We introduce the Principle of Invariant Projection and the associatedInvariant Projection Spaces (IPS), a unified framework for integralgeometry on homogeneous varieties. An IPS is a double fibration of incidenceendowed with an invariant probability measure, giving rise to a projectionoperator whose average extracts the G-invariant cohomology. The centrepieceis a fundamental identity ∫X ω ∧ Π* (1) = ∫G Π (ω) dμ, from which we deducethe classical Crofton and Schubert formulas. We introduce the notion ofIPS‑cohomological completeness and prove that, for generalised flag varietiesG/P, the Schubert cycles form a complete family; consequently the invariantprojection is injective on cohomology. This yields a rigorous characterisationof Kähler–Einstein metrics as those with constant invariant projection of theRicci form. An ergodic theorem for the iterated projection operator isestablished, leading to an IPS invariant; we conjecture its equality with theFutaki invariant and verify it for the Hirzebruch surface F₁. We constructIPS structures for Grassmannians, flag varieties, quadric hypersurfaces, andRiemannian spheres. The work culminates in the Mabuchi tower conjecture, linking the IPS iteration to the K-stability of Fano manifolds.
Ozorio Olea Arnaldo Adrian (Tue,) studied this question.
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