Add to ORKGThe statistical properties of the increments x(t+T) - x(t) of a financial time series depend on the time resolution T on which the increments are considered. A non-parametric approach is used to study the scale dependence of the empirical distribution of the price increments x(t+T) - x(t) of S&P Index futures, for time scales T, ranging from a few minutes to a few days using high-frequency price data. We show that while the variance increases linearly with the timescale, the kurtosis exhibits anomalous scaling properties, indicating a departure from the iid hypothesis. Study of the dependence structure of the increments shows that although the autocorrelation function decays rapidly to zero in a few minutes, the correlation of their squares...
Abstract. In the present work we investigate the multiscale nature of the correlations for high freq...
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...
We study the distribution of fluctuations of the S&P 500 index over a time scale Δt by analyzing thr...
Arguably the most important problem in quantitative finance is to understand the nature of stochasti...
We measure the influence of different time-scales on the intraday dynamics of financial markets. Thi...
Arguably the most important problem in quantitative finance is to understand the nature of stochasti...
A stochastic analysis of financial data is presented. In particular we investigate how the statistic...
Being able to quantify the probability of large price changes in stock markets is of crucial importa...
We investigated distributions of short term price trends for high frequency stock market data. A num...
In the present work we investigate the multiscale nature of the correlations for high frequency data...
This thesis will first criticize standard financial theory. The focus will be on return distribution...
We report evidence of a deep interplay between cross-correlations hierarchical properties and multif...
We empirically analyze the scaling properties of daily Foreign Exchange rates, Stock Market indices ...
We focus on new insights of scale invariance and scaling properties usefully applied in the framewor...
Abstract. In the present work we investigate the multiscale nature of the correlations for high freq...
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...
We study the distribution of fluctuations of the S&P 500 index over a time scale Δt by analyzing thr...
Arguably the most important problem in quantitative finance is to understand the nature of stochasti...
We measure the influence of different time-scales on the intraday dynamics of financial markets. Thi...
Arguably the most important problem in quantitative finance is to understand the nature of stochasti...
A stochastic analysis of financial data is presented. In particular we investigate how the statistic...
Being able to quantify the probability of large price changes in stock markets is of crucial importa...
We investigated distributions of short term price trends for high frequency stock market data. A num...
In the present work we investigate the multiscale nature of the correlations for high frequency data...
This thesis will first criticize standard financial theory. The focus will be on return distribution...
We report evidence of a deep interplay between cross-correlations hierarchical properties and multif...
We empirically analyze the scaling properties of daily Foreign Exchange rates, Stock Market indices ...
We focus on new insights of scale invariance and scaling properties usefully applied in the framewor...
Abstract. In the present work we investigate the multiscale nature of the correlations for high freq...
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...