We develop a convenient framework for characterizing multipartite entanglement in composite systems, based on relations between entropies of various subsystems. This continues the program initiated in [1], of using holography to effectively recast the geometric problem into an algebraic one. We prove that, for an arbitrary number of parties, our procedure identifies a finite set of entropic information quantities that we conveniently represent geometrically in the form of an arrangement of hyperplanes. This leads us to define the holographic entropy arrangement, whose algebraic and combinatorial aspects we explore in detail. Using the framework, we derive three new information quantities for four parties, as well as a new infinite family fo...
Abstract: Ryu and Takayanagi conjectured a formula for the entanglement (von Neumann) entropy of an ...
We introduce a new quantity, called pseudo-entropy, as a generalization of entanglement entropy via ...
We extend our studies of holographic entropy inequalities to gapped phases of matter. For any number...
We develop a convenient framework for characterizing multipartite entanglement in composite systems,...
We develop a framework for the derivation of new information theoretic quantities which are natural ...
The holographic entropy cone characterizes the relations between entanglement entropies for a spatia...
We review the developments in the past decade on holographic entanglement entropy, a subject that ha...
We initiate a systematic enumeration and classification of entropy inequalities satisfied by the Ryu...
We initiate a systematic enumeration and classification of entropy inequalities satisfied by the Ryu...
Abstract We introduce a new information-theoretic measure of multipartite correlations Δ P , by gene...
The celebrated holographic entanglement entropy triggered investigations on the connections between ...
Abstract In this paper, we systematically study the measures of multi-partite entanglement with the ...
Abstract: We consider the entanglement entropy for holographic field theories in finite volume. We s...
The holographic entropy cone identifies entanglement entropies of field theory regions, which are co...
The domain of allowed von Neumann entropies of a holographic field theory carves out a polyhedral co...
Abstract: Ryu and Takayanagi conjectured a formula for the entanglement (von Neumann) entropy of an ...
We introduce a new quantity, called pseudo-entropy, as a generalization of entanglement entropy via ...
We extend our studies of holographic entropy inequalities to gapped phases of matter. For any number...
We develop a convenient framework for characterizing multipartite entanglement in composite systems,...
We develop a framework for the derivation of new information theoretic quantities which are natural ...
The holographic entropy cone characterizes the relations between entanglement entropies for a spatia...
We review the developments in the past decade on holographic entanglement entropy, a subject that ha...
We initiate a systematic enumeration and classification of entropy inequalities satisfied by the Ryu...
We initiate a systematic enumeration and classification of entropy inequalities satisfied by the Ryu...
Abstract We introduce a new information-theoretic measure of multipartite correlations Δ P , by gene...
The celebrated holographic entanglement entropy triggered investigations on the connections between ...
Abstract In this paper, we systematically study the measures of multi-partite entanglement with the ...
Abstract: We consider the entanglement entropy for holographic field theories in finite volume. We s...
The holographic entropy cone identifies entanglement entropies of field theory regions, which are co...
The domain of allowed von Neumann entropies of a holographic field theory carves out a polyhedral co...
Abstract: Ryu and Takayanagi conjectured a formula for the entanglement (von Neumann) entropy of an ...
We introduce a new quantity, called pseudo-entropy, as a generalization of entanglement entropy via ...
We extend our studies of holographic entropy inequalities to gapped phases of matter. For any number...