On the image of higher signature maps

Abstract

Given a smooth variety X over the field R of real numbers and a line bundle L on X with associated topological line bundle L=L(R), we study the quadratic real cycle class map γRc:CHc(X,L)→Hc(X(R),Z(L)) from the c-th Chow-Witt group of X to the c-th cohomology group of its real locus X(R) with coefficients in the local system Z(L) associated with L. We focus on the cases c∈\0,d-2,d-1,d\ where d is the dimension of X and we formulate a precise conjecture on the image of γR in terms of the exponents of its cokernel that is corroborated by the results obtained in those codimensions.

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