Persistent homology provides shapes descriptors called persistence diagrams. We use persistence diagrams to address the problem of shape comparison based on partial similarity. We show that two shapes having a common sub-part in general present a common persistence sub-diagram. Hence, the partial Hausdorff distance between persistence diagrams measures partial similarity between shapes. The approach is supported by experiments on 2D and 3D data sets
In this paper, we initiate a study of shape description and classification through the use of persis...
My personal journey to the fascinating world of geometric forms started more than 30 years ago with ...
In algebraic topology it is well known that, using the Mayer\u2013Vietoris sequence, the homology of...
Persistent homology provides shapes descriptors called persistence diagrams. We use persistence diag...
The ability to perform not only global matching but also partial matching is investigated in compute...
Persistence is a theory for Topological Data Analysis based on analyzing the scale at whichtopologic...
When shapes of objects are modeled as topological spaces endowed with functions, the shape compariso...
When shapes of objects are modeled as topologicalspaces endowed with functions, the shape comparison...
In this paper, we initiate a study of shape description and classification via the application of pe...
Abstract. This paper deals with the concepts of persistence diagrams and matching distance. They are...
This paper deals with the concepts of persistence diagram and matching distance. These are two of th...
Persistent homology is a powerful notion rooted in topological data analysis which allows for retrie...
Persistence modules are algebraic constructs that can be used to describe the shape of an object sta...
Persistence modules are algebraic constructs that can be used to describe the shape of an object sta...
Persistence diagrams, combining geometry and topology for an effective shape description used in pat...
In this paper, we initiate a study of shape description and classification through the use of persis...
My personal journey to the fascinating world of geometric forms started more than 30 years ago with ...
In algebraic topology it is well known that, using the Mayer\u2013Vietoris sequence, the homology of...
Persistent homology provides shapes descriptors called persistence diagrams. We use persistence diag...
The ability to perform not only global matching but also partial matching is investigated in compute...
Persistence is a theory for Topological Data Analysis based on analyzing the scale at whichtopologic...
When shapes of objects are modeled as topological spaces endowed with functions, the shape compariso...
When shapes of objects are modeled as topologicalspaces endowed with functions, the shape comparison...
In this paper, we initiate a study of shape description and classification via the application of pe...
Abstract. This paper deals with the concepts of persistence diagrams and matching distance. They are...
This paper deals with the concepts of persistence diagram and matching distance. These are two of th...
Persistent homology is a powerful notion rooted in topological data analysis which allows for retrie...
Persistence modules are algebraic constructs that can be used to describe the shape of an object sta...
Persistence modules are algebraic constructs that can be used to describe the shape of an object sta...
Persistence diagrams, combining geometry and topology for an effective shape description used in pat...
In this paper, we initiate a study of shape description and classification through the use of persis...
My personal journey to the fascinating world of geometric forms started more than 30 years ago with ...
In algebraic topology it is well known that, using the Mayer\u2013Vietoris sequence, the homology of...