HIGHLIGHTS
- who: M. Charina from the University of Vienna, Vienna, Austria have published the Article: Regularity of non-stationary subdivision: a matrix approach, in the Journal: (JOURNAL)
- what: The authors provide a general, unifying method for convergence and regularity analysis of multivariate non-stationary, i.e. level-dependent, subdivision schemes with an integer dilation matrix M whose eigenvalues are all larger than 1 in the absolute value. The authors show that the joint spectral radius techniques are applicable for all non-stationary schemes that satisfy two mild assumptions: all level-dependent masks have the same bounded . . .
If you want to have access to all the content you need to log in!
Thanks :)
If you don't have an account, you can create one here.