TY - JOUR
T1 - Hodge theory on Cheeger spaces
AU - Albin, Pierre
AU - Leichtnam, Eric
AU - Mazzeo, Rafe
AU - Piazza, Paolo
N1 - Publisher Copyright:
© Walter de Gruyter GmbH. All rights reserved.
PY - 2018/11/1
Y1 - 2018/11/1
N2 - We extend the study of the de Rham operator with ideal boundary conditions from the case of isolated conic singularities, as analyzed by Cheeger, to the case of arbitrary stratified pseudomanifolds. We introduce a class of ideal boundary conditions and the notion of mezzoperversity, which intermediates between the standard lower and upper middle perversities in intersection theory, as interpreted in this de Rham setting, and show that the de Rham operator with these boundary conditions is Fredholm and has compact resolvent. We also prove an isomorphism between the resulting Hodge and L2 de Rham cohomology groups, and that these are independent of the choice of iterated edge metric. On spaces which admit ideal boundary conditions of this type which are also self-dual, which we call 'Cheeger spaces', we show that these Hodge/de Rham cohomology groups satisfy Poincaré duality.
AB - We extend the study of the de Rham operator with ideal boundary conditions from the case of isolated conic singularities, as analyzed by Cheeger, to the case of arbitrary stratified pseudomanifolds. We introduce a class of ideal boundary conditions and the notion of mezzoperversity, which intermediates between the standard lower and upper middle perversities in intersection theory, as interpreted in this de Rham setting, and show that the de Rham operator with these boundary conditions is Fredholm and has compact resolvent. We also prove an isomorphism between the resulting Hodge and L2 de Rham cohomology groups, and that these are independent of the choice of iterated edge metric. On spaces which admit ideal boundary conditions of this type which are also self-dual, which we call 'Cheeger spaces', we show that these Hodge/de Rham cohomology groups satisfy Poincaré duality.
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U2 - 10.1515/crelle-2015-0095
DO - 10.1515/crelle-2015-0095
M3 - Article
AN - SCOPUS:85046652074
SN - 0075-4102
VL - 2018
SP - 29
EP - 102
JO - Journal fur die Reine und Angewandte Mathematik
JF - Journal fur die Reine und Angewandte Mathematik
IS - 744
ER -