PlanetPhysics/Homological Complex of Topological Vector Spaces

A homological complex of topological vector spaces is a pair ${\displaystyle (E_{\bullet },d)}$, where ${\displaystyle E_{\bullet }=(E_q{)}_{q\in Z}}$ is a sequence of [[../CoIntersections/|topological]] [[../NormInducedByInnerProduct/|vector spaces]] and ${\displaystyle d=(d_q{)}_{q\in Z}}$ is a sequence of continuous linear maps ${\displaystyle d_q}$ from ${\displaystyle E_{q+1}}$ into ${\displaystyle E_q}$ which satisfy ${\displaystyle d_q\circ d_{q+1}=0}$.

• The homological complex of topological vector spaces is a specifc example of a chain complex .
• A sequence of ${\displaystyle R}$-modules and their [[../TrivialGroupoid/|homomorphisms]] is said to be a ${\displaystyle R}$-complex.

Template:CourseCat