Progress in Mathematics
Eisenstein series with coefficients in intersection homology
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, Chapter
Getz, J; Goresky, M
January 1, 2012
Thus far we have ignored classes in (Formula presented.) and their Poincaré duals in intersection homology. We now take up the study of these classes.
Duke Scholars
DOI
Publication Date
January 1, 2012
Volume
298
Start / End Page
179 / 182
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Getz, J., & Goresky, M. (2012). Eisenstein series with coefficients in intersection homology. In Progress in Mathematics (Vol. 298, pp. 179–182). https://doi.org/10.1007/978-3-0348-0351-9_11
Getz, J., and M. Goresky. “Eisenstein series with coefficients in intersection homology.” In Progress in Mathematics, 298:179–82, 2012. https://doi.org/10.1007/978-3-0348-0351-9_11.
Getz J, Goresky M. Eisenstein series with coefficients in intersection homology. In: Progress in Mathematics. 2012. p. 179–82.
Getz, J., and M. Goresky. “Eisenstein series with coefficients in intersection homology.” Progress in Mathematics, vol. 298, 2012, pp. 179–82. Scopus, doi:10.1007/978-3-0348-0351-9_11.
Getz J, Goresky M. Eisenstein series with coefficients in intersection homology. Progress in Mathematics. 2012. p. 179–182.
DOI
Publication Date
January 1, 2012
Volume
298
Start / End Page
179 / 182