Abstract
The well-known polar decomposition theorem is analyzed for the case of second-order, singular tensors on ℝ3. A precise analytical and geometric characterization of the split is provided for tensors of rank two and one.
The well-known polar decomposition theorem is analyzed for the case of second-order, singular tensors on ℝ3. A precise analytical and geometric characterization of the split is provided for tensors of rank two and one.
Copyright © Institute of Fundamental Technological Research
Polish Academy of Sciences except certain content
provided by third parties.
Archives of Mechanics
Institute of Fundamental Technological Research
Pawińskiego 5B, 02-106 Warsaw, Poland
Michał Kursa
Email: archmech-support@ippt.pan.pl