Non-Hermitian Computers Need No Complex Numbers
Abstract
In traditional quantum computing, it has been established that real quantum computation augmented with non-Clifford gates is as powerful as universal quantum computation. Here we investigate this phenomenon in the non-Hermitian setting. We show that a non-Hermitian quantum computer equipped with the real gate set H, CCNOT, G, where G = diag(g-1, g) with g > 0 and g ≠ 1, can solve problems in P in polynomial time, matching the capability of its universal non-Hermitian counterpart H, T, CNOT, G. This demonstrates that non-unitarity, rather than universality, is the essential resource, and that complex numbers are unnecessary.
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