Entanglement trimming in stabilizer formalism

Abstract

Suppose in a quantum network, there are n qubits hold by Alice, Bob and Charlie, denoted by systems A, B and C, respectively. We require the qubits to be described by a stabilizer state and assume the system A is entangled with the combined system BC. An interesting question to ask is when it is possible to transfer all the entanglement to system A and B by local operation on C and classical communication to AB, namely entanglement trimming. We find a necessary and sufficient condition and prove constructively for this entanglement trimming, which we name it as "the bigger man principle". This principle is then extended to qudit with square-free dimension and continuous variable stabilizer states.