Unit name | Quantum Computation |
---|---|
Unit code | MATHM0023 |
Credit points | 10 |
Level of study | M/7 |
Teaching block(s) |
Teaching Block 2C (weeks 13 - 18) |
Unit director | Professor. Linden |
Open unit status | Not open |
Pre-requisites |
MATHM5610 Quantum Information Theory |
Co-requisites |
None |
School/department | School of Mathematics |
Faculty | Faculty of Science |
Unit Aims
The unit will enable the student to understand and appreciate the concepts behind the model of quantum computation, key quantum algorithms and their applications, at a suitable level of mathematical rigour. It will also encompass theoretical subjects that are relevant to implementations of quantum computation. The unit will include topics that are currently the subject of active research and should provide suitably able and inclined students with the necessary background for postgraduate study in the field.
Unit Description
Quantum computers are machines that are designed to use the principles of quantum mechanics to do things that cannot be done by any standard computer based only on classical physics. This unit will introduce the emerging theory of quantum computation, which has many remarkable features compared with classical computation. The unit will cover some of the most important quantum algorithms currently known, which outperform classical algorithms for tasks ranging from factorising large integers to simulating large quantum-mechanical systems.
Relation to Other Units
This unit is a natural partner and successor to MATHM5610 Quantum Information Theory, which is its only prerequisite. It is likely to be of interest to students from Mathematics, Physics and Computer Science who have an interest in quantum information or the theory of computation.
At the end of the unit, a successful student will be able to:
- solve computational problems posed within the quantum computing model - apply some key quantum algorithms and prove their correctness - analyse the behaviour of previously unseen quantum circuits, algorithms and protocols - develop simple new quantum algorithmsTransferrable skills:
- Problem-solving techniques. - Rigorous mathematical thinking about computation. - The ability to assimilate and synthesize complex and novel ideas from a wide variety of areas of science.The unit will be taught through a combination of
Formative assessment is through problem sheets discussed in problem classes. Summative assessment is through a 1.5-hour written exam (100%).
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