Stable rank has recently been proposed as an invariant to encode the result of persistent homology, a method used in topological data analysis. In this thesis we develop methods for statistical analysis as well as machine learning methods based on stable rank. As stable rank may be viewed as a mapping to a Hilbert space, a kernel can be constructed from the inner product in this space. First, we investigate this kernel in the context of kernel learning methods such as support-vector machines. Next, using the theory of kernel embedding of probability distributions, we give a statistical treatment of the kernel by showing some of its properties and develop a two-sample hypothesis test based on the kernel. As an alternative approach, a mapping...
An ongoing problem regarding the automatic classification of neurons by their morphology is the lack...
Topological data analysis offers a rich source of valuable information to study vision problems. Yet...
In this thesis we will study the stability of the persistent homology pipeline used in topological d...
Exciting recent developments in Topological Data Analysis have aimed at combining homology-based inv...
We consider the problem of statistical computations with persistence diagrams, a summary representat...
Topological data analysis and its main method, persistent homology, provide a toolkit for computing ...
Persistent homology barcodes and diagrams are a cornerstone of topological data analysis. Widely use...
The Mapper algorithm and persistent homology are topological data analysis tools used for analyzing ...
Kernel-based methods are powerful tools that are widely applied in many applications and fields of r...
Parkinson’s Disease (PD) is the fastest growing neurodegenerative disease, currently affecting two t...
Hluboké učení prakticky vyřešilo nejrůznější problémy počítačového vidění v průběhu poslední dekády....
Rank or the minimal number of generators is a natural invariant attached to any n-dimensional persis...
In this position paper, we present a brief overview of the ways topological tools, in particular per...
Artificial neural networks at the present time gain notable popularity and show astounding results i...
Homology gives a tool to measure the "holes" in topological spaces. Persistent homology extends the ...
An ongoing problem regarding the automatic classification of neurons by their morphology is the lack...
Topological data analysis offers a rich source of valuable information to study vision problems. Yet...
In this thesis we will study the stability of the persistent homology pipeline used in topological d...
Exciting recent developments in Topological Data Analysis have aimed at combining homology-based inv...
We consider the problem of statistical computations with persistence diagrams, a summary representat...
Topological data analysis and its main method, persistent homology, provide a toolkit for computing ...
Persistent homology barcodes and diagrams are a cornerstone of topological data analysis. Widely use...
The Mapper algorithm and persistent homology are topological data analysis tools used for analyzing ...
Kernel-based methods are powerful tools that are widely applied in many applications and fields of r...
Parkinson’s Disease (PD) is the fastest growing neurodegenerative disease, currently affecting two t...
Hluboké učení prakticky vyřešilo nejrůznější problémy počítačového vidění v průběhu poslední dekády....
Rank or the minimal number of generators is a natural invariant attached to any n-dimensional persis...
In this position paper, we present a brief overview of the ways topological tools, in particular per...
Artificial neural networks at the present time gain notable popularity and show astounding results i...
Homology gives a tool to measure the "holes" in topological spaces. Persistent homology extends the ...
An ongoing problem regarding the automatic classification of neurons by their morphology is the lack...
Topological data analysis offers a rich source of valuable information to study vision problems. Yet...
In this thesis we will study the stability of the persistent homology pipeline used in topological d...