- In mathematics,
derivators are a
proposed frameworkpg 190-195 for
homological algebra giving a
foundation for both
abelian and non-abelian homological...
-
derived category of
diagrams on this category. Such an
object is
called a
Derivator.
Vector spaces over a
field k form an
elementary triangulated category...
-
Markus Rost, the full Bloch–Kato conjecture.
Derived algebraic geometry Derivator Cotangent complex - one of the
first objects discovered using homotopical...
-
focus of this m****cript.)
Among the
concepts introduced in the work are
derivators and test categories. Some
parts of the m****cript were
later developed...
- coefficients", "Hodge coefficients"... "Topological algebra": ∞-stacks,
derivators;
cohomological formalism of
topoi as
inspiration for a new homotopical...
-
Abstract nonsense, a term for
homological algebra and
category theory Derivator Homotopical algebra List of
homological algebra topics Weibel, Charles...
-
signal noise, and then a
compensation of the 6 dB/oct
slope is done by
derivator element on the
programming pins of an NE592
video amplifier. A surprisingly...
- enhancement.
Differential algebra Graded (mathematics)
Graded category Derivator Tabuada, Gonçalo (2005), "Invariants
additifs de DG-catégories", International...
-
Stacks Noncommutative algebraic geometry Simplicial commutative ring
Derivator Algebra over an
operad En-ring
Higher Topos Theory ∞-topos étale spectrum...
-
Grothendieck derivators: A
model for
homotopy theory similar to
Quilen model categories but more satisfactory.
Grothendieck derivators are dual to ****er...
