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Function that is invariant under all permutations of its variables
{\displaystyle f.} The most commonly encountered symmetric functions are polynomial functions, which are given by the symmetric polynomials. A related notion is alternating
Symmetric_function
Symmetric function invariant of graphs
The chromatic symmetric function is a symmetric function invariant of graphs studied in algebraic graph theory, a branch of mathematics. It is the weight
Chromatic_symmetric_function
important role in the representation theory of the symmetric group. The ring of symmetric functions can be given a coproduct and a bilinear form making
Ring_of_symmetric_functions
Mathematical function
the elementary symmetric polynomials are one type of basic building block for symmetric polynomials, in the sense that any symmetric polynomial can be
Elementary symmetric polynomial
Elementary_symmetric_polynomial
Type of function in linear algebra
a symmetric function if p ( − x ) = p ( x ) {\displaystyle p(-x)=p(x)} for all x ∈ X . {\displaystyle x\in X.} Every subadditive symmetric function is
Sublinear_function
Functions such that f(–x) equals f(x) or –f(x)
is self-symmetric with respect to the origin. If the domain of a real function is self-symmetric with respect to the origin, then the function can be uniquely
Even_and_odd_functions
Type of group in abstract algebra
The elements of the symmetric group on a set X are the permutations of X. The group operation in a symmetric group is function composition, denoted by
Symmetric_group
Invariance under a mathematical reflection
from its transformed image is called mirror symmetric. In formal terms, a mathematical object is symmetric with respect to a given operation such as reflection
Reflection_symmetry
the Stanley symmetric functions are a family of symmetric functions introduced by Richard Stanley (1984) in his study of the symmetric group of permutations
Stanley_symmetric_function
Polynomial invariant under variable permutations
a symmetric polynomial if for any permutation σ of the subscripts 1, 2, ..., n one has P(Xσ(1), Xσ(2), ..., Xσ(n)) = P(X1, X2, ..., Xn). Symmetric polynomials
Symmetric_polynomial
Boolean function whose output depends only on the number of true inputs
In mathematics, a symmetric Boolean function is a Boolean function whose value does not depend on the order of its input bits, i.e., it depends only on
Symmetric_Boolean_function
Expression in commutative algebra
algebra, the complete homogeneous symmetric polynomials are a specific kind of symmetric polynomials. Every symmetric polynomial can be expressed as a
Complete homogeneous symmetric polynomial
Complete_homogeneous_symmetric_polynomial
mathematics, the noncommutative symmetric functions form a Hopf algebra NSymm analogous to the Hopf algebra of symmetric functions. The Hopf algebra NSymm was
Noncommutative symmetric function
Noncommutative_symmetric_function
Algorithm
drawbacks of symmetric-key encryption, in comparison to asymmetric-key encryption (also known as public-key encryption). However, symmetric-key encryption
Symmetric-key_algorithm
Integral transform used in various branches of mathematics
often used in the analysis of spherically symmetric or axially symmetric functions. The Abel transform of a function f(r) is given by F ( y ) = 2 ∫ y ∞ f (
Abel_transform
Elements in exactly one of two sets
Boolean ring, with symmetric difference as the addition of the ring and intersection as the multiplication of the ring. The symmetric difference is equivalent
Symmetric_difference
Relations between power sums and elementary symmetric functions
give relations between two types of symmetric polynomials, namely between power sums and elementary symmetric polynomials. Evaluated at the roots of
Newton's_identities
Formula that provides the solutions to a quadratic equation
are symmetric polynomials in α {\displaystyle \alpha } and β {\displaystyle \beta } . Specifically, they are the elementary symmetric polynomials
Quadratic_formula
symmetric product. That means that at the level of function fields it is possible to construct J by taking linearly disjoint copies of the function field
Symmetric product of an algebraic curve
Symmetric_product_of_an_algebraic_curve
continuity implies symmetric continuity, but the converse is not true. For example, the function x − 2 {\displaystyle x^{-2}} is symmetrically continuous at
Symmetrically continuous function
Symmetrically_continuous_function
Type of kernel induced by artificial neural networks
from kernel methods. In general, a kernel is a positive-semidefinite symmetric function of two inputs which represents some notion of similarity between the
Neural_tangent_kernel
symmetric functions Λ R ( x 1 , x 2 , … ) {\displaystyle \Lambda _{R}(x_{1},x_{2},\ldots )} is generated as an R-algebra by the power sum symmetric functions
Plethystic_substitution
symmetrization is a process that converts any function in n {\displaystyle n} variables to a symmetric function in n {\displaystyle n} variables. Similarly
Symmetrization
the power sum symmetric polynomials are a type of basic building block for symmetric polynomials, in the sense that every symmetric polynomial with
Power sum symmetric polynomial
Power_sum_symmetric_polynomial
Mathematical formula
ω involution on the ring of symmetric functions, one obtains the dual Pieri rule for multiplying an elementary symmetric polynomial with a Schur polynomial:
Pieri's_formula
Area of mathematics
potential applications, from symmetric function theory to quantum chemistry studies of atoms, molecules and solids. The symmetric group Sn has order n!. Its
Representation theory of the symmetric group
Representation_theory_of_the_symmetric_group
Operation in differential calculus
sometimes called the symmetric difference quotient. A function is said to be symmetrically differentiable at a point x if its symmetric derivative exists
Symmetric_derivative
Generalization of the Jack polynomial
mathematics, the Jack function is a generalization of the Jack polynomial, introduced by Henry Jack. The Jack polynomial is a homogeneous, symmetric polynomial which
Jack_function
countable number of variables. This ring generalizes the ring of symmetric functions. This ring can be realized as a specific limit of the rings of quasisymmetric
Quasisymmetric_function
Type of symmetric polynomials in mathematics
Issai Schur, are certain symmetric polynomials in n variables, indexed by partitions, that generalize the elementary symmetric polynomials and the complete
Schur_polynomial
exponential function, translates addition into multiplication. This exponential operator appears naturally in the theory of symmetric functions, as a concise
Plethystic_exponential
Generalization of a positive-definite matrix
{X}}} be a nonempty set, sometimes referred to as the index set. A symmetric function K : X × X → R {\displaystyle K:{\mathcal {X}}\times {\mathcal {X}}\to
Positive-definite_kernel
Function that derives secret keys from a secret value
key exchange into a symmetric key for use with AES. Keyed cryptographic hash functions are popular examples of pseudorandom functions used for key derivation
Key_derivation_function
Product of numbers from 1 to n
for symmetric polynomials. Their use in counting permutations can also be restated algebraically: the factorials are the orders of finite symmetric groups
Factorial
Mathematical formula
variety. In the theory of symmetric functions, the same identity, known as the first Jacobi-Trudi identity expresses Schur functions as determinants in terms
Giambelli's_formula
Relating coefficients and roots of a polynomial
Properties of polynomial roots Rational root theorem Symmetric polynomial and elementary symmetric polynomial R Rashed, Résolution des équations numériques
Vieta's_formulas
Function in mathematical analysis
that is convex and symmetric (under permutations of the arguments) is also Schur-convex. Every Schur-convex function is symmetric, but not necessarily
Schur-convex_function
Mathematical rule
representation theory of the symmetric group, or in the area of algebraic combinatorics dealing with Young tableaux and symmetric polynomials. Littlewood–Richardson
Littlewood–Richardson_rule
Type of mathematical function
In mathematics, the symmetric decreasing rearrangement of a function is a function which is symmetric and decreasing, and whose level sets are of the
Symmetric decreasing rearrangement
Symmetric_decreasing_rearrangement
Decomposition of periodic functions
of a real-valued function ( s R E + s R O ) {\displaystyle (s_{\mathrm {RE} }+s_{\mathrm {RO} })} is the conjugate symmetric function S R E + i S I O
Fourier_series
Combinatorial object in representation theory
1}}=66528.} A representation of the symmetric group on n elements, Sn is also a representation of the symmetric group on n − 1 elements, Sn−1. However
Young_tableau
polynomials are symmetric functions depending on a parameter t and a partition λ. They are Schur functions when t is 0 and monomial symmetric functions when t
Hall–Littlewood_polynomials
Functions in mathematics
generalized as follows: If h {\displaystyle h} is any spherically symmetric function supported in B ( x , r ) {\displaystyle B(x,r)} such that ∫
Harmonic_function
In functional analysis, a Hilbert space
kernel function that is both symmetric and positive definite. The Moore–Aronszajn theorem goes in the other direction; it states that every symmetric, positive
Reproducing kernel Hilbert space
Reproducing_kernel_Hilbert_space
Mathematical connection between field theory and group theory
originated in the study of symmetric functions – the coefficients of a monic polynomial are (up to sign) the elementary symmetric polynomials in the roots
Galois_theory
Mathematical concept
characters of symmetric groups and the ring of symmetric functions. It builds a bridge between representation theory of the symmetric groups and algebraic
Frobenius_characteristic_map
Mathematical transform that expresses a function of time as a function of frequency
transform of a real-valued function ( f RE + f RO {\displaystyle f_{_{\text{RE}}}+f_{_{\text{RO}}}} ) is the conjugate symmetric function f ^ RE + i f ^
Fourier_transform
Adams. The basic idea is to implement some fundamental identities in symmetric function theory, at the level of vector bundles or other representing object
Adams_operation
\dots ,x_{n}} ) behave thus: the product of two symmetric polynomials is symmetric, the product of a symmetric polynomial and an alternating polynomial is
Alternating_polynomial
Fourteenth letter in the Greek alphabet
Pareto distribution The symmetric function equation of the Riemann zeta function in mathematics, also known as the Riemann xi function A universal set in set
Xi_(letter)
Mathematical formula for the number of Young tableaux
1960. Sagan, Bruce (2001). The Symmetric Group. Representations, Combinatorial Algorithms, and Symmetric Functions, 2nd edition. Springer-Verlag. ISBN 0-387-95067-2
Hook_length_formula
Concept in mathematics
just symmetric forms when "bilinear" is understood. Symmetric bilinear forms on finite-dimensional vector spaces precisely correspond to symmetric matrices
Symmetric_bilinear_form
is symmetric in the Xi and the elementary symmetric polynomials generate all symmetric polynomials.) Now let e1, ..., en be the elementary symmetric polynomials
Λ-ring
to negation: Even function: is symmetric with respect to the Y-axis. Formally, for each x: f (x) = f (−x). Odd function: is symmetric with respect to the
List_of_types_of_functions
Function in Chemistry
those that are symmetric or antisymmetric with respect to the nuclear permutations produced by the rotation. For the case of a symmetric diatomic with
Rotational_partition_function
Branch of mathematics
transform of a real-valued function ( s R E + s R O ) {\displaystyle (s_{_{RE}}+s_{_{RO}})} is the conjugate symmetric function S R E + i S I O . {\displaystyle
Fourier_analysis
Polynomial function of degree 3
Otherwise, a cubic function is monotonic. The graph of a cubic function is symmetric with respect to its inflection point; that is, it is invariant under
Cubic_function
British mathematician (1928–2023)
known to Freeman Dyson. His 1979 book Symmetric Functions and Hall Polynomials has become a classic. Symmetric functions are an old theory, part of the theory
Ian_G._Macdonald
Equations of degree 5 or higher cannot be solved by radicals
the proof that the symmetric group is not solvable if its degree is five or higher; and the existence of polynomials with a symmetric Galois group. An algebraic
Abel–Ruffini_theorem
Mathematical relation assigning a probability event to a cost
optimization and decision theory, a loss function or cost function (sometimes also called an error function) is a function that maps an event or values of one
Loss_function
Linked list data structure
else insertBefore(list, list.firstNode, newNode) A symmetric function inserts at the end: function insertEnd(List list, Node newNode) if list.lastNode
Doubly_linked_list
interpreted via the Hall–Littlewood symmetric functions. Specializing q to 1, these symmetric functions become Schur functions, which are thus closely connected
Hall_algebra
Polynomial equation of degree 3
are symmetric functions of the roots. Using Newton's identities, it is straightforward to express them in terms of the elementary symmetric functions of
Cubic_equation
In algebra, plethysm is an operation on symmetric functions introduced by Dudley E. Littlewood, who denoted it by {λ} ⊗ {μ}. The word "plethysm" for this
Plethysm
Matrix equal to its transpose
a symmetric matrix is a square matrix that is equal to its transpose. Formally, A is symmetric ⟺ A = A T . {\displaystyle A{\text{ is symmetric}}\iff
Symmetric_matrix
Structure defining distance on a manifold
of a symmetric matrix whose entries transform covariantly under changes to the coordinate system. Thus a metric tensor is a covariant symmetric tensor
Metric_tensor
Array of nonnegative integers in combinatorics
classified by how symmetric they are. Many symmetric classes of plane partitions are enumerated by simple product formulas. The generating function for PL(n)
Plane_partition
Area of combinatorics
commutative algebra are commonly used. The ring of symmetric functions is a specific limit of the rings of symmetric polynomials in n indeterminates, as n goes
Algebraic_combinatorics
Decomposition of an integer as a sum of positive integers
branches of mathematics and physics, including the study of symmetric polynomials and of the symmetric group and in group representation theory in general. The
Integer_partition
polynomial is a multivariate symmetric homogeneous polynomial. The zonal polynomials form a basis of the space of symmetric polynomials. Zonal polynomials
Zonal_polynomial
were introduced by the mathematician Carl Kostka in his study of symmetric functions (Kostka (1882)). For example, if λ = ( 3 , 2 ) {\displaystyle \lambda
Kostka_number
British statistician
ISBN 978-0-85264-057-9 1962: Games, Gods and Gambling ISBN 978-0-85264-171-2. 1966: Symmetric function and allied tables 1968: Normal centroids, medians and scores for ordinal
Florence_Nightingale_David
Tool for solving polynomial equations
certain information in the form of the valuations of elementary symmetric functions of the roots of a polynomial, and require information on the valuations
Newton_polygon
Mathematical operation
circularly symmetric functions states that F A = H . {\displaystyle FA=H.} In other words, applying the Abel transform to a 1-dimensional function and then
Hankel_transform
Construction in algebra
Hazewinkel, Michiel (January 2003). "Symmetric Functions, Noncommutative Symmetric Functions, and Quasisymmetric Functions". Acta Applicandae Mathematicae
Hopf_algebra
Type of probability distribution
zero for a symmetric distribution. The following distributions are symmetric for all parametrizations. (Many other distributions are symmetric for a particular
Symmetric probability distribution
Symmetric_probability_distribution
Polynomial with 1 as leading coefficient
are simpler in the case of monic polynomials: The kth elementary symmetric function of the roots of a monic polynomial of degree n equals ( − 1 ) k c
Monic_polynomial
Type of computer arithmetic
operations, were introduced by Charles Clenshaw and Frank Olver in 1984. The symmetric form of the LI system and its arithmetic operations were presented by
Symmetric level-index arithmetic
Symmetric_level-index_arithmetic
Measure of cryptographic strength
the primitive is considered broken. Symmetric algorithms usually have a strictly defined security claim. For symmetric ciphers, it is typically equal to
Security_level
Probability distribution
is not symmetric DKL(X1 || X2) ≠ DKL(X2 || X1) for the case in which the individual beta distributions Beta(1, 1) and Beta(3, 3) are symmetric, but have
Beta_distribution
Mathematical concept for comparing objects
mathematics, an equivalence relation is a binary relation that is reflexive, symmetric, and transitive. The equipollence relation between line segments in geometry
Equivalence_relation
Used for encoding or decoding ciphertext
ciphertext. There are different methods for utilizing keys and encryption. Symmetric cryptography refers to the practice of the same key being used for both
Key_(cryptography)
Statistical distance measure
=\left({\frac {1}{2}},{\frac {1}{2}}\right)} and two density matrices is a symmetric function, everywhere defined, bounded and equal to zero only if two density
Jensen–Shannon_divergence
Theorem in mathematics
generalized from the above example. If the two-dimensional function f(r) is circularly symmetric, it may be represented as f(r), where r = |r|. In this case
Projection-slice_theorem
Orthogonal symmetric polynomial family
family of orthogonal symmetric polynomials in several variables, introduced by Macdonald in 1987. He later introduced a non-symmetric generalization in 1995
Macdonald_polynomials
Multi particle state space
functions on three-dimensional space. The Fock spaces then have a natural interpretation as symmetric or anti-symmetric square integrable functions as
Fock_space
Operation on mathematical functions
that any group is in fact just a subgroup of a symmetric group (up to isomorphism). In the symmetric semigroup (of all transformations) one also finds
Function_composition
Function used in signal processing
zero-valued outside of some chosen interval. Typically, window functions are symmetric around the middle of the interval, approach a maximum in the middle
Window_function
Classical averages studied in ancient Greece
{\displaystyle i} and j {\displaystyle j} . This ensures that the mean is a symmetric function whose value does not depend upon the order of its arguments. Monotonicity
Pythagorean_means
theory (but not intended to include every mathematical eponym). Named symmetric functions, and other special polynomials, are included. Contents: Top 0–9
List of eponyms of special functions
List_of_eponyms_of_special_functions
of the weight. In turn this implies that the Schur function of a partition is a symmetric function. Bender–Knuth involutions were used by Stembridge (2002)
Bender–Knuth_involution
Order-preserving mathematical function
In mathematics, a monotonic function (or monotone function) is a function between ordered sets that preserves or reverses the given order. This concept
Monotonic_function
Description of physical properties at the atomic and subatomic scale
wave function surrounding the nucleus. For example, the electron wave function for an unexcited hydrogen atom is a spherically symmetric function known
Quantum_mechanics
Mathematical function with multiple real-number arguments
t)=t^{2}-x^{2}-y^{2}-z^{2}} is symmetric in x, y, z since interchanging any pair of x, y, z leaves f unchanged, but is not symmetric in all of x, y, z, t, since
Function of several real variables
Function_of_several_real_variables
Property of some cryptosystems
asymmetric-key cryptosystem, it can be adapted to the symmetric case by replacing the public-key encryption function with an encryption oracle, which retains the
Ciphertext indistinguishability
Ciphertext_indistinguishability
Association of one output to each input
mathematics, a function from a set X to a set Y assigns to each element of X exactly one element of Y. The set X is called the domain of the function and the
Function_(mathematics)
Linear operator equal to its own adjoint
A^{**}\subseteq A^{*}} for symmetric operators and A = A ∗ ∗ ⊆ A ∗ {\displaystyle A=A^{**}\subseteq A^{*}} for closed symmetric operators. The densely defined
Self-adjoint_operator
Form of a matrix
That is, it satisfies the condition A skew-symmetric ⟺ A T = − A . {\displaystyle A{\text{ skew-symmetric}}\quad \iff \quad A^{\textsf {T}}=-A.} In terms
Skew-symmetric_matrix
Of a Kronecker product (combinatorics)
}^{\lambda }V_{\lambda }.} One can interpret this on the level of symmetric functions, giving a formula for the Kronecker product of two Schur polynomials:
Kronecker_coefficient
Effect in signal processing
function hann(9,'symmetric'). Deleting the last sample produces a sequence identical to hann(8,'periodic'). Similarly, the sequence hann(8,'symmetric')
Spectral_leakage
SYMMETRIC FUNCTION
SYMMETRIC FUNCTION
Male
Egyptian
, the son of the functionary Heknofre.
Male
Egyptian
, Functionary of the Interior.
Girl/Female
African, Arabic, Muslim, Swahili
Symmetry
Surname or Lastname
English
English : topographic name for someone who lived by the gates of a medieval walled town. The Middle English singular gate is from the Old English plural, gatu, of geat ‘gate’ (see Yates). Since medieval gates were normally arranged in pairs, fastened in the center, the Old English plural came to function as a singular, and a new Middle English plural ending in -s was formed. In some cases the name may refer specifically to the Sussex place Eastergate (i.e. ‘eastern gate’), known also as Gates in the 13th and 14th centuries, when surnames were being acquired.Americanized spelling of German Götz (see Goetz).Translated form of French Barrière (see Barriere).In New England, Gates was the preferred English version of the name of an extensive French family, called Barrière dit Langevin.
Male
Egyptian
, a great functionary.
Boy/Male
Buddhist, Indian, Japanese
Mysterious Function
Boy/Male
Hindu
Symmetry, Harmony
Boy/Male
Sikh
Symmetry, Harmony
Male
Egyptian
, an Egyptian functionary.
Male
Celtic
, great justiciary, or functionary.
Male
Egyptian
, an Egyptian functionary.
Surname or Lastname
English
English : nickname from the animal, Middle English catte ‘cat’. The word is found in similar forms in most European languages from very early times (e.g. Gaelic cath, Slavic kotu). Domestic cats were unknown in Europe in classical times, when weasels fulfilled many of their functions, for example in hunting rodents. They seem to have come from Egypt, where they were regarded as sacred animals.English : from a medieval female personal name, a short form of Catherine.Variant spelling of German and Dutch Katt.
Male
Egyptian
, a high Egyptian functionary.
Surname or Lastname
English
English : occupational name for a dresser of cloth, Old English fullere (from Latin fullo, with the addition of the English agent suffix). The Middle English successor of this word had also been reinforced by Old French fouleor, foleur, of similar origin. The work of the fuller was to scour and thicken the raw cloth by beating and trampling it in water. This surname is found mostly in southeast England and East Anglia. See also Tucker and Walker.In a few cases the name may be of German origin with the same form and meaning as 1 (from Latin fullare).Americanized version of French Fournier.Samuel Fuller (1589–1633), born in Redenhall, Norfolk, England, was among the Pilgrim Fathers who sailed on the Mayflower in 1620. He was a deacon of the church and until his death functioned as Plymouth Colony’s physician.
Boy/Male
Tamil
Symmetry, Harmony
Surname or Lastname
English (chiefly Kent and Sussex)
English (chiefly Kent and Sussex) : occupational name for a designer or engineer, from a Middle English reduced form of Old French engineor ‘contriver’ (a derivative of engaigne ‘cunning’, ‘ingenuity’, ‘stratagem’, ‘device’). Engineers in the Middle Ages were primarily designers and builders of military machines, although in peacetime they might turn their hands to architecture and other more pacific functions.German : from the Latin personal name Januarius (see January 1). Jänner is a South German word for ‘January’, and so it is possible that this is one of the surnames acquired from words denoting months of the year, for example by converts who had been baptized in that month, people who were born or baptized in that month, or people whose taxes were due in January.
Biblical
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SYMMETRIC FUNCTION
SYMMETRIC FUNCTION
Boy/Male
Norse
A mythical cloak that renders its wearer invisible.
Boy/Male
Tamil
God of law, One well versed in law, Follower of the correct way, Master of the right path
Male
Hindi/Indian
(वासिषà¥à¤ ) Variant spelling of Hindi Vasistha, VASISHTHA means "most excellent sage."
Surname or Lastname
English
English : variant of Figg.
Surname or Lastname
English
English : from a vernacular form of the Late Latin personal name Dominicus ‘of the Lord’. This was borne by a Spanish saint (1170–1221) who founded the Dominican order of friars. In medieval England it may have been used as a personal name for a child born on a Sunday. As an English surname it is comparatively rare, and in the U.S. it has undoubtedly absorbed cognates in other European languages; for the forms, see Hanks and Hodges 1988.
Girl/Female
Assamese, Hindu, Indian, Kannada, Malayalam, Marathi, Telugu
Flower; Female Friend; Memory
Boy/Male
Hindu
A part of the mind
Girl/Female
English Latin
Golden.
Boy/Male
Arabic, Australian
Good
Boy/Male
Indian
Good news
SYMMETRIC FUNCTION
SYMMETRIC FUNCTION
SYMMETRIC FUNCTION
SYMMETRIC FUNCTION
SYMMETRIC FUNCTION
a.
Alt. of Asymmetrical
n.
One eminently studious of symmetry of parts.
a.
Well-proportioned; symmetrical.
a.
Symmetrical.
a.
Abnormally regular or symmetrical.
a.
Having the organs or parts of one side corresponding with those of the other; having the parts in two or more series of organs the same in number; exhibiting a symmetry. See Symmetry, 2.
imp. & p. p.
of Symmetrize
n.
A kind of symmetry characteristic of certain crystals which from twinning, or other causes, come to resemble forms of a system other than that to which they belong, as the apparently hexagonal prisms of aragonite.
a.
Involving or exhibiting symmetry; proportional in parts; having its parts in due proportion as to dimensions; as, a symmetrical body or building.
n.
Same as Symmetrian.
a.
Not symmetrical; being without symmetry, as the parts of a flower when similar parts are of different size and shape, or when the parts of successive circles differ in number. See Symmetry.
n.
Harmonic relation between parts, or between different things of the same kind; symmetrical arrangement or adjustment; symmetry; as, to be out of proportion.
p. pr. & vb. n.
of Symmetrize
v. t.
To make proportional in its parts; to reduce to symmetry.
a.
Symmetrical.
a.
Commensurable; symmetrical.
n.
One eminently studious of symmetry of parts.
a.
Not symmetrical; wanting proportion; esp., not bilaterally symmetrical.
a.
Exhibiting pseudo-symmetry.
n.
The law of likeness; similarity of structure; regularity in form and arrangement; orderly and similar distribution of parts, such that an animal may be divided into parts which are structurally symmetrical.