Add to ORKGOur study of the analysis on fractals is broken into three parts: Analysis of post- critically finite (p.c.f.) fractals, non-p.c.f. fractals and applications to Neurobiology. In the first chapter, we focus on how to construct and compute the harmonic structure on p.c.f. fractals. In the second chapter we calculate the spectrum of the Laplacian on an infinite class of fractals. In chapter 3 we discuss the relationship between p.c.f. self-similar structures and self-similar groups. In chapter 4 we discuss a new example of a non-p.c.f. fractal, namely the hexacarpet. Finally in chapter 5 we discuss applications of this analysis to analyzing neural networks
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
Abstract. We describe a new method to construct Laplacians on fractals using a Peano curve from the ...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Our study of the analysis on fractals is broken into three parts: Analysis of post- critically finit...
The recent field of analysis on fractals has been studied under a probabilistic and analytic point o...
Fractal analysis has become a popular method in all branches of scientific investigation including e...
The natural complexity of the brain, its hierarchical structure, and the sophisticated topological a...
Reviews the most intriguing applications of fractal analysis in neuroscience with a focus on current...
A fractal is a mathematical pattern that has several distinct features. Firstly, it must exhibit sel...
Classical analysis is not able to treat functions whose domain is fractal. We present an introductio...
Characterizations in terms of fractals are typically employed for systems with complex and multi-sca...
Many structures in biological systems are organised in self-similar patterns. These can often be des...
The introduction of fractal geometry in the neurosciences has been a major paradigm shift over the l...
In the area of fractal analysis, many details about the analytic structure of certain post-criticall...
Fractal analysis has entered a new era. The applications to different areas of knowledge have been s...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
Abstract. We describe a new method to construct Laplacians on fractals using a Peano curve from the ...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Our study of the analysis on fractals is broken into three parts: Analysis of post- critically finit...
The recent field of analysis on fractals has been studied under a probabilistic and analytic point o...
Fractal analysis has become a popular method in all branches of scientific investigation including e...
The natural complexity of the brain, its hierarchical structure, and the sophisticated topological a...
Reviews the most intriguing applications of fractal analysis in neuroscience with a focus on current...
A fractal is a mathematical pattern that has several distinct features. Firstly, it must exhibit sel...
Classical analysis is not able to treat functions whose domain is fractal. We present an introductio...
Characterizations in terms of fractals are typically employed for systems with complex and multi-sca...
Many structures in biological systems are organised in self-similar patterns. These can often be des...
The introduction of fractal geometry in the neurosciences has been a major paradigm shift over the l...
In the area of fractal analysis, many details about the analytic structure of certain post-criticall...
Fractal analysis has entered a new era. The applications to different areas of knowledge have been s...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
Abstract. We describe a new method to construct Laplacians on fractals using a Peano curve from the ...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...