Cap product: Difference between revisions

Latest revision as of 19:33, 11 May 2008

Let $X$ be a topological space and $R$ a commutative ring. For $i, j$ integers, the cap product is a bilinear map:

$H^{i} (X) \times H_{j} (X) \to H_{j - i} (X)$

Equivalently it is a linear map:

$H^{i} (X) \otimes H_{j} (X) \to H_{j - i} (X)$

The cap product turns the direct sum of homology groups into a graded module over the cohomology ring, when viewed as a graded $R$ -algebra.

The cap product of $a$ and $b$ is denoted as:

$a ⌢ b$

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 The cap product turns the direct sum of homology groups into a graded module over the cohomology ring, when viewed as a graded <math>R</math>-algebra.
+The cap product of <math>a</math> and <math>b</math> is denoted as:
+<math>a \frown b</math>