Entanglement, Coherence, and Recursive Linking in Dicke states : A Topological Perspective

Abstract

This work investigates the topological structure of multipartite entanglement in symmetric Dicke states |Dn(k). By viewing qubits as topological loops, we establish a direct correspondence between the recursive measurement dynamics of Dicke states and the stability of n-Hopf links. We utilize the Schmidt rank to quantify bipartite entanglement resilience and introduce the l1-norm of quantum coherence as a measure of link fluidity. We demonstrate that unlike fragile states such as | GHZ (analogous to Borromean rings), Dicke states exhibit a robust, self-similar topology where local measurements preserve the global linking structure through non-vanishing residual coherence.

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