Considering the fact that hypergraphs are not just generalizations of standard graphs and that they sufficiently describe the abstract nature of a simplicial complex, we should be able to develop out a myriad of topologically inspired algorithms and operators in addition to apply topological data analysis to the implementations.
Overview
A simplicial complex is essentially a particular configuration of smaller simplices. Topologists glue together individual simplexes to form the larger abstracts enabling them to capture more complex relationships and systems.
Related Issues and Pull Requests
Roadmap
Resources
Include any relevant links or resources...
Considering the fact that hypergraphs are not just generalizations of standard graphs and that they sufficiently describe the abstract nature of a simplicial complex, we should be able to develop out a myriad of topologically inspired algorithms and operators in addition to apply topological data analysis to the implementations.
Overview
A simplicial complex is essentially a particular configuration of smaller simplices. Topologists glue together individual simplexes to form the larger abstracts enabling them to capture more complex relationships and systems.
Related Issues and Pull Requests
Roadmap
Resources
Include any relevant links or resources...