We introduce the notion of maximally multipartite entangled states of n qubits as a generalization of the bipartite case. These pure states have a bipartite entanglement that does not depend on the bipartition and is maximal for all possible bipartitions. They are solutions of a minimization problem. Examples for small n are investigated, both analytically and numerically
Heterogeneous bipartite quantum pure states, composed of two subsystems with a different number of l...
A pure multipartite quantum state is called absolutely maximally entangled (AME), if all reductions ...
As already known by Rana’s result, all eigenvalues of any partial-transposed bipartite state fall wi...
We introduce the notion of maximally multipartite entangled states of n qubits as a generalization o...
We introduce the notion of maximally multipartite entangled states of n qubits as a generalization o...
We introduce a potential of multipartite entanglement for a system of n qubits, as the average over ...
We characterize the multipartite entanglement of a system of n qubits in terms of the distribution f...
We characterize the multipartite entanglement of a system of n qubits in terms of the distribution f...
We study maximally multipartite-entangled states in the context of Gaussian continuous variable quan...
We study maximally multipartite-entangled states in the context of Gaussian continuous variable quan...
We characterize the multipartite entanglement of a system of n qubits in terms of the distribution f...
We investigate multipartite entanglement for composite quantum systems in a pure state. Using the ge...
We present a simple numerical optimization procedure to search for highly entangled states of 2, 3, ...
A necessary and sufficient condition for the maximal entanglement of bipartite nonorthogonal pure st...
A pure quantum state of N subsystems with d levels each is called k-multipartite maximally entangled...
Heterogeneous bipartite quantum pure states, composed of two subsystems with a different number of l...
A pure multipartite quantum state is called absolutely maximally entangled (AME), if all reductions ...
As already known by Rana’s result, all eigenvalues of any partial-transposed bipartite state fall wi...
We introduce the notion of maximally multipartite entangled states of n qubits as a generalization o...
We introduce the notion of maximally multipartite entangled states of n qubits as a generalization o...
We introduce a potential of multipartite entanglement for a system of n qubits, as the average over ...
We characterize the multipartite entanglement of a system of n qubits in terms of the distribution f...
We characterize the multipartite entanglement of a system of n qubits in terms of the distribution f...
We study maximally multipartite-entangled states in the context of Gaussian continuous variable quan...
We study maximally multipartite-entangled states in the context of Gaussian continuous variable quan...
We characterize the multipartite entanglement of a system of n qubits in terms of the distribution f...
We investigate multipartite entanglement for composite quantum systems in a pure state. Using the ge...
We present a simple numerical optimization procedure to search for highly entangled states of 2, 3, ...
A necessary and sufficient condition for the maximal entanglement of bipartite nonorthogonal pure st...
A pure quantum state of N subsystems with d levels each is called k-multipartite maximally entangled...
Heterogeneous bipartite quantum pure states, composed of two subsystems with a different number of l...
A pure multipartite quantum state is called absolutely maximally entangled (AME), if all reductions ...
As already known by Rana’s result, all eigenvalues of any partial-transposed bipartite state fall wi...
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