Saccheri quadrilateral

History

Saccheri quadrilaterals were first considered by Omar Khayyam (1048-1131) in the late 11th century in Book I of Explanations of the Difficulties in the Postulates of Euclid. Unlike many commentators on Euclid before and after him (including of course Saccheri), Khayyam was not trying to prove the parallel postulate as such but to derive it from an equivalent postulate he formulated from "the principles of the Philosopher" (Aristotle):

Two convergent straight lines intersect and it is impossible for two convergent straight lines to diverge in the direction in which they converge.

Khayyam then considered the three cases right, obtuse, and acute that the summit angles of a Saccheri quadrilateral can take and after proving a number of theorems about them, he (correctly) refuted the obtuse and acute cases based on his postulate and hence derived the classic postulate of Euclid.

It was not until 600 years later that Giordano Vitale made an advance on Khayyam in his book Euclide restituo (1680, 1686), when he used the quadrilateral to prove that if three points are equidistant on the base AB and the summit CD, then AB and CD are everywhere equidistant.

Saccheri himself based the whole of his long, heroic, and ultimately flawed proof of the parallel postulate around the quadrilateral and its three cases, proving many theorems about its properties along the way.

Saccheri quadrilaterals in hyperbolic geometry

Let ABCD be a Saccheri quadrilateral having AB as base, CD as summit and CA and DB as the equal sides that are perpendicular to the base. The following properties are valid in any Saccheri quadrilateral in hyperbolic geometry:

The summit angles (the angles at C and D) are equal and acute.

The summit is longer than the base.

Two Saccheri quadrilaterals are congruent if:

the base segments and summit angles are congruent

the summit segments and summit angles are congruent.

The line segment joining the midpoint of the base and the midpoint of the summit:

Is perpendicular to the base and the summit,

is the only line of symmetry of the quadrilateral,

is the shortest segment connecting base and summit,

is perpendicular to the line joining the midpoints of the sides,

divides the Saccheri quadrilateral into two Lambert quadrilaterals.

The line segment joining the midpoints of the sides is not perpendicular to either side.

Equations

In the hyperbolic plane of constant curvature − 1 , the summit s of a Saccheri quadrilateral can be calculated from the leg l and the base b using the formula

cosh ⁡ s = ( cosh ⁡ b − 1 ) cosh 2 ⁡ l + 1 = cosh ⁡ b ⋅ cosh 2 ⁡ l − sinh 2 ⁡ l sinh ⁡ ( s 2 ) = cosh ⁡ ( l ) sinh ⁡ ( b 2 )

Tilings in the Poincaré disk model

Tilings of the Poincaré disk model of the Hyperbolic plane exist having Saccheri quadrilaterals as fundamental domains. Besides the 2 right angles, these quadrilaterals have acute summit angles. The tilings exhibit a *nn22 symmetry (orbifold notation), and include: