Convex and Semi-Nonnegative Matrix Factorizations
The University of Texas at Arlington · Florida International University · +1 more institution
Abstract
We present several new variations on the theme of nonnegative matrix factorization (NMF). Considering factorizations of the form X=FG(T), we focus on algorithms in which G is restricted to containing nonnegative entries, but allowing the data matrix X to have mixed signs, thus extending the applicable range of NMF methods. We also consider algorithms in which the basis vectors of F are constrained to be convex combinations of the data points. This is used for a kernel extension of NMF. We provide algorithms for computing these new factorizations and we provide supporting theoretical analysis. We also analyze the relationships between our algorithms and clustering algorithms, and consider the implications for…
Citation impact
- FWCI
- 41.80
- Percentile
- 100%
- References
- 51
Authors
3Topics & keywords
- Non-negative matrix factorization
- Computer science
- Cluster analysis
- Matrix decomposition
- Focus (optics)
- Kernel (algebra)
- Matrix (chemical analysis)
- Regular polygon