Relation to Euclidean geometry Hyperbolic geometry is more closely related to Euclidean geometry than it seems: the only
axiomatic difference is the
parallel postulate. When the parallel postulate is removed from Euclidean geometry the resulting geometry is
absolute geometry. There are two kinds of absolute geometry, Euclidean and hyperbolic. All theorems of absolute geometry, including the first 28 propositions of book one of
Euclid's Elements, are valid in Euclidean and hyperbolic geometry. Propositions 27 and 28 of Book One of Euclid's
Elements prove the existence of parallel/non-intersecting lines. This difference also has many consequences: concepts that are equivalent in Euclidean geometry are not equivalent in hyperbolic geometry; new concepts need to be introduced. Further, because of the
angle of parallelism, hyperbolic geometry has an
absolute scale, a relation between distance and angle measurements.
Lines Single lines in hyperbolic geometry have exactly the same properties as single straight lines in Euclidean geometry. For example, two points uniquely define a line, and line segments can be infinitely extended. Two intersecting lines have the same properties as two intersecting lines in Euclidean geometry. For example, two distinct lines can intersect in no more than one point, intersecting lines form equal opposite angles, and adjacent angles of intersecting lines are
supplementary. When a third line is introduced, then there can be properties of intersecting lines that differ from intersecting lines in Euclidean geometry. For example, given two intersecting lines there are infinitely many lines that do not intersect either of the given lines. These properties are all independent of the
model used, even if the lines may look radically different.
Non-intersecting / parallel lines Non-intersecting lines in hyperbolic geometry also have properties that differ from non-intersecting lines in
Euclidean geometry: :For any line
R and any point
P which does not lie on
R, in the plane containing line
R and point
P there are at least two distinct lines through
P that do not intersect
R. This implies that there are through
P an infinite number of coplanar lines that do not intersect
R. These non-intersecting lines are divided into two classes: • Two of the lines (
x and
y in the diagram) are
limiting parallels (sometimes called critically parallel, horoparallel or just parallel): there is one in the direction of each of the
ideal points at the "ends" of
R, asymptotically approaching
R, always getting closer to
R, but never meeting it. • All other non-intersecting lines have a point of minimum distance and diverge from both sides of that point, and are called
ultraparallel,
diverging parallel or sometimes
non-intersecting. Some geometers simply use the phrase "
parallel lines" to mean "
limiting parallel lines", with
ultraparallel lines meaning just
non-intersecting. These
limiting parallels make an angle
θ with
PB; this angle depends only on the
Gaussian curvature of the plane and the distance
PB and is called the
angle of parallelism. For ultraparallel lines, the
ultraparallel theorem states that there is a unique line in the hyperbolic plane that is perpendicular to each pair of ultraparallel lines.
Circles and disks In hyperbolic geometry, the circumference of a circle of radius
r is greater than 2 \pi r . Let R = \frac{1}{\sqrt{-K}} , where K is the
Gaussian curvature of the plane. In hyperbolic geometry, K is negative, so the square root is of a positive number. Then the circumference of a circle of radius
r is equal to: :2\pi R \sinh \frac{r}{R} \,. And the area of the enclosed disk is: :4\pi R^2 \sinh^2 \frac{r}{2R} = 2\pi R^2 \left(\cosh \frac{r}{R} - 1\right) \,. Therefore, in hyperbolic geometry the ratio of a circle's circumference to its radius is always strictly greater than 2\pi , though it can be made arbitrarily close by selecting a small enough circle. If the Gaussian curvature of the plane is −1 then the
geodesic curvature of a circle of radius
r is: \frac{1}{\tanh(r)}
Hypercycles and horocycles In hyperbolic geometry, there is no line whose points are all equidistant from another line. Instead, the points that are all the same distance from a given line lie on a curve called a
hypercycle. Another special curve is the
horocycle, whose
normal radii (
perpendicular lines) are all
limiting parallel to each other (all converge asymptotically in one direction to the same
ideal point, the centre of the horocycle). Through every pair of points there are two horocycles. The centres of the horocycles are the
ideal points of the
perpendicular bisector of the line-segment between them. Given any three distinct points, they all lie on either a line, hypercycle,
horocycle, or circle. The
length of a line-segment is the shortest length between two points. The arc-length of a hypercycle connecting two points is longer than that of the line segment and shorter than that of the arc horocycle, connecting the same two points. The lengths of the arcs of both horocycles connecting two points are equal, and are longer than the arclength of any hypercycle connecting the points and shorter than the arc of any circle connecting the two points. If the Gaussian curvature of the plane is −1, then the
geodesic curvature of a horocycle is 1 and that of a hypercycle is between 0 and 1. Therefore, all hyperbolic triangles have an area less than or equal to
Rπ. The area of a hyperbolic
ideal triangle in which all three angles are 0° is equal to this maximum. As in
Euclidean geometry, each hyperbolic triangle has an
incircle. In hyperbolic space, if all three of its vertices lie on a
horocycle or
hypercycle, then the triangle has no
circumscribed circle. As in
spherical and
elliptical geometry, in hyperbolic geometry if two triangles are similar, they must be congruent.
Regular apeirogon and pseudogon and circumscribed
horocycle in the
Poincaré disk model Special polygons in hyperbolic geometry are the regular
apeirogon and
pseudogon uniform polygons with an infinite number of sides. In
Euclidean geometry, the only way to construct such a polygon is to make the side lengths tend to zero and the apeirogon is indistinguishable from a circle, or make the interior angles tend to 180° and the apeirogon approaches a straight line. However, in hyperbolic geometry, a regular apeirogon or pseudogon has sides of any length (i.e., it remains a polygon with noticeable sides). The side and angle
bisectors will, depending on the side length and the angle between the sides, be limiting or diverging parallel. If the bisectors are limiting parallel then it is an apeirogon and can be inscribed and circumscribed by concentric
horocycles. If the bisectors are diverging parallel then it is a pseudogon and can be inscribed and circumscribed by
hypercycles (since all its vertices are the same distance from a line, the axis, and the midpoints of its sides are also equidistant from that same axis).
Tessellations of the hyperbolic plane, seen in the
Poincaré disk model Like the Euclidean plane it is also possible to tessellate the hyperbolic plane with
regular polygons as
faces. There are an infinite number of uniform tilings based on the
Schwarz triangles (
p q r) where 1/
p + 1/
q + 1/
r < 1, where
p,
q,
r are each orders of reflection symmetry at three points of the
fundamental domain triangle, the symmetry group is a hyperbolic
triangle group. There are also infinitely many uniform tilings that cannot be generated from Schwarz triangles, some for example requiring quadrilaterals as fundamental domains. == Standardized Gaussian curvature ==