We establish a connection between the η invariant of Atiyah, Patodi and Singer
([1, 2]) and the condition that a knot
K ⊂ S3 be slice. We produce a new family
of metabelian obstructions to slicing K such as those first developed by Casson and
Gordon in [4] in the mid 1970s. Surgery is used to turn the knot complement
S3 − K into a closed manifold M
and, for given unitary representations of π1(M), η can be
defined. Levine has recently shown in [11] that η acts as an homology cobordism
invariant for a certain subvariety of the representation space
of π1(N), where N is
zero-framed surgery on a knot concordance. We demonstrate a large family of such
representations, show they are extensions of similar representations on the boundary
of N and prove that for slice knots, the value of η defined by these representations
must vanish.
The paper is organized as follows; Section 1 consists of background material on η
and Levine's work on how it is used as a concordance invariant [11]. Section 2 deals
with unitary representations of π1(M) and is
broken into two parts. In 2·1,
homomorphisms from π1(M) to a metabelian group
Γ are developed using the Blanchfield pairing. Unitary representations of Γ are
then considered in 2·2. Conditions ensuring that such two stage representations of
π1(M) allow η to be used as an invariant are developed in
Section 3 and [Pscr ]k, the family of such representations, is defined.
Section 4 contains the main result of the paper, Theorem 4·3. Lastly, in Section 5, we
demonstrate the construction of representations in [Pscr ]k.