Spin-structures on real Bott manifolds

Abstract

Let Mn R P1 Mn-1 R P1… R P1 M1 R P1 M0 = \ \ be a sequence of real projective bundles such that Mi Mi-1, i=1,2,…,n, is a projective bundle of a Whitney sum of a real line bundle Li-1 and the trivial line bundle over Mi-1. The above sequence is called the real Bott tower and the top manifold Mn is called the real Bott manifold. There are a few ways to decide whether there exists a Spin-structure on an oriented flat manifold Mn. An oriented flat manifold Mn has a Spin-structure if and only if there exists a homomorphism εSpin(n) such that λnε=p, where λn:Spin(n)SO(n) is the covering map. There is an equivalent condition for existence of Spin-structure. This is well known that the closed oriented differential manifold M has a Spin-structure if and only if the second Stiefel-Whitney class vanishes. Our paper is a sequel of A. Gasior, A. Szczepa\'nski, Flat manifolds with holonomy group Z2k of diagonal type, Osaka J. Math. 51 (2014), 1015 - 1025. There are given non-complete conditions of the existence of Spin-structures on real Bott manifolds. In this paper, if k is even, we formulate necessary and sufficient conditions of the existence of Spin-structure on real Bott manifolds. Here is our main result The real Bott manifold M(A) has a Spin-structure if and only for all 1≤ i<j≤ n manifolds M(Aij) have a Spin-structure, where Aij are n× n-integer matrices with i-th and j-th nonzero rows.