A new algorithm converts low-entanglement bosonic Gaussian states to matrix product states in polynomial time without hafnian calculations, yielding speedups on experimental boson sampling data.
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Derives a boson-fermion complementarity identity in linear interferometers that implies a previously unknown relation between |perm(A)|^2 and |det(A)|^2 for complex matrices, extending Muir's 19th-century identity.
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Efficient simulation of low-entanglement bosonic Gaussian states in polynomial time
A new algorithm converts low-entanglement bosonic Gaussian states to matrix product states in polynomial time without hafnian calculations, yielding speedups on experimental boson sampling data.
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Boson-fermion complementarity in a linear interferometer: An identity relating the determinant and permanent of a matrix
Derives a boson-fermion complementarity identity in linear interferometers that implies a previously unknown relation between |perm(A)|^2 and |det(A)|^2 for complex matrices, extending Muir's 19th-century identity.