In geometry, a Cassini oval is a quartic plane curve defined as the locus of points in the plane such that the product of the distances to two fixed points (foci) is constant. This may be contrasted with an ellipse, for which the sum of the distances is constant, rather than the product. Cassini ovals are the special case of polynomial lemniscates when the polynomial used has degree 2.
Cassini ovals are named after the astronomer Giovanni Domenico Cassini who studied them in the late 17th century.[1] Cassini believed that a planet orbiting around another body traveled on one of these ovals, with the body it orbited around at one focus of the oval.Other names include Cassinian ovals, Cassinian curves and ovals of Cassini.
A Cassini oval is a set of points, such that for any point
P
|PP1|,|PP2|
P1,P2
b2
b>0
\{P:|PP1| x |PP2|=b2\} .
P1,P2
If the foci are (a, 0) and (−a, 0), then the equation of the curve is
((x-a)2+y2)((x+a)2+y2)=b4.
(x2+y2)2-2a2(x2-y2)+a4=b4.
The equivalent polar equation is
r4-2a2r2\cos2\theta=b4-a4.
The curve depends, up to similarity, on . When, the curve consists of two disconnected loops, each of which contains a focus. When, the curve is the lemniscate of Bernoulli having the shape of a sideways figure eight with a double point (specifically, a crunode) at the origin.[2] [3] When, the curve is a single, connected loop enclosing both foci. It is peanut-shaped for
1<e<\sqrt{2}
e\geq\sqrt{2}.
The curve always has x-intercepts at where . When there are two additional real x-intercepts and when there are two real y-intercepts, all other x- and y-intercepts being imaginary.[5]
The curve has double points at the circular points at infinity, in other words the curve is bicircular. These points are biflecnodes, meaning that the curve has two distinct tangents at these points and each branch of the curve has a point of inflection there. From this information and Plücker's formulas it is possible to deduce the Plücker numbers for the case : degree = 4, class = 8, number of nodes = 2, number of cusps = 0, number of double tangents = 8, number of points of inflection = 12, genus = 1.[6]
The tangents at the circular points are given by which have real points of intersection at . So the foci are, in fact, foci in the sense defined by Plücker.[7] The circular points are points of inflection so these are triple foci. When the curve has class eight, which implies that there should be a total of eight real foci. Six of these have been accounted for in the two triple foci and the remaining two are at So the additional foci are on the x-axis when the curve has two loops and on the y-axis when the curve has a single loop.[8]
Orthogonal trajectories of a given pencil of curves are curves which intersect all given curves orthogonally. For example the orthogonal trajectories of a pencil of confocal ellipses are the confocal hyperbolas with the same foci. For Cassini ovals one has:
P1,P2
P1,P2
Proof:
For simplicity one chooses
P1=(1,0),P2=(-1,0)
The Cassini ovals have the equation
The equilateral hyperbolas (their asymptotes are rectangular) containing
(1,0),(-1,0)
(0,0)
(\pm1,0)
λ
\operatorname{grad}f(x,y) ⋅ \operatorname{grad}g(x,y)=0
(x,y),x\ne0\ney
Remark:
The image depicting the Cassini ovals and the hyperbolas looks like the equipotential curves of two equal point charges together with the lines of the generated electrical field. But for the potential of two equal point charges one has
1/|PP1|+1/|PP2|=constant
The single-loop and double loop Cassini curves can be represented as the orthogonal trajectories of each other when each family is coaxal but not confocal. If the single-loops are described by
(x2+y2)-1=axy
y=x
a>0
y=-x
a<0
(x2+y2)+1=b(x2-y2)
y=0
x=0
(\pm1,0)
(0,\pm1)
P
OPQ
O=(0,1)
Q
P
x2+y2=1
The second lemniscate of the Mandelbrot set is a Cassini oval defined by the equation
L2=\{c:\operatorname{abs}(c2+c)=ER\}.
Cassini ovals appear as planar sections of tori, but only when the cutting plane is parallel to the axis of the torus and its distance to the axis equals the radius of the generating circle (see picture).
The intersection of the torus with equation
\left(x2+y2+z2+R2-r2\right)2=4R2\left(x2+y2\right)
y=r
\left(x2+z2+R2\right)2=4R2\left(x2+r2\right).
\left(x2+z2\right)2-2R2(x2-z2)=4R2r2-R4,
b2=2Rr
a=R
Cassini's method is easy to generalize to curves and surfaces with an arbitrarily many defining points:
|PP1| x |PP2| x … x |PPn|=bn