A Near-Quadratic Lower Bound for the Size of Quantum Circuits of Constant Treewidth

Abstract

We show that any quantum circuit of treewidth t, built from r-qubit gates, requires at least (n22O(r· t)· 4 n) gates to compute the element distinctness function. Our result generalizes a near-quadratic lower bound for quantum formula size obtained by Roychowdhury and Vatan [SIAM J. on Computing, 2001]. The proof of our lower bound follows by an extension of Neciporuk's method to the context of quantum circuits of constant treewidth. This extension is made via a combination of techniques from structural graph theory, tensor-network theory, and the connected-component counting method, which is a classic tool in algebraic geometry.