Adjunction formula: Difference between revisions
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imported>David Lehavi (put Hartshorn and G&H as ref's) |
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In [[algebraic geometry]], the adjunction formula states that if <math>X, Y</math> are smooth algebraic varieties, and <math>X\subset Y</math> is of codimension 1, then there is a natural isomorphism of sheaves: | In [[algebraic geometry]], the adjunction formula states that if <math>X, Y</math> are smooth algebraic varieties, and <math>X\subset Y</math> is of codimension 1, then there is a natural isomorphism of sheaves: | ||
<math>K_X\cong(K_Y\otimes\mathcal{O}_Y(X))|_X</math> | <math>K_X\cong(K_Y\otimes\mathcal{O}_Y(X))|_X</math>. | ||
== | == Examples == | ||
* The [[genus degree formula]] for plane curves: Let <math>C\subset\mathrm{P}^2</math> be a smooth plane curve of degree <math>d</math>. Recall that if <math>H\subset\mathbb{P}^2</math>is a line, then <math>Pic(\mathbb{P}^2)=\mathbb{Z}H</math> and <math>K_{\mathbb{P}^2}\equiv -3H</math>. Hence | * The [[genus degree formula]] for plane curves: Let <math>C\subset\mathrm{P}^2</math> be a smooth plane curve of degree <math>d</math>. Recall that if <math>H\subset\mathbb{P}^2</math>is a line, then <math>\mathrm{Pic}(\mathbb{P}^2)=\mathbb{Z}H</math> and <math>K_{\mathbb{P}^2}\equiv -3H</math>. Hence | ||
<math>K_C\equiv (-3H+dH)(dH)</math>. Since the degree of <math>K_C</math> is <math>2 genus(C)-2</math>, we see that: | <math>K_C\equiv (-3H+dH)(dH)</math>. Since the degree of <math>K_C</math> is <math>2 genus(C)-2</math>, we see that: | ||
<math>genus(C)=(d^2-3d+2)/2=(d-1)(d-2)/2</math> | <math>genus(C)=(d^2-3d+2)/2=(d-1)(d-2)/2</math>. | ||
* The genus of a curve given by the transversal intersection of two smooth surfaces <math>S,T\subset\mathbb{P}^3</math>: let the degrees of the surfaces be <math>c,d</math>. Recall that if <math>H\subset\mathbb{P}^3</math>is a plane, then <math>Pic(\mathbb{P}^3)=\mathbb{Z}H</math> and <math>K_{\mathbb{P}^3}\equiv -4H</math>. Hence | * The genus of a curve given by the transversal intersection of two smooth surfaces <math>S,T\subset\mathbb{P}^3</math>: let the degrees of the surfaces be <math>c,d</math>. Recall that if <math>H\subset\mathbb{P}^3</math>is a plane, then <math>\mathrm{Pic}(\mathbb{P}^3)=\mathbb{Z}H</math> and <math>K_{\mathbb{P}^3}\equiv -4H</math>. Hence | ||
<math>K_S\equiv (-4H+cH) |_S</math> and therefore | <math>K_S\equiv (-4H+cH) |_S</math> and therefore | ||
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e.g. if <math>S,T</math> are a quadric and a cubic then the degree of the canonical sheaf of the intersection is 6, and so the genus of the interssection curve is 4. | e.g. if <math>S,T</math> are a quadric and a cubic then the degree of the canonical sheaf of the intersection is 6, and so the genus of the interssection curve is 4. | ||
== | == Outline of proof and generaliztions == | ||
= | The outline follows Fulton (see reference below): | ||
== | Let <math>i:X\to Y</math> be a close embedding of smooth varieties, then we have a short exact sequence: | ||
* ''Prniciples of algebraic geometry'', Griffiths and Harris, Wiley classics library, isbn 0-471-05059-8 pp 146-147 | <math>0\to T_X\to i^* T_Y \to N_{X/Y}\to 0</math>, | ||
* ''Algebraic geomtry'', Robin Hartshorn, Springer GTM 52, isbn 0-387-90244-9, Proposition II.8.20 | |||
and so <math>c(T_X) = c(i^* T_Y)/N_{X/Y}</math>, where <math>c</math> is the total chern class. | |||
== References == | |||
* ''Intersection theory'' 2nd eddition, William Fulton, Springer, isbn 0-387-98549-2, Example 3.2.12. | |||
* ''Prniciples of algebraic geometry'', Griffiths and Harris, Wiley classics library, isbn 0-471-05059-8 pp 146-147. | |||
* ''Algebraic geomtry'', Robin Hartshorn, Springer GTM 52, isbn 0-387-90244-9, Proposition II.8.20. | |||
Revision as of 03:27, 15 March 2008
In algebraic geometry, the adjunction formula states that if are smooth algebraic varieties, and is of codimension 1, then there is a natural isomorphism of sheaves:
.
Examples
- The genus degree formula for plane curves: Let be a smooth plane curve of degree . Recall that if is a line, then and . Hence
. Since the degree of is , we see that:
.
- The genus of a curve given by the transversal intersection of two smooth surfaces : let the degrees of the surfaces be . Recall that if is a plane, then and . Hence
and therefore .
e.g. if are a quadric and a cubic then the degree of the canonical sheaf of the intersection is 6, and so the genus of the interssection curve is 4.
Outline of proof and generaliztions
The outline follows Fulton (see reference below): Let be a close embedding of smooth varieties, then we have a short exact sequence:
,
and so , where is the total chern class.
References
- Intersection theory 2nd eddition, William Fulton, Springer, isbn 0-387-98549-2, Example 3.2.12.
- Prniciples of algebraic geometry, Griffiths and Harris, Wiley classics library, isbn 0-471-05059-8 pp 146-147.
- Algebraic geomtry, Robin Hartshorn, Springer GTM 52, isbn 0-387-90244-9, Proposition II.8.20.