Double L-theory

We develop new algebraic methods refining the Witt group of linking forms and Ranicki's torsion algebraic L-groups into double Witt groups and double L-groups. At each prime ideal of the underlying ring, our double Witt groups capture infinitely many more integral signatures of the linking form than the single Witt groups. The double L-groups are an algebraic theory of `double cobordism', refining L-theory analogously. We exhibit an exact sequence relating the double L-groups to classical projective L-theory via a double homology surgery obstruction group. The algebraic techniques are applied to high-dimensional knot theory to define new invariants for the study of doubly-slice knots. In particular we prove a homomorphism from the n-dimensional double concordance group to a double L-group, which factors the construction of the Blanchfield form. Some results of Stoltzfus in this area are reproved and we show that every Seifert matrix for a doubly-slice knot is hyperbolic.