Revolutionizing Quantum Factoring: Insights into Jacobi Circuits & Future Developments ๐
Explore the latest advancements in quantum factoring, including the Jacobi factoring circuit and emerging techniques, with MIT's Greg Kahanamoku-Meyer. Discover how these innovations are shaping the future of quantum algorithms and complexity.
Simons Institute for the Theory of Computing
158 views โข Jun 18, 2025
About this video
Greg Kahanamoku-Meyer (MIT)
https://simons.berkeley.edu/talks/greg-kahanamoku-meyer-mit-2025-05-27
Quantum Algorithms, Complexity, and Fault Tolerance Reunion
Since Shor published his famous algorithm 30 years ago, it has seemed that integer factorization requires relatively large quantum circuits, and thus will be a medium- to long-term application of quantum computing. But just in the past year or two, the cost landscape for integer factorization has changed dramatically. The main focus of this talk will be the Jacobi factoring circuit, which factors integers of the form N=P^2 Q in a qubit count and depth roughly proportional to O(log Q). For appropriately chosen parameters, we argue that this circuit may actually provide the first efficiently verifiable proof of quantumness. Given sufficient time I will also survey an array of other very recent results improving the circuit costs for integer factorization, including circuits applicable to RSA integers of the form N=PQ.
https://simons.berkeley.edu/talks/greg-kahanamoku-meyer-mit-2025-05-27
Quantum Algorithms, Complexity, and Fault Tolerance Reunion
Since Shor published his famous algorithm 30 years ago, it has seemed that integer factorization requires relatively large quantum circuits, and thus will be a medium- to long-term application of quantum computing. But just in the past year or two, the cost landscape for integer factorization has changed dramatically. The main focus of this talk will be the Jacobi factoring circuit, which factors integers of the form N=P^2 Q in a qubit count and depth roughly proportional to O(log Q). For appropriately chosen parameters, we argue that this circuit may actually provide the first efficiently verifiable proof of quantumness. Given sufficient time I will also survey an array of other very recent results improving the circuit costs for integer factorization, including circuits applicable to RSA integers of the form N=PQ.
Tags and Topics
Browse our collection to discover more content in these categories.
Video Information
Views
158
Likes
1
Duration
01:07:31
Published
Jun 18, 2025
Related Trending Topics
LIVE TRENDSRelated trending topics. Click any trend to explore more videos.