In classical algebraic geometry, the genus–degree formula relates the degree d of an irreducible plane curve with its arithmetic genusg via the formula:
Here "plane curve" means that is a closed curve in the projective plane. If the curve is non-singular the geometric genus and the arithmetic genus are equal, but if the curve is singular, with only ordinary singularities, the geometric genus is smaller. More precisely, an ordinary singularity of multiplicity r decreases the genus by .[1]
The proof follows immediately from the adjunction formula.[clarification needed] For a classical proof see the book of Arbarello, Cornalba, Griffiths and Harris.
genus, degree, formula, classical, algebraic, geometry, genus, degree, formula, relates, degree, irreducible, plane, curve, displaystyle, with, arithmetic, genus, formula, displaystyle, frac, here, plane, curve, means, that, displaystyle, closed, curve, projec. In classical algebraic geometry the genus degree formula relates the degree d of an irreducible plane curve C displaystyle C with its arithmetic genus g via the formula g 1 2 d 1 d 2 displaystyle g frac 1 2 d 1 d 2 Here plane curve means that C displaystyle C is a closed curve in the projective plane P 2 displaystyle mathbb P 2 If the curve is non singular the geometric genus and the arithmetic genus are equal but if the curve is singular with only ordinary singularities the geometric genus is smaller More precisely an ordinary singularity of multiplicity r decreases the genus by 1 2 r r 1 displaystyle frac 1 2 r r 1 1 Contents 1 Proof 2 Generalization 3 Notes 4 See also 5 ReferencesProof EditThe proof follows immediately from the adjunction formula clarification needed For a classical proof see the book of Arbarello Cornalba Griffiths and Harris Generalization EditFor a non singular hypersurface H displaystyle H of degree d in the projective space P n displaystyle mathbb P n of arithmetic genus g the formula becomes g d 1 n displaystyle g binom d 1 n where d 1 n displaystyle tbinom d 1 n is the binomial coefficient Notes Edit Semple John Greenlees Roth Leonard Introduction to Algebraic Geometry 1985 ed Oxford University Press pp 53 54 ISBN 0 19 853363 2 MR 0814690 See also EditThom conjectureReferences EditThis article incorporates material from the Citizendium article Genus degree formula which is licensed under the Creative Commons Attribution ShareAlike 3 0 Unported License but not under the GFDL Enrico Arbarello Maurizio Cornalba Phillip Griffiths Joe Harris Geometry of algebraic curves vol 1 Springer ISBN 0 387 90997 4 appendix A Phillip Griffiths and Joe Harris Principles of algebraic geometry Wiley ISBN 0 471 05059 8 chapter 2 section 1 Robin Hartshorne 1977 Algebraic geometry Springer ISBN 0 387 90244 9 Kulikov Viktor S 2001 1994 Genus of a curve Encyclopedia of Mathematics EMS Press Retrieved from https en wikipedia org w index php title Genus degree formula amp oldid 835391443, wikipedia, wiki, book, books, library,
