A figure f is any non-empty subset of points of
space. A figure f is called invariant with respect to a
transformation S if S(f) = f; in this case the transformation
S is called a symmetry of the figure f. The set of points invariant with regard to
all the powers of a given symmetry S is called the
element of symmetry of the figure f. The identity
transformation of space is the transformation E under which
every point of space is invariant, i.e. E(P) = P holds for each
point P of the space. The identity transformation is a symmetry
of any given figure. Any figure whoose set of symmetries consists
only of the identity transformation E is called
asymmetric; any other figure is called symmetric. For
example, the capital letters A,B,C,D,E,K,M,T,U,V,W,Y are
mirror-symmetric, H,I,O,X doubly mirror-symmetric and
point-symmetric, N,S,Z point-symmetric, and F,G,J,P,Q,R
asymmetric. The letters b d or p q form the mirror symetric
pairs, and b q or p d the point-symmetric pairs.
For every two transformations S1, S2 of the same
space we define the product S1S2, as the composition
of the transformations: S1S2(P) = S2(S1(P)). In other words,
by product we mean the successive action of transformations
S1, S2. As a symbol for the composition S¼S, where
S occurs n times, we use Sn, i.e. the n-th power of the
transformation S. The order of the transformation S
is the minimal n (n Î N) for which Sn = E holds. If there
is no finite number n which satisfies the given relation, then
the transformation S is called a transformation of
infinite order. If n = 2, then the transformation S is called
an involution. If transformations S1 and S2 are such
that S1S2 = E, then S1 is called the inverse of
S2, and vice versa. We denote this relationship as
S1 = S2-1 and S2 = S1-1. For an involution S we
have S = S-1, and for the product of two transformations
(S1S2)-1 = S2-1S1-1 holds.
A transformation t which maps every line l onto a
line t(l) is a collineation. An
affine
transformation (or linear transformation) is a collineation of
the plane that preserves parallels.
As a binary operation * we understand any rule
which assigns to each ordered pair (A,B) a certain element C
written as A *B = C, or in the short form, AB = C. A
structure (G,*) formed by a set G and a binary operation
* is a group if it satisfies the axioms:
a1) (closure): for all A1,A2 Î G, A1A2 Î G is satisfied;
a2) (associativity): for all A1,A2,A3 Î G,
(A1A2)A3 = A1(A2A3) is satisfied;
a3) (existence of neutral element): there exists E Î G
that for each A1 Î G the equality A1E = A1 is satisfied;
a4) (existence of inverse element): for each A1 Î G there
exists A1-1 Î G so that A1-1A1 = E is satisfied.
If besides a1-a4) also holds
a5) (commutativity): for all A1,A2 Î G,
A1A2 = A2A1 is satisfied, the group is commutative or
abelian.
The order of a group G is the number of elements
of the group; we distinguish finite and infinite
groups. The power and the order of a group element
are defined analogously to the definition of the power and the
order of a transformation.
A figure f is said to be an invariant of the
group of transformations G if it is invariant with respect to
all its transformations, i.e. if A1(f) = f for every
A1 Î G. All symmetries of a figure f form a group, that we call
the group of symmetries of f and denote by Gf. For
example, all the symmetries of a square (Figure 1.1a) form the
non-abelian group, consisting of identity transformation E,
reflections R, R1, R1RR1, RR1R, and rotations RR1,
(RR1)2, R1R - the symmetry group of square D4.
The order of reflections is 2, the order of rotations RR1,
R1R is 4, and the order of half-turn (RR1)2 is 2. This
group consists of 8 elements, so it is of order 8. The elements
of the same group, expressed as products of reflection R and
rotation S of order 4 are: identity E, reflections R, RS,
RS2, SR, and rotations S, S2 and S3. Instead of a
square, we may consider the plane tiling having the same symmetry
(Figure 1.1b).
A subset H of group G, which by itself constitutes a
group with the same binary operation, is called a subgroup
of group G if and only if (iff) for all A1,
A2 Î H, A1A2-1 Î H. Subgroups H = G and H = {E} of each
group G are called trivial, while the other subgroups are
nontrivial subgroups of the group G. In the symmetry
group of square, identity transformation E and rotations S,
S2, S3 form the subgroup of the order 4 - the rotational
subgroup of square C4.
Groups (G1, *) and (G2, °) are called
isomorphic if there exists a one-to-one and onto mapping i of
elements of the group G1 onto elements of the group G2, so
that for all A1,A2 Î G1,
i(A1 *A2) = i(A1) °i(A2) holds; the mapping i is called an isomorphism.
For example, by the mapping i(R) = R, i(R1) = RS is defined the
isomorphism of the symmetry group of square generated by
reflections R,R1, with the same group generated by
reflection R and rotation S. Any isomorphism of a group G
with itself is called an automorphism.
(a) Symmetric figure (square) consisting of equaly arranged
congruent parts (1-8) and its symmetry transformations: identity
transformation E (
1 « 1, 2 « 2, 3« 3, 4 « 4, 5 « 5, 6« 6, 7 « 7, 8 « 8),
reflections R (
1 « 2, 3 « 8, 4« 7, 5 « 6), R1
(
1« 4, 2 « 3, 5 « 8, 6« 7), R1RR1 (
1 « 6, 2« 5, 3 « 4, 7 « 8),
RR1R (
1 « 8, 2 « 7, 3« 6, 4 « 5), rotations R1R (
1® 7, 2 ® 8, 3 ® 1, 4 ®2, 5 ® 3, 6 ® 4, 7 ® 5, 8® 6), RR1 (
1 ® 3, 2 ® 4, 3® 5, 4 ® 6, 5 ® 7, 6 ®8, 7 ® 1, 8 ® 2) and half-turn (RR1)2
(
1 « 5, 2 « 6, 3 « 7,4 « 8). The order of the symmetry group of square
D4 is equal to the number of congruent parts (8); (b)
plane tiling with the same symmetry.
Instead of representing the group in the traditional way,
by means of its Cayley table, which offers a listing of
all the elements of the group and their compositions (products),
complete information about the group is given more effectively
and concisely by a group presentation (i.e. abstract,
generating definition): a set of generators and defining
relations. The group of transformations G is discrete if
for each point P of the space in which the group G acts there
is a positive distance d = d(P) such that no image of P
(distinct from P) under an element of G is at distance less
than d from P. The set { S1,S2,¼,Sm } of elements
of a discrete group G is called a set of generators of
G if every element of the group can be expressed as a finite
product of their powers (including negative powers). Relations
gk(S1,S2,¼,Sm) = E, k = 1,2,¼,s, are called
defining relations if all other relations which S1,
S2,¼, Sm satisfy are algebraic consequences of the
defining relations (H.S.M. Coxeter, W.O.J. Moser, 1980). So that,
in further discussions each discrete group will be given by a set
of generators and defining relations, i.e. by a presentation.
The symmetry group of square is given by Cayley table:
and by the presentation:
or by Cayley table:
and by the presentation:
By "structure of the group" we understand its
isomorphism with some of the basic, well known groups (e.g.,
cyclic group Cn, dihedral group Dn,¼) or with a
direct product of such groups. The cyclic group Cn is given
by the presentation: {S} Sn = E, and the dihedral
group Dn can be given by two isomorphic presentations:
{R,R1} R2 = R12 = (RR1)n = E or
{S,R} Sn = R2 = (RS)2 = E. Hence, the structure of the symmetry group of
square is D4, and the structure of its rotational subgroup is
C4.
For groups G and G1, G ÇG1 = {E}, given by
presentations (1), (2) we define the direct product
G×G1 as the group with the set of generators
{S1,S2,¼,Sm,S1',S2',¼,Sn'}, the set of defining
relations of which is, besides the relations (1), (2), made up of
relations SiSj' = Sj'Si, i = 1,2,¼,m, j = 1,2,¼,n. For
each group G we can discuss the possibility of it being
decomposed, i.e. represented as the direct product of its
nontrivial subgroups. A group which allows such a decomposition
we call reducible, otherwise it is called irreducible.
For example, the direct product of two cyclic
groups, C3 given by the presentation {S} S3 = E and
C2 given by {T} T2 = E is the group
{S,T} S3 = T2 = E ST = TS. By the substitution U = ST, this results in the
presentation {U} U6 = E, so
C3×C2 @ C6, showing that the group C6 is reducible.
The term "decomposition" can be used in another sense.
Each group can be decomposed according to its subgroup H:
According to those basic geometric-algebraic assumptions,
we can consider as the subject of this study the analysis of
plane figures - ornamental motifs and their invariance with
respect to symmetry groups.
The set of points G(P) = {g(P) | g Î G}, obtained
from a point P by all transformations of the group G, is
called the orbit of P with respect to G; it is the set
of points equivalent to point P (or the transitivity class of
P) with respect to the group G. Analogously we can also
define the orbit (or transitivity class) of any figure f with
respect to the group G and denote it by G(f). A point P
which is invariant with respect to a transformation S, i.e. a
point for which S(P) = , is also called singular. A
figure f is invariant with respect to a transformation S if
S(f) = f. A point P is a singular (invariant) point of a group
G if it is a singular (invariant) point of all transformations
of G. A point which is not an invariant point of a
transformation S is also called a point in general
position with respect to the transformation S. A point is said
to be a point in general position with respect to a group of
transformations G if it is in general position with respect to
all the transformations of the group G, i.e. if it is not an
invariant point of any transformation of the group G. For
example, the singular (invariant) point of the symmetry group of
square is the center of square. The points belonging to the
mirror-reflection lines are the invariant points of the
corresponding reflections. All other plane points, are the points
in general position with respect to the symmetry group of square
(Figure 1.1).
The orbit of some point P in general position with
respect to the discrete group of transformations G makes
possible a schematic interpretation of the group G: a
Cayley diagram or a graph of the group G - a visual
model of discrete group of transformations G. To each vertex of
the graph corresponds exactly one element of the group, and to
each edge corresponds one transformation. The edges which connect
the homologous points of the same transformation are denoted by
the same type of line (full, broken, dotted). The non-oriented
edges correspond to the involutions. For any other, oriented
edge, the motion in the direction of the arrow indicates the
multiplication by the corresponding transformation from the
right, and the motion in the opposite direction of the arrow
corresponds to multiplication by the inverse of the
corresponding transformation on the right. A Cayley diagram is a
connected graph, i.e. there exists a path which connects
every two vertexes of the graph. It represents the direct visual
interpretation of the presentation of the group, since to every
closed cycle there corresponds one defining relation (1). A
complete graph is considered to be the graph in which every two
vertexes are directly linked by the edge (Figure 1.2).
(a) Graph of the group C4 given by the presentation
{S} S4 = E; (b) the complete graph of the same group.
For a discrete group G it is possible to define a
fundamental region of G. A fundamental region F is a figure
which satisfies the following conditions:
a) for each point P
of the space where the group of transformations G acts, there
exists S Î G that P Î S(F);
b) for each
S Î G\{E} holds int(F)Çint(S(F)) = Æ. If
Cl(F) is the closure of F, the orbit G(Cl(F)) represents a
tiling of the space on which the group G acts. A space
tiling or tessellation is a countable family of closed
sets T = {T1,T2,¼} covering space without gaps or
overlaps. More explicitly, the union of the sets
T1, T2,¼, which are known as the tiles of T, is to be the
whole space, and the interiors of the sets Ti are to be
pairwise disjoint (B. Grünbaum, G.C. Shephard, 1987). Since a
fundamental region F has no points which are equivalent under
any transformation of the group G, unless they are on the
boundary, each internal point of F is a point in general
position with respect to the group G. Regarding the extent of
the fundamental region we distinguish between groups with bounded
and unbounded fundamental regions. A discrete group of
transformations G usually does not determine uniquely the
fundamental region, or the induced tiling G(Cl(F)). Therefore,
it is of interest to inquire about the different possible shapes
of the fundamental region. In the tiling G(Cl(F)) the
intersection of tiles of any finite set of tiles (containing at
least two distinct tiles) may be empty or may consist of a set of
isolated points (vertices) and arcs (edges). When discussing
variations of the form of the fundamental region F we
distinguish between two aspects of change: the change in the
number of vertices and edges of the fundamental region F, and
the change of the form of the edges (arcs) themselves in which
the number of vertices and edges remains unchanged. As the result
of the action of the symmetry groups we have
tile-transitive or isohedral tilings. Their tiles belong
to the same class of transitivity G(Cl(F)), since for every two
tiles of G(Cl(F)) there exists a transformation of group G
which maps one tile onto the other (Figure 1.3).
(a) Isohedral plane tiling corresponding to the symmetry group
D4; (b) two isohedral plane tilings with different shape
of the fundamental region, corresponding to its rotational
symmetry subgroup C4.
If the symmetry group GT contains also transformations
which map any vertex of tiling T onto any other vertex, i.e. if
the vertices make up one class of transitivity, the tiling is
said to be isogonal. By a flag in a tiling we mean a triple
(V,E,T) consisting of a vertex V, an edge E and a tile T
which are mutually incident. A tiling is called regular if
its symmetry group is transitive on the flags of the tiling. In
particular, for the symmetry groups of ornaments there
exist exactly three regular tilings (regular tessellations) by
means of regular polygons. Each of them can be denoted by a
Schläfli symbol {p,q} denoting regular p-gons, where
q of them are incident with each vertex of the regular
tessellation: {4,4} , {3,6} , {6,3} . A
dual of regular tiling {p,q} is the regular tiling
{q,p} (Figure 1.4).
Regular tilings {4,4} , {3,6} and {6,3}.
A uniform or Archimedean tiling is an
isogonal plane tiling by regular polygons, which is
edge-to-edge, i.e. in which every vertex and edge of a tile is
a vertex and edge of the tiling. Each of the 11 types of uniform
tilings can be denoted by the symbol
(p1q1 p2q2 ¼pnqn) where p1,p2,¼,pn denote regular p-gons,
and q1,q2,¼,qn the number of adjacent regular p-gons
of the same type which are incident with one vertex. Besides
regular tessellations (36) = {3,6} ,(63) = {6,3} and
(44) = {4,4} the family of uniform tilings consists of
(34.6), (33.42), (32.4.3.4), (3.4.6.4), (3.6.3.6),
(3.122), (4.6.12) and (4.82) (J. Kepler, 1619) (Figure
1.5). The Archimedean tiling (34.6) occurs in two
enantiomorphic forms - "left" and "right".
Archimedean tilings.
An open circle (or open circular disk) is the set
of points X such that OX < r, where O is a fixed point and
r is a positive number. For OX £ r, the circle (circular
disk) is called a closed circle.
A transformation t is continuous if for any two
points P, Q of the plane it is possible to make t(P) and
t(Q) as close together as we wish, by taking P and Q
sufficiently close, and bicontinuous if both t and
t-1 are continuous. A homeomorphism or
topological transformation is any bicontinuous transformation.
The open (closed) topological disk is any plane set which
is homeomorphic image of an open (closed) circle.
A tiling T is normal if:
a) every tile of T is a topological disk;
b) the intersection of every two tiles of T is a connected set,
i.e. does not consist of two closed and disjoint subsets;
c) the tiles of T are uniformly bounded, i.e. there exist
circles c and C, with fixed radiuses, such that every tile
Ti of tiling T contains a translate of c and is contained
in a translate of C.
A tiling T is called homeohedral if it is normal
and is such that for any two tiles T1, T2 of T there
exists a homeomorphism of the plane that maps T onto T and
T1 onto T2. A normal tiling is called two-homeohedral
if its tiles form two transitivity classes under a homeomorphism
mapping T onto itself. For example, all non-regular Archimedean
tilings (Figure 1.5) are two-homeohedral.
A continuous set of points is any set of points
which satisfies the axiom(s) of continuity. Every continuous set
of points is a homeomorphic image of a line. Alongside the
discrete groups of transformations, continuous symmetry
groups may also be discussed. A symmetry group G of the space
E2 or E2\{O} is called continuous if the
orbit G(P) of a point in general position P with respect to
the group G satisfies one of the following conditions:
(i) G(P) is the complete space on which G acts; or
(ii) G(P) can be divided into disjoint continuous sets of
points, and for every point of each of these sets there is a
positive distance d = d(P) such that the circle c(P,d)
contains no points of any other of the sets mentioned. By the
terms "continuous group of translations, rotations, central
dilatations and dilative rotations" we mean that all translations
along one line, all rotations around one center, all central
dilatations with a common center, and all dilative rotations with
a common center and with a fixed angle, are elements of such a
group. In particular, the continuous symmetry groups of
ornaments, depending on whether they satisfy condition (i) or
(ii), are called the symmetry groups of continua or
semicontinua.
E R R1 R1RR1 RR1R RR1 (RR1)2 R1R
E E R R1 R1RR1 RR1R RR1 (RR1)2 R1R
R R E RR1 (RR1)2 R1R R1 R1RR1 RR1R
R1 R1 R1R E RR1 (RR1)2 R1RR1 RR1R R
R1RR1 R1RR1 (RR1)2 R1R E RR1 RR1R R R1
RR1R RR1R RR1 (RR1)2 R1R E R R1 R1RR1
RR1 RR1 RR1R R R1 R1RR1 (RR1)2 R1R E
(RR1)2 (RR1)2 R1RR1 RR1R R R1 R1R E RR1
R1R R1R R1 R1RR1 RR1R R E RR1 (RR1)2
{ R,R1 } R2 = R12 = (RR1)4 = E,
E R RS RS2 SR S S2 S3
E E R RS RS2 SR S S2 S3
R R E S S2 S3 RS RS2 SR
RS RS S3 E S S2 RS2 SR R
RS2 RS2 S2 S3 E S SR R RS
SR SR S S2 S3 E R RS RS2
S S SR R RS RS2 S2 S3 E
S2 S2 RS2 SR R RS S3 E S
S3 S3 RS RS2 SR R E S S2
{ S,R } S4 = R2 = (RS)2 = E.
G { S1,S2,¼,Sm } gk(S1,S2,¼,Sm) = E k = 1,2,¼,s (1)
G1 { S1',S2',¼,Sn' } hl(S1',S2',¼,Sn') = E l = 1,2,¼,t (2)
Sj' = Sj(S1,S2,¼,Sm) j = 1,2,¼,n (1')
Si = Si(S1',S2',¼,Sn') i = 1,2,¼,m (2')
G1 { R,R1} R2 = R12 = (RR1)4 = E (1)
G2 { S,R} S4 = R2 = (RS)2 = E (2)
S = RR1 (1')
R1 = RS (2')
R2 = (RS)2 = (RRS)4 = E S4 = R2 = (RS)2 = E (2)
(RR1)4 = R2 = (RRR1)2 = E R2 = R12 = (RR1)4 = E (1).
G = g1 H Èg2H ȼÈgnH ȼ
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