User:Coffeebrake60/sandbox

This is the user sandbox of Coffeebrake60. A user sandbox is a subpage of the user's user page. It serves as a testing spot and page development space for the user and is not an encyclopedia article. Create or edit your own sandbox here. Other sandboxes: Main sandbox | Template sandbox Finished writing a draft article? Are you ready to request review of it by an experienced editor for possible inclusion in Wikipedia? Submit your draft for review!

Singularity Theory

Plane curve singularities

 

A curve with double point.

 

A cusp.

Historically, singularities were first noticed in the study of real algebraic curves. The double point at (0,0) of the curve ${\displaystyle y^{2}=x^{2}-x^{3}\ }$  and the cusp point at (0,0) of the curve ${\displaystyle y^{2}=x^{3}\ }$  are qualitatively different, as is seen just by sketching. In more precise terms, if we take out the point (0,0) in both curves, in the first case we obtain two connected components and in the second case three connected components. Isaac Newton carried out a detailed study of all cubic curves, the general family to which these examples belong^[1].

Consider now the curves defined over the field of complex numbers by the same equations. They are surfaces of ${\displaystyle R^{4}}$  and it is not very easy to visualize them. Isaac Newton initiated the local study of complex analytical plane curves. He developed a method to parametrize them, what is now called the Puiseux expansion of the curve^[1]. The Puiseux expansions of the curves given by the equations

${\displaystyle y^{2}-x^{3}=0\ }$  and ${\displaystyle (\ y^{2}-x^{3})^{2}-...\ }$ 

are respectively ${\displaystyle \ y=x^{3/2}\ }$  and ${\displaystyle \ y=x^{3/2}+x^{7/4}.}$ 

This means that the curves referred above admit the parametrizations

${\displaystyle f(t)=(t^{2},t^{3})\ }$  and ${\displaystyle \ g(t)=(t^{4},t^{6}+t^{7})\ }$ 

See also

• Zariski tangent space
• Contact (mathematics)
• Stratification (mathematics)
• Intersection homology
• Mixed Hodge structure
• Whitney umbrella

Notes

1. Brieskorn and Knorrer, Plane Algebraic Curves

References

• V.I. Arnold (29 October 2003). Catastrophe Theory. Springer-Verlag. ISBN 978-3540548119. {{cite book}}: Cite has empty unknown parameter: |1= (help)

• E. Brieskorn (1986). Plane Algebraic Curves. Birkhauser-Verlag. ISBN 978-3764317690. {{cite book}}: Unknown parameter |coauthors= ignored (|author= suggested) (help)