Welcome to H3 Maths

Blog Support for Growing Mathematicians

You can’t build these gates with Lego!


Researchers at Oxford University have set a new speed record for the ‘logic gates’ that form the building blocks of quantum computing – a technology that has  the potential to dwarf the processing power of today’s classical computers.

The Oxford team is using a trapped-ion technique to develop its computer, in which logic gates place two charged atoms – containing information in the form of quantum bits, or qubits – in a state of quantum entanglement.

Described by Einstein as ‘spooky’, entanglement means that the properties of the two atoms stay linked, even when they are separated by great distances. The research builds on previous work in which the team, led by Professor David Lucas and Professor Andrew Steane (above) of Oxford’s Department of Physics, achieved a world record for the precision of the logic gate, reaching the demanding accuracy set by theoretical models of quantum computing.

The lead authors of the paper are Oxford doctoral student Vera Schäfer, and Dr Chris Ballance, a research fellow at Magdalen College, Oxford.

Vera Schäfer said: ‘Quantum computing will be ideally suited for tasks such as factorising large numbers or simulating complex reactions between molecules to help with drug development. Previous work in our group produced quantum logic gates with record-breaking precision. We then began work on increasing the speed of those gates without compromising their accuracy, which is tricky.

‘Trapped ions move like a pendulum during the gate operation, but when this process is sped up they become sensitive to a number of factors that cause errors.

‘By making use of a technique that precisely shapes the force on the ions such that the gate performance becomes robust to these factors, we were able to increase the speed by a factor of 20 to 60 compared with the previous best gates – 1.6 microseconds long, with 99.8% precision. [One microsecond is to one second as one second is to 11.574 days]

‘We have now produced the highest fidelity and the fastest gate, reaching a point where our gates are in principle good enough for quantum computing. The next step is to think about it in practical terms and work towards scaling up our system to create a viable quantum computer.’

by posted under Uncategorized | Comments Off on You can’t build these gates with Lego!    

Comments are closed.

Post Support

NCEA Level 2 Algebra Problem. Using the information given, the shaded area = 9, that is:
y(y-8) = 9 –> y.y – 8y – 9 =0
–> (y-9)(y+1) = 0, therefore y = 9 (can’t have a distance of – 1 for the other solution for y)
Using the top and bottom of the rectangle,
x = (y-8)(y+2) = (9-8)(9+2) = 11
but, the left side = (x-4) = 11-4 = 7, but rhs = y+? = 9+?, which is greater than the value of the opp. side??
[I think that the left had side was a mistake and should have read (x+4)?]

H3 Viewers

Skip to toolbar