-
shows that this
approach cannot prove the
Hodge conjecture for
higher codimensional subvarieties. By the Hard
Lefschetz theorem, one can prove: Theorem...
- dual to the
relative dimension as the
dimension of the kernel. Finite-
codimensional subspaces of infinite-dimensional
spaces are
often useful in the study...
- is
called the defect. Clearly,
every finite-dimensional and finite-
codimensional subspace is almost-invariant
under every operator. Thus, to make things...
- ISSNĀ 0179-5376. S2CIDĀ 9090617. Guilfoyle, B.; Klingenberg, W. (2019). "Higher
codimensional mean
curvature flow of
compact spacelike submanifolds". Trans. Amer...
-
evidence that the M5-brane
worldvolume theory can
support four- and two-
codimensional solitonic excitations,
namely self-dual
strings and three-branes. Gueven...
-
complemented subspaces are
either finite-dimensional or -
codimensional.
Because a finite-
codimensional subspace of a
Banach space X {\displaystyle X} is always...
-
subspace of a
barrelled space that has
countable codimensional. In particular, a
finite codimensional vector subspace of a
barrelled space is barreled...
-
formes modulaires, Bull. Soc. math. France, 120 (1992), 1-13.
Finite codimensional subalgebras of
Stein algebras and
semiglobally Stein algebras, Transactions...
-
curvature flow with boundary. The
required interior estimates for
higher codimensional mean
curvature flow in an
indefinite geometry appear in . The final...
- T\in B(X,Y)} is
called strictly cosingular whenever given an infinite-
codimensional closed subspace Z of Y, the map Q Z T {\displaystyle Q_{Z}T}
fails to...
