Algebra of operators in an AdS-Rindler wedge
Abstract
We discuss the algebra of operators in AdS-Rinlder wedge, particularly in AdS5/CFT4. We explicitly construct the algebra at N=∞ limit and discuss its Type III1 nature. We will consider 1/N corrections to the theory and using a novel way of renormalizing the area of Ryu-Takayanagi surface, describe how several divergences can be renormalized and the algebra becomes Type II∞. This will make it possible to associate a density matrix to any state in the Hilbert space and thus a von Neumann entropy.
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