- (1968).
Notes on
cobordism theory. Princeton, NJ:
Princeton University Press.
While every cobordism is a cospan, the
category of
cobordisms is not a "cospan...
-
differential topology, an (n + 1)-dimensional
cobordism W
between n-dimensional
manifolds M and N is an h-
cobordism (the h
stands for
homotopy equivalence)...
-
functors of the
cobordism category and the
objects of C {\displaystyle {\mathcal {C}}} .
Symmetric monoidal functors from the
cobordism category correspond...
- In mathematics,
complex cobordism is a
generalized cohomology theory related to
cobordism of manifolds. Its
spectrum is
denoted by MU. It is an exceptionally...
- In mathematics, the
oriented cobordism ring is a ring
where elements are
oriented cobordism classes of manifolds, the
multiplication is
given by the Cartesian...
- derived.
Cobordism studies manifolds,
where a
manifold is
regarded as "trivial" if it is the
boundary of
another compact manifold. The
cobordism classes...
- (m,k)-handlebody of
genus g . A
handle presentation of a
cobordism consists of a
cobordism W
where ∂ W = M 0 ∪ M 1 {\displaystyle \partial W=M_{0}\cup...
- In mathematics,
algebraic cobordism is an
analogue of
complex cobordism for
smooth quasi-projective
schemes over a field. It was
introduced by Marc Levine...
-
encodes the same
information as the
cobordism class [ M ] {\displaystyle [M]} . This can be
shown by
using a
cobordism W {\displaystyle W} and
finding an...
- semi-s-
cobordism if (and only if) the
inclusion M ↪ W {\displaystyle M\hookrightarrow W} is a
simple homotopy equivalence (as in an s-
cobordism), with...
