Graphs States and the necessity of Euler Decomposition
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Coecke and Duncan recently introduced a categorical formalisation of the interaction of complementary quantum observables. In this paper we use their diagrammatic language to study graph states, a computationally interesting class of quantum states. We give a graphical proof of the fixpoint property of graph states. We then introduce a new equation, for the Euler decomposition of the Hadamard gate, and demonstrate that Van den Nest's theorem--locally equivalent graphs represent the same entanglement--is equivalent to this new axiom. Finally we prove that the Euler decomposition equation is not derivable from the existing axioms.
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Completeness of qufinite ZXW calculus, a graphical language for finite-dimensional quantum theory
The qufinite ZXW calculus is complete for the category FHilb of finite-dimensional Hilbert spaces, as any diagram rewrites to a unique normal form.
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