In this thesis, we present new theoretical tools in topological data analysis with applications in image analysis. We draw on a number of tools from Discrete Morse theory, presenting the relevant concepts from [7], [15] and [16] in Chapter 2. We prove an original result in Chapter 3 concerning the attaching maps of CW complex comprised of the critical cells of a discrete Morse function. We introduce the concept of a homotopy merge tree in Chapter 4 as an algebraic tool to summarise homotopical changes over a ltered space. The de nition is an extension of the work of [14], retaining the important properties of interleaving distance and stability. We show that the results of Chapter 2 can be used to simplify calculations of the homotopy merg...
Our primary motivation for persistent homology is in its applications to shape similarity measures. ...
In this paper, we explore finite topological spaces and their algebraic structure. Given a finite to...
In this work we answer an open question asked by Johnson--Scoville. We show that each merge tree is ...
This report provides theoretical justification for the use of discrete Morse the-ory for the computa...
Abstract. In this paper we present a new approach to computing homology (with field coefficients) an...
The field of topological data analysis seeks to use techniques in topology to study large data sets....
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
We provide explicit and efficient reduction algorithms based on discrete Morse theory to simplify ho...
We provide explicit and efficient reduction algorithms based on discrete Morse theory to simplify ho...
Morse theory offers a natural and mathematically-sound tool for shape analysis and understanding. It...
The Morse complex can be used for studying the topology of a function, e.g., an image or terrain hei...
International audienceWe introduce a theoretical and computational framework to use discrete Morse t...
We study persistent homology, methods in discrete differential geometry and discrete Morse theory. P...
The classical Morse theory is a powerful tool to study topological properties of a smooth manifold b...
We solve the problem of minimizing the number of critical points among all functions on a surface wi...
Our primary motivation for persistent homology is in its applications to shape similarity measures. ...
In this paper, we explore finite topological spaces and their algebraic structure. Given a finite to...
In this work we answer an open question asked by Johnson--Scoville. We show that each merge tree is ...
This report provides theoretical justification for the use of discrete Morse the-ory for the computa...
Abstract. In this paper we present a new approach to computing homology (with field coefficients) an...
The field of topological data analysis seeks to use techniques in topology to study large data sets....
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
We provide explicit and efficient reduction algorithms based on discrete Morse theory to simplify ho...
We provide explicit and efficient reduction algorithms based on discrete Morse theory to simplify ho...
Morse theory offers a natural and mathematically-sound tool for shape analysis and understanding. It...
The Morse complex can be used for studying the topology of a function, e.g., an image or terrain hei...
International audienceWe introduce a theoretical and computational framework to use discrete Morse t...
We study persistent homology, methods in discrete differential geometry and discrete Morse theory. P...
The classical Morse theory is a powerful tool to study topological properties of a smooth manifold b...
We solve the problem of minimizing the number of critical points among all functions on a surface wi...
Our primary motivation for persistent homology is in its applications to shape similarity measures. ...
In this paper, we explore finite topological spaces and their algebraic structure. Given a finite to...
In this work we answer an open question asked by Johnson--Scoville. We show that each merge tree is ...