Let $H$ be a complex linear algebraic group with internally graded unipotent radical acting on a complex projective variety $X$. Given an ample linearisation of the action and an associated Fubini-Study Kahler form which is invariant for a maximal compact subgroup $Q$ of $H$, we define a notion of moment map for the action of $H$, and under suitable conditions (that the linearisation is well-adapted and semistability coincides with stability) we describe the (non-reductive) GIT quotient $X/!/H$ introduced by Berczi, Doran, Hawes and Kirwan in terms of this moment map. Using this description we derive formulas for the Betti numbers of $X/!/H$ and express the rational cohomology ring of $X/!/H$ in terms of the rational cohomology ring of the GIT quotient $X/!/T^H$, where $T^H$ is a maximal torus in $H$. We relate intersection pairings on $X/!/H$ to intersection pairings on $X/!/T^H$, obtaining a residue formula for these pairings on $X/!/H$ analogous to the residue formula of Jeffrey-Kirwan. As an application, we announce a proof of the Green-Griffiths-Lang and Kobayashi conjectures for projective hypersurfaces with polynomial degree.
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