The overall topic of the volume, Mathematics for Computation (M4C), is mathematics taking crucially into account the aspect of computation, investigating the interaction of mathematics with computation, bridging the gap between mathematics and computation wherever desirable and possible, and otherwise explaining why not. Recently, abstract mathematics has proved to have more computational content than ever expected. Indeed, the axiomatic method, originally intended to do away with concrete computations, seems to suit surprisingly well the programs-from-proofs paradigm, with abstraction helping not only clarity but also efficiency. Unlike computational mathematics, which rather focusses on objects of computational nature such as algori...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
A more extensive and theoretical treatment of the material in 6.045J/18.400J, emphasizing computabil...
We examine the relationship between proof and computation in mathematics, especially in formalized m...
The overall topic of the volume, Mathematics for Computation (M4C), is mathematics taking crucially ...
This book is for graduate students and researchers, introducing modern foundational research in math...
Computation is sure to become one of the most important of the sciences. This is because it is the s...
About a century ago Hilbert initiated his program to secure the foundations of mathematics and to es...
Most of my research is situated at the interface of algebraic combinatorics, algebraic geometry, rep...
This talk shall discuss the potential impact of formal methods, and in particular, of interactive th...
In recent years, classical computability has expanded beyond its original scope to address issues re...
Now you can clearly present even the most complex computational theory topics to your students with ...
Number theory and algebra play an increasingly significant role in computing and communications, as ...
The notion of computation is well understood, and well formalized, in the classical context of digit...
The interesting feature of this book is its organization and structure. That consists of systematizi...
This book is a collection of invited and reviewed chapters on state-of-the-art developments in inter...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
A more extensive and theoretical treatment of the material in 6.045J/18.400J, emphasizing computabil...
We examine the relationship between proof and computation in mathematics, especially in formalized m...
The overall topic of the volume, Mathematics for Computation (M4C), is mathematics taking crucially ...
This book is for graduate students and researchers, introducing modern foundational research in math...
Computation is sure to become one of the most important of the sciences. This is because it is the s...
About a century ago Hilbert initiated his program to secure the foundations of mathematics and to es...
Most of my research is situated at the interface of algebraic combinatorics, algebraic geometry, rep...
This talk shall discuss the potential impact of formal methods, and in particular, of interactive th...
In recent years, classical computability has expanded beyond its original scope to address issues re...
Now you can clearly present even the most complex computational theory topics to your students with ...
Number theory and algebra play an increasingly significant role in computing and communications, as ...
The notion of computation is well understood, and well formalized, in the classical context of digit...
The interesting feature of this book is its organization and structure. That consists of systematizi...
This book is a collection of invited and reviewed chapters on state-of-the-art developments in inter...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
A more extensive and theoretical treatment of the material in 6.045J/18.400J, emphasizing computabil...
We examine the relationship between proof and computation in mathematics, especially in formalized m...