Relationship between the n-tangle and the residual entanglement of even n qubits

Abstract

We show that n-tangle, the generalization of the 3-tangle to even n qubits, is the square of the SLOCC polynomial invariant of degree 2. We find that the n-tangle is not the residual entanglement for any even n≥ 4\ qubits. We give a necessary and sufficient condition for the vanishing of the concurrence C1(2...n). The condition implies that the concurrence % C1(2...n) is always positive for any entangled states while the n% -tangle vanishes for some entangled states. We argue that for even n\ qubits, the concurrence C1(2...n)\ is equal to or greater than the n% -tangle. Further,\ we reveal that the residual entanglement is a partial measure for product states of any n qubits while the n-tangle is multiplicative for some product states.