In a series of papers based on analogies with statistical physics models, we have proposed that most financial crashes are the climax of so-called log-periodic power law signatures (LPPL) associated with speculative bubbles (Sornette and Johansen, 1998; Johansen and Sornette, 1999; Johansen et al. 1999; Johansen et al. 2000; Sornette and Johansen, 2001a). In addition, a large body of empirical evidence supporting this proposition have been presented (Sornette et al. 1996; Sornette and Johansen, 1998; Johansen et al. 2000; Johansen and Sornette, 2000; Johansen and Sornette, 2001a, Sornette and Johansen, 2001b). Along a complementary line of research, we have established that, while the vast majority of drawdowns occurring on the major financ...
This paper proposes a new model for capturing discontinuities in the underlying financial environment...
We present a synthesis of all the available empirical evidence in the light of recent theoretical de...
In this paper we quantitatively investigate the statistical properties of a statistical ensemble of ...
In a series of papers based on analogies with statistical physics models, we have proposed that most...
AbstractBy combining (i) the economic theory of rational expectation bubbles, (ii) behavioral financ...
A number of papers claim that a Log Periodic Power Law (LPPL) fitted to financial market bubbles tha...
Latex document of 38 pages including 16 eps figures and 3 tablesWe clarify the status of log-periodi...
Sornette et al. (1996), Sornette and Johansen (1997), Johansen et al. (2000) and Sornette (2003a) pr...
A taxonomy of large financial crashes proposed in the literature locates the burst of speculative bu...
As the stock market came to the attention of increasing numbers of physicists, an idea that has rece...
In this paper we provide a unifying framework for a set of seemingly disparate models for exogenous ...
Starting on February 20, 2020, the global stock markets began to suffer the worst decline since the ...
We study a rational expectation model of bubbles and crashes. The model has two components: (1) our ...
Log-periodic power laws often occur as signatures of impending criticality of hierarchical systems i...
Statistics of drawdowns (loss from the last local maximum to the next local minimum) plays an import...
This paper proposes a new model for capturing discontinuities in the underlying financial environment...
We present a synthesis of all the available empirical evidence in the light of recent theoretical de...
In this paper we quantitatively investigate the statistical properties of a statistical ensemble of ...
In a series of papers based on analogies with statistical physics models, we have proposed that most...
AbstractBy combining (i) the economic theory of rational expectation bubbles, (ii) behavioral financ...
A number of papers claim that a Log Periodic Power Law (LPPL) fitted to financial market bubbles tha...
Latex document of 38 pages including 16 eps figures and 3 tablesWe clarify the status of log-periodi...
Sornette et al. (1996), Sornette and Johansen (1997), Johansen et al. (2000) and Sornette (2003a) pr...
A taxonomy of large financial crashes proposed in the literature locates the burst of speculative bu...
As the stock market came to the attention of increasing numbers of physicists, an idea that has rece...
In this paper we provide a unifying framework for a set of seemingly disparate models for exogenous ...
Starting on February 20, 2020, the global stock markets began to suffer the worst decline since the ...
We study a rational expectation model of bubbles and crashes. The model has two components: (1) our ...
Log-periodic power laws often occur as signatures of impending criticality of hierarchical systems i...
Statistics of drawdowns (loss from the last local maximum to the next local minimum) plays an import...
This paper proposes a new model for capturing discontinuities in the underlying financial environment...
We present a synthesis of all the available empirical evidence in the light of recent theoretical de...
In this paper we quantitatively investigate the statistical properties of a statistical ensemble of ...