Tree-size complexity of multiqubit states

Abstract

Complexity is often invoked alongside size and mass as a characteristic of macroscopic quantum objects. In 2004, Aaronson introduced the tree size (TS) as a computable measure of complexity and studied its basic properties. In this paper, we improve and expand on those initial results. In particular, we give explicit characterizations of a family of states with superpolynomial complexity n( n)= TS =O(n!) in the number of qubits n; and we show that any matrix-product state whose tensors are of dimension D× D has polynomial complexity TS=O(n2 2D).