Spectral sequence

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Spectral sequences were invented by Jean Leray as an approach to computing sheaf cohomology.

Historical development

Definition

A (cohomology) spectral sequence (starting at ${\displaystyle E_{a}}$) in an abelian category ${\displaystyle A}$ consists of the following data:

1. A family ${\displaystyle \{E_{r}^{pq}\}}$ of objects of ${\displaystyle A}$ defined for all integers ${\displaystyle p,q}$ and ${\displaystyle r\geq a}$
2. Morphisms ${\displaystyle d_{r}^{pq}:E_{r}^{pq}\to E_{r}^{p+r,q-r+1}}$ that are differentials in the sense that ${\displaystyle d_{r}\circ d_{r}=0}$, so that the lines of "slope" ${\displaystyle -r/(r+1)}$ in the lattice ${\displaystyle E_{r}^{**}}$ form chain complexes (we say the differentials "go to the right")
3. Isomorphisms between ${\displaystyle E_{r+1}^{pq}}$ and the homology of ${\displaystyle E_{r}^{**}}$ at the spot ${\displaystyle E_{r}^{pq}}$:

${\displaystyle E_{r+1}^{pq}\simeq \ker(d_{r}^{pq})/{\text{image}}(d_{r}^{p-r,q+r+1})}$

Convergence

Examples

1. The Leray spectral sequence
2. The Grothendieck spectral sequence