Investment time horizon and multifractality of stock price process

Abstract: We construct a multifractal random walk for a stock trades model with inverse power law interaction. Consider a stock in a stock market and introduce a discrete time model for pair trades [(first trade ! second (reverse) trade] transacted by various types of traders. The type of trader is characterized by the investment time horizon defined as a time difference of the pair trades. We assume that probability distributions of the investment time horizons are given by inverse power law interactions with different… Show more

“…In the previous paper (Kuroda 2016), we constructed a log-volatility process {w r (t)} from a discrete time process {W (n,r) t } defined on a random media with power law interaction as a scale limit, where 𝛼 > 0 plays a role of time scale exponent and c(n) is a scale function. We look at the system with time scale n , and scale it by a scale function c(n).…”

Exogenous shock and multifractal random walk

“…In the previous paper (Kuroda 2016), we constructed a log-volatility process {w r (t)} from a discrete time process {W (n,r) t } defined on a random media with power law interaction as a scale limit, where 𝛼 > 0 plays a role of time scale exponent and c(n) is a scale function. We look at the system with time scale n , and scale it by a scale function c(n).…”

Exogenous shock and multifractal random walk