Bredon cohomology methods in mass partition problems on spheres
Abstract
We apply RO(G)-graded Bredon cohomology to mass assignment problems, extending classical mass partition methods. Within this framework, we reprove a recent result of Lessure and Sober\'on: for n+1 mass assignments on k-dimensional affine subspaces of Rn, there exists a k-subspace containing a sphere that simultaneously bisects all measures. This approach highlights a flexible topological framework with potential for broader applications.
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