In the early years of algebraic number theory, different mathematicians built the theory in terms of different objects, and according to different rules, some seeking always to demonstrate that the objects were computable in principle. Later, prominently in the era in which electronic computers were becoming available for academic research, efforts were initiated by some to compute the objects of the theory in practice. By examining writings, research, and correspondence of mathematicians spanning these early and late computational periods, we seek to demonstrate ways in which ideas from the old tradition influenced the new. Among the connections we seek are personal influence on problem selection, and borrowing of computational methods. I...
In this seminal work, Hensel introduces p-adic numbers, using function theoretic methods to study nu...
The central topic of this book is the presentation of the author's principle of arithmetical paraphr...
There are many good reasons to teach a course on a systematic introduction to symbolic methods not o...
AbstractThe development of number theory has been greatly influenced by the use of large scale compu...
Mathematics has been an important intellectual preoccupation of man for a long time. Computer scienc...
This book presents state-of-the-art research and survey articles that highlight work done within the...
Number Theory is a subject that fascinates both professional number-theorists and “recreational ” ma...
This book contains the full text of the letters from Emil Artin to Helmut Hasse, as they are preserv...
The book is aimed at people working in number theory or at least interested in this part of mathemat...
Computation is sure to become one of the most important of the sciences. This is because it is the s...
Number theory is one of the oldest mathematical areas. This is perhaps one of the reasons why there ...
Hardcover, 502 S.: 37,00 €Hardcover, 17x24This book contains the full text of the letters from Emil ...
Most of my research is situated at the interface of algebraic combinatorics, algebraic geometry, rep...
contains a report on the workshop, the abstracts of the talks and the accompanying bibliography. 1 R...
In this seminal work, Hensel introduces p-adic numbers, using function theoretic methods to study nu...
In this seminal work, Hensel introduces p-adic numbers, using function theoretic methods to study nu...
The central topic of this book is the presentation of the author's principle of arithmetical paraphr...
There are many good reasons to teach a course on a systematic introduction to symbolic methods not o...
AbstractThe development of number theory has been greatly influenced by the use of large scale compu...
Mathematics has been an important intellectual preoccupation of man for a long time. Computer scienc...
This book presents state-of-the-art research and survey articles that highlight work done within the...
Number Theory is a subject that fascinates both professional number-theorists and “recreational ” ma...
This book contains the full text of the letters from Emil Artin to Helmut Hasse, as they are preserv...
The book is aimed at people working in number theory or at least interested in this part of mathemat...
Computation is sure to become one of the most important of the sciences. This is because it is the s...
Number theory is one of the oldest mathematical areas. This is perhaps one of the reasons why there ...
Hardcover, 502 S.: 37,00 €Hardcover, 17x24This book contains the full text of the letters from Emil ...
Most of my research is situated at the interface of algebraic combinatorics, algebraic geometry, rep...
contains a report on the workshop, the abstracts of the talks and the accompanying bibliography. 1 R...
In this seminal work, Hensel introduces p-adic numbers, using function theoretic methods to study nu...
In this seminal work, Hensel introduces p-adic numbers, using function theoretic methods to study nu...
The central topic of this book is the presentation of the author's principle of arithmetical paraphr...
There are many good reasons to teach a course on a systematic introduction to symbolic methods not o...