Markus Banagl scite author profile

We generalize the first author's construction of intersection spaces to the case of stratified pseudomanifolds of stratification depth 1 with twisted link bundles, assuming that each link possesses an equivariant Moore approximation for a suitable choice of structure group. As a by-product, we find new characteristic classes for fiber bundles admitting such approximations. For trivial bundles and flat bundles whose base has finite fundamental group these classes vanish. For oriented closed pseudomanifolds, we prove that the reduced rational cohomology of the intersection spaces satisfies global Poincaré duality across complementary perversities if the characteristic classes vanish. The signature of the intersection spaces agrees with the Novikov signature of the top stratum. As an application, these methods yield new results about the Goresky-MacPherson intersection homology signature of pseudomanifolds. We discuss several nontrivial examples, such as the case of flat bundles and symplectic toric manifolds.

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Extending intersection homology type invariants to non-Witt spaces

Banagl¹

2002

Memoirs of the AMS

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Deformation of Singularities and the Homology of Intersection Spaces

Banagl

Maxim

2012

J. Topol. Anal.

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Abstract. While intersection cohomology is stable under small resolutions, both ordinary and intersection cohomology are unstable under smooth deformation of singularities. For complex projective algebraic hypersurfaces with an isolated singularity, we show that the first author's cohomology of intersection spaces is stable under smooth deformations in all degrees except possibly the middle, and in the middle degree precisely when the monodromy action on the cohomology of the Milnor fiber is trivial. In many situations, the isomorphism is shown to be a ring homomorphism induced by a continuous map. This is used to show that the rational cohomology of intersection spaces can be endowed with a mixed Hodge structure compatible with Deligne's mixed Hodge structure on the ordinary cohomology of the singular hypersurface.

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The L-homology fundamental class for IP-spaces and the stratified Novikov conjecture

Banagl

Laures

McClure

2019

Sel. Math. New Ser.

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An IP-space is a pseudomanifold whose defining local properties imply that its middle perversity global intersection homology groups satisfy Poincaré duality integrally. We show that the symmetric signature induces a map of Quinn spectra from IP bordism to the symmetric L-spectrum of Z, which is, up to weak equivalence, an E∞ ring map. Using this map, we construct a fundamental L-homology class for IP-spaces, and as a consequence we prove the stratified Novikov conjecture for IP-spaces whose fundamental group satisfies the Novikov conjecture.2010 Mathematics Subject Classification. 55N33, 57R67, 57R20, 57N80, 19G24.

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Markus Banagl

Intersection Spaces, Spatial Homology Truncation, and String Theory

Intersection Spaces, Equivariant Moore Approximation and the Signature

Extending intersection homology type invariants to non-Witt spaces

Deformation of Singularities and the Homology of Intersection Spaces

The L-homology fundamental class for IP-spaces and the stratified Novikov conjecture

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