Alwin Stegeman
Alwin Stegeman
Psychometrics & Statistics, University of Groningen
Verified email at - Homepage
Cited by
Cited by
Is network traffic appriximated by stable lvy motion or fractional brownian motion?
T Mikosch, S Resnick, H Rootzn, A Stegeman
The annals of applied probability 12 (1), 23-68, 2002
On Kruskal’s uniqueness condition for the Candecomp/Parafac decomposition
A Stegeman, ND Sidiropoulos
Linear Algebra and its applications 420 (2-3), 540-552, 2007
Crop succession requirements in agricultural production planning
WKK Haneveld, AW Stegeman
European journal of operational research 166 (2), 406-429, 2005
On the non-existence of optimal solutions and the occurrence of “degeneracy” in the Candecomp/Parafac model
WP Krijnen, TK Dijkstra, A Stegeman
Psychometrika 73 (3), 431-439, 2008
Degeneracy in Candecomp/Parafac explained for p p 2 arrays of rank p + 1 or higher
A Stegeman
Psychometrika 71 (3), 483, 2006
Sufficient conditions for uniqueness in Candecomp/Parafac and Indscal with random component matrices
A Stegeman, JMF Ten Berge, L De Lathauwer
Psychometrika 71 (2), 219-229, 2006
Degeneracy in Candecomp/Parafac and Indscal explained for several three-sliced arrays with a two-valued typical rank
A Stegeman
Psychometrika 72 (4), 601-619, 2007
Subtracting a best rank-1 approximation may increase tensor rank
A Stegeman, P Comon
Linear Algebra and its Applications 433 (7), 1276-1300, 2010
Low-rank approximation of generic p\timesq\times2 arrays and diverging components in the candecomp/parafac model
A Stegeman
SIAM Journal on Matrix Analysis and Applications 30 (3), 988-1007, 2008
On uniqueness conditions for Candecomp/Parafac and Indscal with full column rank in one mode
A Stegeman
Linear Algebra and its Applications 431 (1-2), 211-227, 2009
A Method to Avoid Diverging Components in the Candecomp/Parafac Model for Generic I\timesJ\times2 Arrays
A Stegeman, L De Lathauwer
SIAM Journal on Matrix Analysis and Applications 30 (4), 1614-1638, 2009
Candecomp/Parafac: From diverging components to a decomposition in block terms
A Stegeman
SIAM Journal on Matrix Analysis and Applications 33 (2), 291-316, 2012
Uni-mode and partial uniqueness conditions for CANDECOMP/PARAFAC of three-way arrays with linearly dependent loadings
X Guo, S Miron, D Brie, A Stegeman
SIAM Journal on Matrix Analysis and Applications 33 (1), 111-129, 2012
On Uniqueness of the nth Order Tensor Decomposition into Rank-1 Terms with Linear Independence in One Mode
A Stegeman
SIAM Journal on Matrix Analysis and Applications 31 (5), 2498-2516, 2010
Using the simultaneous generalized Schur decomposition as a Candecomp/Parafac algorithm for ill‐conditioned data
A Stegeman
Journal of Chemometrics: A Journal of the Chemometrics Society 23 (7‐8), 385-392, 2009
Belief in a just what? Demystifying just world beliefs by distinguishing sources of justice
K Stroebe, T Postmes, S Tuber, A Stegeman, MS John
PloS one 10 (3), e0120145, 2015
Uniqueness conditions for constrained three-way factor decompositions with linearly dependent loadings
A Stegeman, ALF De Almeida
SIAM Journal on Matrix Analysis and Applications 31 (3), 1469-1490, 2010
Finding the limit of diverging components in three-way Candecomp/Parafac—A demonstration of its practical merits
A Stegeman
Computational Statistics & Data Analysis 75, 203-216, 2014
A three-way Jordan canonical form as limit of low-rank tensor approximations
A Stegeman
SIAM Journal on Matrix Analysis and Applications 34 (2), 624-650, 2013
Comparing independent component analysis and the parafac model for artificial multi-subject fmri data
A Stegeman
Unpublished Technical Report, Univ. of Groeningen, 2007
The system can't perform the operation now. Try again later.
Articles 1–20