We discuss martingales, detrending data, and the efficient market hypothesis for stochastic processes x(t) with arbitrary diffusion coefficients D(x,t). Beginning with x-independent drift coefficients R(t) we show that Martingale stochastic processes generate uncorrelated, generally nonstationary increments. Generally, a test for a martingale is therefore a test for uncorrelated increments. A detrended process with an x- dependent drift coefficient is generally not a martingale, and so we extend our analysis to include the class of (x,t)-dependent drift coefficients of interest in finance. We explain why martingales look Markovian at the level of both simple averages and 2-point correlations. And while a Markovian market has no memory to ex...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
Three processes reflecting persistence of volatility are initially formulated by evaluating three Lé...
It is shown that for a large collection of independent martingales, the martingale property is prese...
We discuss martingales, detrending data, and the efficient market hypothesis for stochastic processe...
The condition for stationary increments, not scaling, detemines long time pair autocorrelations. An ...
First, classes of Markov processes that scale exactly with a Hurst exponent H are derived in closed ...
AbstractA Markov process, by definition, cannot depend on any previous state other than the last obs...
The condition for stationary increments, not scaling, detemines long time pair autocorrelations. An ...
There is much confusion in the literature over Hurst exponents. Recently, we took a step in the dire...
We show by explicit closed form calculations that a Hurst exponent H≠1/2 does not necessarily imply ...
This paper considers the size of the large fluctuations of a stochastic differential equation with M...
An important theorem in stochastic finance field is the martingale representation theorem. It is use...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...
We show that our earlier generalization of the Black-Scholes partial differential equation (pde) for...
We show that Ito processes imply the Fokker-Planck (K2) and Kolmogorov backward time (K1) partial di...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
Three processes reflecting persistence of volatility are initially formulated by evaluating three Lé...
It is shown that for a large collection of independent martingales, the martingale property is prese...
We discuss martingales, detrending data, and the efficient market hypothesis for stochastic processe...
The condition for stationary increments, not scaling, detemines long time pair autocorrelations. An ...
First, classes of Markov processes that scale exactly with a Hurst exponent H are derived in closed ...
AbstractA Markov process, by definition, cannot depend on any previous state other than the last obs...
The condition for stationary increments, not scaling, detemines long time pair autocorrelations. An ...
There is much confusion in the literature over Hurst exponents. Recently, we took a step in the dire...
We show by explicit closed form calculations that a Hurst exponent H≠1/2 does not necessarily imply ...
This paper considers the size of the large fluctuations of a stochastic differential equation with M...
An important theorem in stochastic finance field is the martingale representation theorem. It is use...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...
We show that our earlier generalization of the Black-Scholes partial differential equation (pde) for...
We show that Ito processes imply the Fokker-Planck (K2) and Kolmogorov backward time (K1) partial di...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
Three processes reflecting persistence of volatility are initially formulated by evaluating three Lé...
It is shown that for a large collection of independent martingales, the martingale property is prese...