This paper represent an approach to basic arithmetic between abstract matrices, i.e., matrices of symbolic dimension with underspecified components. We define a simple basis function that enables the representation of abstract matrices composed of arbitrary regions in a single term that supports matrix addition and multiplication by regular arithmetic on terms. This can, in particular, be exploited to obtain general arithmetic closure properties for classes of structured matrices. We also describe an approach using alternative basis functions that allow more compact expressions
AbstractFast algorithms for computing the product with a vector are presented for a number of classe...
International audienceIn this paper we study different implementations of finite field arithmetic, e...
Summary. The basic conceptions of matrix algebra are introduced. The matrix is introduced as the fin...
This paper represent an approach to basic arithmetic between abstract matrices, i.e., matrices of sy...
In previous work we heave developed procedures to analyse, compute with and reason about abstract ma...
Matrices are one of the most rapidly advancing fields in the area of mathematics. During the twentie...
What part does algebra play in representing the real world abstractly? How can algebra be used to so...
We show how complex number arithmetic can be performed using matrices for the complex numbers
The objective of this paper is to express a matrix of any dimension in unit vector notation. This is...
AbstractA linear mapping from a finite-dimensional linear space to another has a matrix representati...
International audienceWe present a new static analysis by abstract interpretation to prove automatic...
Abstract. A major obstacle for bridging the gap between textbook mathematics and formalising it on a...
In this paper we study different implementations of finite field arithmetic, essential foundation of...
This thesis is focused on the characteristics of a complete matrix, its application in physical anal...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
AbstractFast algorithms for computing the product with a vector are presented for a number of classe...
International audienceIn this paper we study different implementations of finite field arithmetic, e...
Summary. The basic conceptions of matrix algebra are introduced. The matrix is introduced as the fin...
This paper represent an approach to basic arithmetic between abstract matrices, i.e., matrices of sy...
In previous work we heave developed procedures to analyse, compute with and reason about abstract ma...
Matrices are one of the most rapidly advancing fields in the area of mathematics. During the twentie...
What part does algebra play in representing the real world abstractly? How can algebra be used to so...
We show how complex number arithmetic can be performed using matrices for the complex numbers
The objective of this paper is to express a matrix of any dimension in unit vector notation. This is...
AbstractA linear mapping from a finite-dimensional linear space to another has a matrix representati...
International audienceWe present a new static analysis by abstract interpretation to prove automatic...
Abstract. A major obstacle for bridging the gap between textbook mathematics and formalising it on a...
In this paper we study different implementations of finite field arithmetic, essential foundation of...
This thesis is focused on the characteristics of a complete matrix, its application in physical anal...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
AbstractFast algorithms for computing the product with a vector are presented for a number of classe...
International audienceIn this paper we study different implementations of finite field arithmetic, e...
Summary. The basic conceptions of matrix algebra are introduced. The matrix is introduced as the fin...