Topological classification of generalized Bott towers

Abstract: Abstract. If B is a toric manifold and E is a Whitney sum of complex line bundles over B, then the projectivization P (E) of E is again a toric manifold. Starting with B as a point and repeating this construction, we obtain a sequence of complex projective bundles which we call a generalized Bott tower. We prove that if the top manifold in the tower has the same cohomology ring as a product of complex projective spaces, then every fibration in the tower is trivial so that the top manifold is diffeomorphic to t… Show more

“…This corollary is a generalization of the cohomological rigidity theorem for Bott manifolds up to dimension less than or equal to 6 proved in [CMS10]. Note that cohomology ring does not determine the tower structure of CP -tower.…”

“…Note that any complex vector bundles over CP 1 decomposes into a Whitney sum of line bundles. Therefore a CP -tower M ∈ M 6 2 with C 1 = CP 1 is a 2-stage generalized Bott tower, and such Bott towers are completely classified in [CMS10]. (See also [CPS].)…”

“…For example, if each complex vector bundle ξ i is a Whitney sum of complex line bundles, such CP -tower is a generalized Bott tower, introduced in [CMS10]. If each ξ i is a sum of two complex line bundles, then it is a Bott tower, introduced in [BoSa] (also see [GrKa]).…”

“…Note that if we restrict the class of 8-dimensional CP -towers to the 8-dimensional generalized Bott manifolds with height 2, then cohomological rigidity holds by [CMS10].…”

Complex projective towers and their cohomological rigidity up to dimension six

“…This corollary is a generalization of the cohomological rigidity theorem for Bott manifolds up to dimension less than or equal to 6 proved in [CMS10]. Note that cohomology ring does not determine the tower structure of CP -tower.…”

“…Note that any complex vector bundles over CP 1 decomposes into a Whitney sum of line bundles. Therefore a CP -tower M ∈ M 6 2 with C 1 = CP 1 is a 2-stage generalized Bott tower, and such Bott towers are completely classified in [CMS10]. (See also [CPS].)…”

“…For example, if each complex vector bundle ξ i is a Whitney sum of complex line bundles, such CP -tower is a generalized Bott tower, introduced in [CMS10]. If each ξ i is a sum of two complex line bundles, then it is a Bott tower, introduced in [BoSa] (also see [GrKa]).…”

“…Note that if we restrict the class of 8-dimensional CP -towers to the 8-dimensional generalized Bott manifolds with height 2, then cohomological rigidity holds by [CMS10].…”

Complex projective towers and their cohomological rigidity up to dimension six

“…Simply connected real 4-dimensional closed smooth manifolds are classified up to homeomorphism by isomorphism classes of the bilinear forms defined by the intersection paring of real 2-cyclyes ( [15]), so the homeomorphism types of those manifolds are distinguished by their cohomology rings. This together with the fact that any toric manifold is smooth and simply connected ( [16 The reader can find more partial affirmative solutions to Problem 1 in [6].…”

Classification problems of toric manifolds via topology

Equivariant K$K$‐theory of flag Bott manifolds of general Lie type