Add to ORKGWe show that log-periodic power-law (LPPL) functions are intrinsically very hard to fit to time series. This comes from their sloppiness, the squared residuals depending very much on some combinations of parameters and very little on other ones. The time of singularity that is supposed to give an estimate of the day of the crash belongs to the latter category. We discuss in detail why and how the fitting procedure must take into account the sloppy nature of this kind of model. We then test the reliability of LPPLs on synthetic AR(1) data replicating the Hang Seng 1987 crash and show that even this case is borderline regarding predictability of divergence time. We finally argue that current methods used to estimate a probabilistic time windo...
We aim to provide an algorithm to predict the distribution of the critical times of financial bubble...
Log-periodic precursors have been identified before most and perhaps all financial crashes of the Tw...
We augment the existing literature using the Log-Periodic Power Law Singular (LPPLS) structures in t...
A number of papers claim that a Log Periodic Power Law (LPPL) fitted to financial market bubbles tha...
Stock market crashes were considered as an chaotic even for a long time. However, more than a decade...
Latex document of 38 pages including 16 eps figures and 3 tablesWe clarify the status of log-periodi...
This article presents Log-Periodic Power Law and considers its usefulness as a forecasting tool on t...
A large number of papers have been written by physicists documenting an alleged signature of imminen...
A large number of papers have been written by physicists documenting an alleged signature of imminen...
This bachelor thesis concerns itself with multiple objectives. First, to compare two apparently cont...
Sornette et al. (1996), Sornette and Johansen (1997), Johansen et al. (2000) and Sornette (2003a) pr...
To decrease the damage caused by meteorological disasters, it is important to be able to predict the...
AbstractBy combining (i) the economic theory of rational expectation bubbles, (ii) behavioral financ...
Speculative bubbles have throughout the times foiled various scholars; many have tried to accurately...
We augment the existing literature using the Log-Periodic Power Law Singular (LPPLS) structures in t...
We aim to provide an algorithm to predict the distribution of the critical times of financial bubble...
Log-periodic precursors have been identified before most and perhaps all financial crashes of the Tw...
We augment the existing literature using the Log-Periodic Power Law Singular (LPPLS) structures in t...
A number of papers claim that a Log Periodic Power Law (LPPL) fitted to financial market bubbles tha...
Stock market crashes were considered as an chaotic even for a long time. However, more than a decade...
Latex document of 38 pages including 16 eps figures and 3 tablesWe clarify the status of log-periodi...
This article presents Log-Periodic Power Law and considers its usefulness as a forecasting tool on t...
A large number of papers have been written by physicists documenting an alleged signature of imminen...
A large number of papers have been written by physicists documenting an alleged signature of imminen...
This bachelor thesis concerns itself with multiple objectives. First, to compare two apparently cont...
Sornette et al. (1996), Sornette and Johansen (1997), Johansen et al. (2000) and Sornette (2003a) pr...
To decrease the damage caused by meteorological disasters, it is important to be able to predict the...
AbstractBy combining (i) the economic theory of rational expectation bubbles, (ii) behavioral financ...
Speculative bubbles have throughout the times foiled various scholars; many have tried to accurately...
We augment the existing literature using the Log-Periodic Power Law Singular (LPPLS) structures in t...
We aim to provide an algorithm to predict the distribution of the critical times of financial bubble...
Log-periodic precursors have been identified before most and perhaps all financial crashes of the Tw...
We augment the existing literature using the Log-Periodic Power Law Singular (LPPLS) structures in t...