A New Type of Saddle in the Euclidean IKKT Matrix Model and Its Emergent Geometry
Abstract
We study the equation of motion of the Euclidean IKKT matrix model, and realize a new type of classical saddle that only exists in N→∞ limit. Under the assumption that the matrices are the generators of so(n,m), we identify a unique solution, that is, so(1,3). Even though it has 6 generators and thus 6 non-zero matrices, they are not independent due to the 2 Casimir constraints in so(1,3). Exploiting the Lie-algebraic structure and the Casimir constraints, we derive a four-dimensional space that a test scalar propagates on. The associated metric possesses SU(2) isometry, which is closely related to the Taub NUT/Bolt geometry and, more broadly, to black hole physics.
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