Matrix-weighted Besov–Triebel–Lizorkin spaces of optimal scale: Real-variable characterizations, invariance on integrable index, and Sobolev-type embedding | Synapse
March 3, 2026
Matrix-weighted Besov–Triebel–Lizorkin spaces of optimal scale: Real-variable characterizations, invariance on integrable index, and Sobolev-type embedding
Puntos clave
Matrix-weighted Besov and Triebel-Lizorkin spaces provide a new framework for analysis, focusing on optimal scale.
Key properties include real-variable characterizations and invariance related to the integrable index.
The study highlights Sobolev-type embeddings, emphasizing their role in function space theory.
These findings suggest deeper relationships between various functional spaces, opening new theoretical pathways.