Poincarédualiteetti

Poincarédualiteetti, also known as Poincaré duality, is a fundamental theorem in topology that relates the homology and cohomology of a manifold. It states that for a compact, orientable manifold of dimension $n$, there is a natural isomorphism between its $k$-th homology group and its $(n-k)$-th cohomology group for all integers $k$. This isomorphism is established by pairing homology classes with cohomology classes using the cap product.

More formally, if $M$ is a compact, orientable $n$-dimensional manifold, then the cap product with the fundamental

Poincaré duality provides a powerful tool for understanding the topological structure of manifolds. It implies that