Abstract. The use of computer algebra is usually considered beneficial for mechanised reasoning in mathematical domains. We present a case study, in the application domain of coding theory, that supports this claim: the mechanised proofs depend on non-trivial algorithms from computer algebra and increase the reasoning power of the theorem prover. The unsoundness of computer algebra systems is a major problem in interfacing them to theorem provers. Our approach to obtaining a sound overall system is not blanket distrust but based on the distinction between algorithms we call sound and ad hoc respectively. This distinction is blurred in most computer algebra systems. Our experimental interface therefore uses a computer algebra library. It is ...
This talk shall discuss the potential impact of formal methods, and in particular, of interactive th...
This article examines the idea of ‘following the flow of a proof with an example ’ in order to assis...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
Abstract. The use of computer algebra is usually considered beneficial for mechanised reasoning in m...
. Mechanised reasoning systems and computer algebra systems have different objectives. Their integra...
Mechanised reasoning systems and computer algebra systems have apparentlydifferent objectives. Their...
In this paper we describe an environment for reasoning about the reals which combines the rigour of ...
Mathematical induction is one of the major proof techniques taught to mathematics students in the fi...
The extensive use of computers in mathematics and engineering has led to an increased demand for rel...
We present a prototype of a computer algebra system that is built on top of a proof assistant, HOL L...
We show that current computer algebra systems are not suitable for use in proof checking, because th...
Why do we need a formalization of the notion of algorithm or effective computation? In order to show...
Coding theory and cryptography allow secure and reliable data transmission, which is at the heart of...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
Mathematical induction is one of the major proof techniques taught to mathematics students in the fi...
This talk shall discuss the potential impact of formal methods, and in particular, of interactive th...
This article examines the idea of ‘following the flow of a proof with an example ’ in order to assis...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
Abstract. The use of computer algebra is usually considered beneficial for mechanised reasoning in m...
. Mechanised reasoning systems and computer algebra systems have different objectives. Their integra...
Mechanised reasoning systems and computer algebra systems have apparentlydifferent objectives. Their...
In this paper we describe an environment for reasoning about the reals which combines the rigour of ...
Mathematical induction is one of the major proof techniques taught to mathematics students in the fi...
The extensive use of computers in mathematics and engineering has led to an increased demand for rel...
We present a prototype of a computer algebra system that is built on top of a proof assistant, HOL L...
We show that current computer algebra systems are not suitable for use in proof checking, because th...
Why do we need a formalization of the notion of algorithm or effective computation? In order to show...
Coding theory and cryptography allow secure and reliable data transmission, which is at the heart of...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
Mathematical induction is one of the major proof techniques taught to mathematics students in the fi...
This talk shall discuss the potential impact of formal methods, and in particular, of interactive th...
This article examines the idea of ‘following the flow of a proof with an example ’ in order to assis...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...