International audienceTensor decompositions have become a central tool in machine learning to extract interpretable patterns from multiway arrays of data. However, computing the approximate Canonical Polyadic Decomposition (aCPD), one of the most important tensor decomposition model, remains a challenge. In this work, we propose several algorithms based on extrapolation that improve over existing alternating methods for aCPD. We show on several simulated and real data sets that carefully designed extrapolation can significantly improve the convergence speed hence reduce the computational time, especially in difficult scenarios
Tensor methods have emerged as a powerful paradigm for consistent learning of many latent vari-able ...
Tensors may be seen as multidimensional arrays that generalize vectors and matrices to more than two...
International audienceThe Nonnegative Canonical Polyadic Decomposition (NN-CPD) is now widely used i...
International audienceTensor decompositions have become a central tool in machine learning to extrac...
International audienceThe Canonical Polyadic (CP) tensor decomposition has become an attractive mat...
CP) decomposition (CPD) is widely applied to N th-order (N ≥ 3) tensor analysis. Existing CPD method...
The canonical polyadic and rank-$(L_r,L_r,1)$ block term decomposition (CPD and BTD, respectively) a...
International audienceTo deal with large multimodal datasets, coupled canonical polyadic decompositi...
We consider a Canonical Polyadic (CP) decomposition approach to low-rank tensor completion (LRTC) by...
Real-world data exhibiting high order/dimensionality and various couplings are linked to each other...
The Canonical Polyadic (CP) tensor decomposition is frequently used as a model in applications in a ...
© 1994-2012 IEEE. Higher order tensors and their decompositions are well-known tools in signal proce...
© 2015 Society for Industrial and Applied Mathematics. The coupled canonical polyadic decomposition ...
International audienceThe Canonical Polyadic (CP) tensor decomposition has become an attractive math...
International audienceIn this paper we describe an estimator for the canonical polyadic (CP) tensor ...
Tensor methods have emerged as a powerful paradigm for consistent learning of many latent vari-able ...
Tensors may be seen as multidimensional arrays that generalize vectors and matrices to more than two...
International audienceThe Nonnegative Canonical Polyadic Decomposition (NN-CPD) is now widely used i...
International audienceTensor decompositions have become a central tool in machine learning to extrac...
International audienceThe Canonical Polyadic (CP) tensor decomposition has become an attractive mat...
CP) decomposition (CPD) is widely applied to N th-order (N ≥ 3) tensor analysis. Existing CPD method...
The canonical polyadic and rank-$(L_r,L_r,1)$ block term decomposition (CPD and BTD, respectively) a...
International audienceTo deal with large multimodal datasets, coupled canonical polyadic decompositi...
We consider a Canonical Polyadic (CP) decomposition approach to low-rank tensor completion (LRTC) by...
Real-world data exhibiting high order/dimensionality and various couplings are linked to each other...
The Canonical Polyadic (CP) tensor decomposition is frequently used as a model in applications in a ...
© 1994-2012 IEEE. Higher order tensors and their decompositions are well-known tools in signal proce...
© 2015 Society for Industrial and Applied Mathematics. The coupled canonical polyadic decomposition ...
International audienceThe Canonical Polyadic (CP) tensor decomposition has become an attractive math...
International audienceIn this paper we describe an estimator for the canonical polyadic (CP) tensor ...
Tensor methods have emerged as a powerful paradigm for consistent learning of many latent vari-able ...
Tensors may be seen as multidimensional arrays that generalize vectors and matrices to more than two...
International audienceThe Nonnegative Canonical Polyadic Decomposition (NN-CPD) is now widely used i...