Add to ORKGWe propose a nonnegative tensor decomposition with focusing on the relationship between the modes of tensors. Traditional decomposition methods assume low-rankness in the representation, resulting in difficulties in global optimization and target rank selection. To address these problems, we present an alternative way to decompose tensors, a many-body approximation for tensors, based on an information geometric formulation. A tensor is treated via an energy-based model, where the tensor and its mode correspond to a probability distribution and a random variable, respectively, and many-body approximation is performed on it by taking the interaction between variables into account. Our model can be globally optimized in polynomial time in term...
more details in : hal-00490248The Canonical Polyadic (CP) decomposition of a tensor is difficult to ...
States of quantum many-body systems are defined in a high-dimensional Hilbert space, where rich and ...
Les tenseurs sont une généralisation d'ordre supérieur des matrices. Ils apparaissent dans une myria...
In applications, one rarely works with tensors that admit an exact low-rank tensor decomposition due...
A tensor network is a type of decomposition used to express and approximate large arrays of data. A ...
Modern applications in engineering and data science are increasingly based on multidimensional data ...
Higher-order tensors and their decompositions are abundantly present in domains such as signal proce...
Multidimensional data, or tensors, arise natura lly in data analysis applications. Hitchcock&##39;s ...
Low-rank tensor approximation approaches have become an important tool in the scientific computing c...
What is the connection of tensor decomposition in multilinear algebra with exponential analysis from...
What is the connection of tensor decomposition in multilinear algebra with exponential analysis from...
The tensor rank decomposition is a decomposition of a tensor into a linear combination of rank-1 ten...
One of the main issues in computing a tensor decomposition is how to choose the number of rank-one c...
It is well known that tensor network regression models operate on an exponentially large feature spa...
© 2019 Society for Industrial and Applied Mathematics Decomposing tensors into simple terms is often...
more details in : hal-00490248The Canonical Polyadic (CP) decomposition of a tensor is difficult to ...
States of quantum many-body systems are defined in a high-dimensional Hilbert space, where rich and ...
Les tenseurs sont une généralisation d'ordre supérieur des matrices. Ils apparaissent dans une myria...
In applications, one rarely works with tensors that admit an exact low-rank tensor decomposition due...
A tensor network is a type of decomposition used to express and approximate large arrays of data. A ...
Modern applications in engineering and data science are increasingly based on multidimensional data ...
Higher-order tensors and their decompositions are abundantly present in domains such as signal proce...
Multidimensional data, or tensors, arise natura lly in data analysis applications. Hitchcock&##39;s ...
Low-rank tensor approximation approaches have become an important tool in the scientific computing c...
What is the connection of tensor decomposition in multilinear algebra with exponential analysis from...
What is the connection of tensor decomposition in multilinear algebra with exponential analysis from...
The tensor rank decomposition is a decomposition of a tensor into a linear combination of rank-1 ten...
One of the main issues in computing a tensor decomposition is how to choose the number of rank-one c...
It is well known that tensor network regression models operate on an exponentially large feature spa...
© 2019 Society for Industrial and Applied Mathematics Decomposing tensors into simple terms is often...
more details in : hal-00490248The Canonical Polyadic (CP) decomposition of a tensor is difficult to ...
States of quantum many-body systems are defined in a high-dimensional Hilbert space, where rich and ...
Les tenseurs sont une généralisation d'ordre supérieur des matrices. Ils apparaissent dans une myria...