Number Theory with Applications to Cryptography takes into account
the application of number theory in the field of cryptography. It
comprises elementary methods of Diophantine equations, the basic
theorem of arithmetic and the Riemann Zeta function. This book also
discusses about Congruences and their use in mock theta functions,
Method of Iterative Sliding Window for Shorter Number of Operations
in case of Modular Exponentiation and Scalar Multiplication,
Discrete log problem, elliptic curves, matrices and public-key
cryptography and Implementation of Pollard Rho over binary fields
using Brent Cycle Detection Algorithm. It also provides the reader
with the significant insights of number theory to the practice of
cryptography in order to understand discrete log problem, matrices,
elliptic curves and public-key cryptography and the applications of
Fibonacci sequence on continued fractions.
General
| Imprint: |
Arcler Education Inc
|
| Country of origin: |
Canada |
| Release date: |
November 2019 |
| First published: |
2019 |
| Editors: |
Stefano Spezia
|
| Dimensions: |
229 x 152mm (L x W) |
| Format: |
Hardcover
|
| Pages: |
290 |
| ISBN-13: |
978-1-77407-351-3 |
| Categories: |
Books >
Science & Mathematics >
Mathematics >
General
|
| LSN: |
1-77407-351-X |
| Barcode: |
9781774073513 |
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