43 pagesWe consider putting certain tensors into forms with approximately minimum L2 norm. These tensors describe strategies for computing linear or bilinear maps. Such forms are of interest from a practical perspective because they are particularly numerically stable. They are of interest from a theoretical perspective because they may be unique up to certain orthogonal or unitary transformations. The main tensors of interest represent (commutative, real) "matrix multiplication algorithms" or "bilinear algorithms." We explain how an algorithm's L2 minimal form might be thought of as optimally stable and as close to attaining the nuclear norm as possible. We demonstrate an algorithm "Strop" that has minimum L2 norm among all rank 7 algorith...
The canonical polyadic and rank-$(L_r,L_r,1)$ block term decomposition (CPD and BTD, respectively) a...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
Low rank matrix factorization is an important step in many high dimensional machine learning algorit...
AbstractWe wish to answer the following question: p matrices Bi, of the same dimension, being given,...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
AbstractIn this paper we will show that Strassen's algorithm for the computation of the product of 2...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
This electronic version was submitted by the student author. The certified thesis is available in th...
In 1969, V. Strassen improves the classical~2x2 matrix multiplication algorithm. The current upper ...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
The minimum norm of a linear fractional transformation (LFT) over a structured set is computed using...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
Alternating minimization heuristics seek to solve a (difficult) global optimization task through ite...
Abstract. We present a topological framework for ¯nding low-°op algorithms for evalu-ating element s...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
The canonical polyadic and rank-$(L_r,L_r,1)$ block term decomposition (CPD and BTD, respectively) a...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
Low rank matrix factorization is an important step in many high dimensional machine learning algorit...
AbstractWe wish to answer the following question: p matrices Bi, of the same dimension, being given,...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
AbstractIn this paper we will show that Strassen's algorithm for the computation of the product of 2...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
This electronic version was submitted by the student author. The certified thesis is available in th...
In 1969, V. Strassen improves the classical~2x2 matrix multiplication algorithm. The current upper ...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
The minimum norm of a linear fractional transformation (LFT) over a structured set is computed using...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
Alternating minimization heuristics seek to solve a (difficult) global optimization task through ite...
Abstract. We present a topological framework for ¯nding low-°op algorithms for evalu-ating element s...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
The canonical polyadic and rank-$(L_r,L_r,1)$ block term decomposition (CPD and BTD, respectively) a...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
Low rank matrix factorization is an important step in many high dimensional machine learning algorit...