Please use this identifier to cite or link to this item:
http://archive.cmb.ac.lk:8080/xmlui/handle/70130/7205
Title: | An optimization approach for the discrete logarithm problem |
Authors: | Jayasinghe, Youvin |
Keywords: | Cryptography, Quantum computing, Optimization |
Issue Date: | 2022 |
Series/Report no.: | Computational Mathematics Collection;RR1 |
Abstract: | The discrete logarithm problem has remained challenging to tackle, resulting in its wide use in cryptography. The only proven way to solve the problem in polynomial time is through Shor’s algorithm, which runs on quantum computers, but present-day quantum com- puters are subjected to quantum errors when implementing Shor’s algorithm. However, quantum annealers such as the D-Wave ma- chine have come a long way. Further, another problem similar to the discrete logarithm problem, the prime factoring problem, has shown much progress on quantum annealers. In this context, it is encour- aging to see the tractability of the discrete logarithm problem on quantum annealers. Further, the problem is scarcely attempted as an optimization. In this work, we have represented a conversion of the discrete loga- rithm problem over the multiplicative group integer modulo and the elliptic curve discrete logarithm problem to an optimization problem, then to a binary quadratic form accepted by quantum annealers. Fur- ther, we tested our formulation for small scale problems successfully and discussed the complexities suggesting areas of improvement. |
URI: | http://archive.cmb.ac.lk:8080/xmlui/handle/70130/7205 |
Appears in Collections: | Centre for Mathematical Modelling |
Files in This Item:
File | Description | Size | Format | |
---|---|---|---|---|
Youvin Thesis CM.pdf | 734.12 kB | Adobe PDF | View/Open |
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.