Financial time series have a fractal nature that poses challenges for their dynamical characterization. The Dow Jones Industrial Average (DJIA) is one of the most influential financial indices, and due to its importance, it is adopted as a test bed for this study. The paper explores an alternative strategy to the standard time analysis, by joining the multidimensional scaling (MDS) computational tool and the concepts of distance, entropy, fractal dimension, and fractional calculus. First, several distances are considered to measure the similarities between objects under study and to yield proper input information to the MDS. Then, the MDS constructs a representation based on the similarity of the objects, where time can be viewed as a param...
This thesis will first criticize standard financial theory. The focus will be on return distribution...
Fractals play an important role in nonlinear science. The most important parameter when modeling a f...
In this paper, we apply multidimensional scaling (MDS) and parametric similarity indices (PSI) in th...
Abstract — This paper explores the conceptual background to financial time series analysis and finan...
We show that a multifractal analysis offers a new and potentially promising avenue for quantifying t...
A study is conducted on time series data analysis relating the concept of the fractional calculus to...
In this paper, three new algorithms are introduced in order to explore long memory in financial time...
This book provides a generalised approach to fractal dimension theory from the standpoint of asymmet...
The objective of this paper is to demonstrate through empirical analyzes of prices, yields and vola...
This thesis focuses on fractal analysis of economic time series. Chapter One introduces fractal anal...
Scale invariance has been found to empirically hold for a number of complex systems. The correct eva...
The Dow Jones Industrial Average 30 (DJIA30) Index was analyzed to show that models based on the Fra...
This review first gives an overview on the concept of fractal geometry with definitions and explanat...
We use the modified inverse random midpoint displacement (mIRMD) method to calculate the fractal dim...
When studying the financial markets, the currency quotations of the Russian ruble / US dollar pair a...
This thesis will first criticize standard financial theory. The focus will be on return distribution...
Fractals play an important role in nonlinear science. The most important parameter when modeling a f...
In this paper, we apply multidimensional scaling (MDS) and parametric similarity indices (PSI) in th...
Abstract — This paper explores the conceptual background to financial time series analysis and finan...
We show that a multifractal analysis offers a new and potentially promising avenue for quantifying t...
A study is conducted on time series data analysis relating the concept of the fractional calculus to...
In this paper, three new algorithms are introduced in order to explore long memory in financial time...
This book provides a generalised approach to fractal dimension theory from the standpoint of asymmet...
The objective of this paper is to demonstrate through empirical analyzes of prices, yields and vola...
This thesis focuses on fractal analysis of economic time series. Chapter One introduces fractal anal...
Scale invariance has been found to empirically hold for a number of complex systems. The correct eva...
The Dow Jones Industrial Average 30 (DJIA30) Index was analyzed to show that models based on the Fra...
This review first gives an overview on the concept of fractal geometry with definitions and explanat...
We use the modified inverse random midpoint displacement (mIRMD) method to calculate the fractal dim...
When studying the financial markets, the currency quotations of the Russian ruble / US dollar pair a...
This thesis will first criticize standard financial theory. The focus will be on return distribution...
Fractals play an important role in nonlinear science. The most important parameter when modeling a f...
In this paper, we apply multidimensional scaling (MDS) and parametric similarity indices (PSI) in th...