Two IGO flows on spheres are designed with natural gradients from Poincaré and Bergman hyperbolic geometries, realized via Kuramoto oscillator ensembles, with a noted link to quantum decision making.
Huang and S.-Y
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
verdicts
UNVERDICTED 2representative citing papers
Introduces a statistical model on complex domains via probability measures, derives a covariance-based curvature formula for the Bergman metric, proves a biholomorphism criterion from metric preservation, and establishes consistency plus CLT for the Fréchet mean of Calabi's diastasis.
citing papers explorer
-
Statistical Bergman geometry
Introduces a statistical model on complex domains via probability measures, derives a covariance-based curvature formula for the Bergman metric, proves a biholomorphism criterion from metric preservation, and establishes consistency plus CLT for the Fréchet mean of Calabi's diastasis.