Add to ORKGWe consider a new topological feauturization of $d$-dimensional images, obtained by convolving images with various filters before computing persistence. Viewing a convolution filter as a motif within an image, the persistence diagram of the resulting convolution describes the way the motif is distributed throughout that image. This pipeline, which we call convolutional persistence, extends the capacity of topology to observe patterns in image data. Indeed, we prove that (generically speaking) for any two images one can find some filter for which they produce different persistence diagrams, so that the collection of all possible convolutional persistence diagrams for a given image is an injective invariant. This is proven by showing convolut...
Persistent Homology (PH) has been successfully used to train networks to detect curvilinear structur...
Data has shape and that shape is important. This is the anthem of Topological Data Analysis (TDA) as...
Topological data analysis is a branch of computational topology which uses algebra to obtain topolo...
Artificial neural networks can learn complex, salient data features to achieve a given task. On the ...
<p>In this thesis we explore and extend the theory of persistent homology, which captures topologica...
In this work we use the persistent homology method, a technique in topological data analysis (TDA), ...
Homology gives a tool to measure the "holes" in topological spaces. Persistent homology extends the ...
Taking images is an efficient way to collect data about the physical world. It can be done fast and ...
Persistence landscapes are functional summaries of persistence diagrams designed to enable analysis ...
Topology is the branch of mathematics that studies shapes and maps among them. From the algebraic d...
Topological Data Analysis (TDA) is a relatively new focus in the fields of statistics and machine le...
The theory of multidimensional persistent homology was initially developed in the discrete setting, ...
Topological data analysis offers a rich source of valuable information to study vision problems. Yet...
Harnessing the power of data has been a driving force for computing in recently years. However, the ...
International audienceIn the last decade, there has been increasing interest in topological data ana...
Persistent Homology (PH) has been successfully used to train networks to detect curvilinear structur...
Data has shape and that shape is important. This is the anthem of Topological Data Analysis (TDA) as...
Topological data analysis is a branch of computational topology which uses algebra to obtain topolo...
Artificial neural networks can learn complex, salient data features to achieve a given task. On the ...
<p>In this thesis we explore and extend the theory of persistent homology, which captures topologica...
In this work we use the persistent homology method, a technique in topological data analysis (TDA), ...
Homology gives a tool to measure the "holes" in topological spaces. Persistent homology extends the ...
Taking images is an efficient way to collect data about the physical world. It can be done fast and ...
Persistence landscapes are functional summaries of persistence diagrams designed to enable analysis ...
Topology is the branch of mathematics that studies shapes and maps among them. From the algebraic d...
Topological Data Analysis (TDA) is a relatively new focus in the fields of statistics and machine le...
The theory of multidimensional persistent homology was initially developed in the discrete setting, ...
Topological data analysis offers a rich source of valuable information to study vision problems. Yet...
Harnessing the power of data has been a driving force for computing in recently years. However, the ...
International audienceIn the last decade, there has been increasing interest in topological data ana...
Persistent Homology (PH) has been successfully used to train networks to detect curvilinear structur...
Data has shape and that shape is important. This is the anthem of Topological Data Analysis (TDA) as...
Topological data analysis is a branch of computational topology which uses algebra to obtain topolo...