Actions of diagonalizable p-groups and Chern numbers modulo p
Abstract
We obtain lower bounds for the dimension of fixed loci of diagonalizable p-groups acting on smooth projective varieties. Those bounds depend on the modulo p Chern numbers of the ambient variety, and are expressed in a natural way by introducing an appropriate filtration on the "modulo p cobordism ring" (for p=2 this is Thom's unoriented cobordism ring MO*). They are obtained using equivariant localization methods, via the concentration theorem for the Chow ring, and by a technique of "partition dividing". As applications we derive statements in the spirit of Boardman's Five-Halves Theorem for involutions on manifolds.
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