This thesis studies the formalisation and execution of Linear Algebra algorithms in Isabelle/HOL, an interactive theorem prover. The work is based on the HOL Multivariate Analysis library, whose matrix representation has been refined to datatypes that admit a representation in functional programming languages. This enables the generation of programs from such verified algorithms. In particular, several well-known Linear Algebra algorithms have been formalised involving both the computation of matrix canonical forms and decompositions (such as the Gauss-Jordan algorithm, echelon form, Hermite normal form, and QR decomposition). The formalisation of these algorithms is also accompanied by the formal proofs of their particular applications suc...
© Springer International Publishing Switzerland 2016. All rights reserved. This book presents the ma...
This book discusses the formalization of mathematical theories centering on complex analysis and mat...
We consider the problem of developing formally correct dense linear algebra libraries. The problem w...
This thesis studies the formalisation and execution of Linear Algebra algorithms in Isabelle/HOL, an...
This thesis discusses the formalization of basic results from linear algebra up to\ud the following ...
As verification efforts using interactive theorem proving grow, we are in need of certified algorith...
Les méthodes formelles ont atteint un degré de maturité conduisant à la conception de systèmes de pr...
Formal methods have reached a degree of maturity leading to the design of general-purpose proof syst...
Linear programming is a basic mathematical technique for optimizing a linear function on a domain th...
This work presents formal correctness proofs in Isabelle/HOL of algorithms to transform a matrix int...
In this contribution, we present a formalization of the well-known Gauss-Jordan algorithm. It states...
This work presents a formal proof in Isabelle/HOL of an algorithm to transform a matrix into its Smi...
Abstract In this document we present a new approach to developing sequential and parallel dense line...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
Isabelle/HOL is a generic proof assistant. Using Isabelle/HOL requires insight into procedures as we...
© Springer International Publishing Switzerland 2016. All rights reserved. This book presents the ma...
This book discusses the formalization of mathematical theories centering on complex analysis and mat...
We consider the problem of developing formally correct dense linear algebra libraries. The problem w...
This thesis studies the formalisation and execution of Linear Algebra algorithms in Isabelle/HOL, an...
This thesis discusses the formalization of basic results from linear algebra up to\ud the following ...
As verification efforts using interactive theorem proving grow, we are in need of certified algorith...
Les méthodes formelles ont atteint un degré de maturité conduisant à la conception de systèmes de pr...
Formal methods have reached a degree of maturity leading to the design of general-purpose proof syst...
Linear programming is a basic mathematical technique for optimizing a linear function on a domain th...
This work presents formal correctness proofs in Isabelle/HOL of algorithms to transform a matrix int...
In this contribution, we present a formalization of the well-known Gauss-Jordan algorithm. It states...
This work presents a formal proof in Isabelle/HOL of an algorithm to transform a matrix into its Smi...
Abstract In this document we present a new approach to developing sequential and parallel dense line...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
Isabelle/HOL is a generic proof assistant. Using Isabelle/HOL requires insight into procedures as we...
© Springer International Publishing Switzerland 2016. All rights reserved. This book presents the ma...
This book discusses the formalization of mathematical theories centering on complex analysis and mat...
We consider the problem of developing formally correct dense linear algebra libraries. The problem w...