Neural Collapse with Cross-Entropy Loss
Publication
, Journal Article
Lu, J; Steinerberger, S
December 15, 2020
We consider the variational problem of cross-entropy loss with $n$ feature vectors on a unit hypersphere in $\mathbb{R}^d$. We prove that when $d \geq n - 1$, the global minimum is given by the simplex equiangular tight frame, which justifies the neural collapse behavior. We also prove that as $n \rightarrow \infty$ with fixed $d$, the minimizing points will distribute uniformly on the hypersphere and show a connection with the frame potential of Benedetto & Fickus.
Duke Scholars
Publication Date
December 15, 2020
Citation
APA
Chicago
ICMJE
MLA
NLM
Lu, J., & Steinerberger, S. (2020). Neural Collapse with Cross-Entropy Loss.
Lu, Jianfeng, and Stefan Steinerberger. “Neural Collapse with Cross-Entropy Loss,” December 15, 2020.
Lu J, Steinerberger S. Neural Collapse with Cross-Entropy Loss. 2020 Dec 15;
Lu, Jianfeng, and Stefan Steinerberger. Neural Collapse with Cross-Entropy Loss. Dec. 2020.
Lu J, Steinerberger S. Neural Collapse with Cross-Entropy Loss. 2020 Dec 15;
Publication Date
December 15, 2020