Essays about: "persistent homologi"
Showing result 1 - 5 of 10 essays containing the words persistent homologi.
-
1. Exploring persistent homology as a method for capturing functional connectivity differences in Parkinson’s Disease.
University essay from KTH/Matematik (Avd.)Abstract : Parkinson’s Disease (PD) is the fastest growing neurodegenerative disease, currently affecting two to three percent of the population over 65. Studying functional connectivity (FC) in PD patients may provide new insights into how the disease alters brain organization in different subjects. READ MORE
-
2. Comparison in Barcode and Computing Time for Persistent Homology Applied to a Subset of a Point Cloud
University essay fromAbstract : At the intersection of topology and computer science lies the field of topological data analysis(TDA). TDA uses the concept of persistence to identify low dimensional topological features of data embedded in high dimensions. READ MORE
-
3. Properties of Discrete Laplacians With Application on Brain Networks
University essay from KTH/Matematisk statistikAbstract : This thesis investigates three discrete Laplace operators: the graph Laplacian, combinatorial Laplacian, and the more recently introduced persistent Laplacian. We discuss how these operators relate to each other and study their spectral properties. The graph Laplacian is a well-studied operator that plays a central role in spectral graph theory. READ MORE
-
4. Traffic Prediction From Temporal Graphs Using Representation Learning
University essay from KTH/Matematisk statistikAbstract : With the arrival of 5G networks, telecommunication systems are becoming more intelligent, integrated, and broadly used. This thesis focuses on predicting the upcoming traffic to efficiently promote resource allocation, guarantee stability and reliability of the network. READ MORE
-
5. From Relations to Simplicial Complexes: A Toolkit for the Topological Analysis of Networks
University essay from KTH/Matematik (Avd.)Abstract : We present a rigorous yet accessible introduction to structures on finite sets foundational for a formal study of complex networks. This includes a thorough treatment of binary relations, distance spaces, their properties and similarities. READ MORE