Quartic surface

Surface described by a 4th-degree polynomial

In mathematics, especially in algebraic geometry, a quartic surface is a surface defined by an equation of degree 4.

More specifically there are two closely related types of quartic surface: affine and projective. An affine quartic surface is the solution set of an equation of the form

f(x,y,z)=0\

where f is a polynomial of degree 4, such as $f(x,y,z)=x^{4}+y^{4}+xyz+z^{2}-1$ . This is a surface in affine space A³.

On the other hand, a projective quartic surface is a surface in projective space P³ of the same form, but now f is a homogeneous polynomial of 4 variables of degree 4, so for example $f(x,y,z,w)=x^{4}+y^{4}+xyzw+z^{2}w^{2}-w^{4}$ .

If the base field is $\mathbb {R}$ or $\mathbb {C}$ the surface is said to be real or complex respectively. One must be careful to distinguish between algebraic Riemann surfaces, which are in fact quartic curves over $\mathbb {C}$ , and quartic surfaces over $\mathbb {R}$ . For instance, the Klein quartic is a real surface given as a quartic curve over $\mathbb {C}$ . If on the other hand the base field is finite, then it is said to be an arithmetic quartic surface.

Special quartic surfaces

Dupin cyclides
The Fermat quartic, given by x⁴ + y⁴ + z⁴ + w⁴ =0 (an example of a K3 surface).
More generally, certain K3 surfaces are examples of quartic surfaces.
Kummer surface
Plücker surface
Weddle surface

References

Hudson, R. W. H. T. (1990), Kummer's quartic surface, Cambridge Mathematical Library, Cambridge University Press, ISBN 978-0-521-39790-2, MR 1097176
Jessop, C. M. (1916), Quartic surfaces with singular points, Cornell University Library, ISBN 978-1-4297-0393-2