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We produce examples of solutions to the non-abelian gravitating vortex equations, which are a dimensional reduction of the K\"aher-Yang-Mills- Higgs equations. These are equations for a K\"ahler metric and a metric on a vector bundle. We consider a symmetric situation on a sphere with a relationship between the parameters involved (criticality), and perform a non-trivial reduction of the problem to a system of ordinary differential equations on the real line with complicated boundary conditions at infinity. This system involves a parameter whose dependence on the volume of the K\"ahler metric is non-explicit. We prove existence to this system using the method of continuity. We then prove that the parameter can be varied to make sure that all possible admissible volumes are attained.
Vamsi Pritham Pingali (Sun,) studied this question.