| Description |
1 online resource (390). |
|
text file |
| Series |
De Gruyter Textbook
|
|
De Gruyter textbook.
|
| Summary |
The subject of this book is mathematical cryptography. By this we mean the mathematics involved in cryptographic protocols. As the field has expanded, using both commutative and noncommutative algebraic objects as cryptographic platforms, a book describing and explaining all these mathematical methods is of immeasurable value. |
| Contents |
Frontmatter -- Preface -- Contents -- 1. Basic Ideas of Cryptography -- 2. Symmetric Key Cryptosystems -- 3. Cryptanalysis and Complexity -- 4. Cryptographic Protocols -- 5. Elementary Number Theoretic Techniques -- 6. Some Number Theoretic Algorithms -- 7. Public Key Cryptography -- 8. Elliptic Curve Cryptography -- 9. Basic Concepts from Group Theory -- 10. Non-Commutative Group Based Cryptography -- 11. Platform Groups and Braid Group Cryptography -- 12. Further Applications Using Group Theory -- 13. Commutative Gröbner Basis Methods -- 14. Non-Commutative Gröbner Basis Methods -- 15. Lattice-Based Cryptography -- Bibliography -- Index |
| Local Note |
eBooks on EBSCOhost EBSCO eBook Subscription Academic Collection - North America |
| Subject |
Coding theory -- Textbooks.
|
|
Coding theory. |
|
Textbooks. |
|
Cryptography -- United States.
|
|
Cryptography. |
|
United States. |
| Genre/Form |
Electronic books.
|
|
Textbooks.
|
| ISBN |
3110372770 (electronic book) |
|
9783110372779 (electronic book) |
|
9783110386165 (electronic book) |
|
311038616X (electronic book) |
|
