem of Quantitative Finance is that of formulating a probabilistic model of the time e...
This paper provides new empirical evidence for intraday scaling behavior of stock market returns uti...
Most of the papers that study the distributional and fractal properties of financial instruments foc...
The performance of the well-known stochastic processes used for the empirical distribution of the ex...
A stochastic analysis of financial data is presented. In particular we investigate how the statistic...
Most of the papers that study the distributional and fractal properties of financial instruments foc...
Arguably the most important problem in quantitative finance is to understand the nature of stochasti...
The statistical properties of the increments x(t+T) - x(t) of a financial time series depend on the ...
We study the distribution of fluctuations of the S&P 500 index over a time scale Δt by analyzing thr...
We measure the influence of different time-scales on the intraday dynamics of financial markets. Thi...
The condition for stationary increments, not scaling, detemines long time pair autocorrelations. An ...
We conclude from a careful analysis of high resolution NYSE data that, contrary to previous argument...
A central problem of Quantitative Finance is that of formulating a probabilistic model of the time e...
A necessary precondition for modeling financial markets is a complete understanding of their statist...
A necessary precondition for modeling financial markets is a complete understanding of their statist...
A central problem of Quantitative Finance is that of formulating a probabilistic model of the time e...
This paper provides new empirical evidence for intraday scaling behavior of stock market returns uti...
Most of the papers that study the distributional and fractal properties of financial instruments foc...
The performance of the well-known stochastic processes used for the empirical distribution of the ex...
A stochastic analysis of financial data is presented. In particular we investigate how the statistic...
Most of the papers that study the distributional and fractal properties of financial instruments foc...