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elliptic complex generalizes the notion of an elliptic operator to sequences. Elliptic complexes isolate those features common to the de Rham complex
Elliptic_complex
Algebraic curve in mathematics
mathematics, an elliptic curve is a smooth, projective, algebraic curve of genus one, on which there is a specified point O. An elliptic curve is defined
Elliptic_curve
Mathematical manifold theory
decomposition for the de Rham complex. Atiyah and Bott defined elliptic complexes as a generalization of the de Rham complex. The Hodge theorem extends to
Hodge_theory
Class of periodic mathematical functions
of complex analysis, elliptic functions are special kinds of meromorphic functions, that satisfy two periodicity conditions. They are named elliptic functions
Elliptic_function
Theory of a class of elliptic curves
In mathematics, complex multiplication (CM) is the theory of elliptic curves E that have an endomorphism ring larger than the integers. Put another way
Complex_multiplication
Mathematical concept
genus 1. (Over an algebraically closed field such as the complex numbers, these fibers are elliptic curves, perhaps without a chosen origin.) This is equivalent
Elliptic_surface
Mathematical function
Jacobi elliptic functions are used more often in practical problems than the Weierstrass elliptic functions as they do not require notions of complex analysis
Jacobi_elliptic_functions
Fixed-point theorem for smooth manifolds
which uses an elliptic complex on M. This is a system of elliptic differential operators on vector bundles, generalizing the de Rham complex constructed
Atiyah–Bott fixed-point theorem
Atiyah–Bott_fixed-point_theorem
Mathematical result in differential geometry
proved by Michael Atiyah and Isadore Singer (1963), states that for an elliptic differential operator on a compact manifold, the analytical index (related
Atiyah–Singer_index_theorem
Type of differential operator
In the theory of partial differential equations, elliptic operators are differential operators that generalize the Laplace operator. They are defined by
Elliptic_operator
British-Lebanese mathematician (1929–2019)
an elliptic complex. Reprinted in (Atiyah 1988c, paper 61). Atiyah, Michael F.; Bott, Raoul (1967), "A Lefschetz Fixed Point Formula for Elliptic Complexes:
Michael_Atiyah
Approach to public-key cryptography
Elliptic-curve cryptography (ECC) is an approach to public-key cryptography based on the algebraic structure of elliptic curves over finite fields. ECC
Elliptic-curve_cryptography
Special function defined by an integral
In integral calculus, an elliptic integral is one of a number of related functions defined as the value of certain integrals, which were first studied
Elliptic_integral
mathematics, the Dixon elliptic functions sm and cm are two elliptic functions (doubly periodic meromorphic functions on the complex plane) that map from
Dixon_elliptic_functions
Signal processing filter
An elliptic filter (also known as a Cauer filter, named after Wilhelm Cauer, or as a Zolotarev filter, after Yegor Zolotarev) is a signal processing filter
Elliptic_filter
Mathematical concept
the j-invariant for which a complex elliptic curve has complex multiplication. The complex elliptic curves with complex multiplication are those for
Supersingular_elliptic_curve
Class of mathematical functions
In mathematics, the Weierstrass elliptic functions are elliptic functions that take a particularly simple form. They are named for Karl Weierstrass. This
Weierstrass_elliptic_function
speaking, a pseudo-coherent complex may be thought of as a limit of perfect complexes. Hilbert–Burch theorem Elliptic complex (related notion; discussed
Perfect_complex
Unproved conjecture in mathematics
continuation to the whole complex plane.[citation needed] This conjecture was first proved by Max Deuring for elliptic curves with complex multiplication. It
Birch and Swinnerton-Dyer conjecture
Birch_and_Swinnerton-Dyer_conjecture
Mathematical classification of surfaces
subvarieties of it. The two-dimensional complex tori include the abelian surfaces. One-dimensional complex tori are just elliptic curves and are all algebraic,
Enriques–Kodaira classification
Enriques–Kodaira_classification
Riemann hypothesis Elliptic function Half-period ratio Jacobi's elliptic functions Weierstrass's elliptic functions Theta function Elliptic modular function
List of complex analysis topics
List_of_complex_analysis_topics
Quadric surface with one axis of symmetry and no center of symmetry
the complex numbers into two different linear factors. The paraboloid is hyperbolic if the factors are real; elliptic if the factors are complex conjugate
Paraboloid
Two geometries based on axioms closely related to those specifying Euclidean geometry
metric geometry. In the former case, one obtains hyperbolic geometry and elliptic geometry, the traditional non-Euclidean geometries. When isotropic quadratic
Non-Euclidean_geometry
One-dimensional complex manifold
\mathbb {Z} )} , where τ {\displaystyle \tau } is any complex non-real number. These are called elliptic curves. Important examples of non-compact Riemann
Riemann_surface
Algebraic invariant of topological spaces
In mathematics, elliptic cohomology is a cohomology theory in the sense of algebraic topology. It is related to elliptic curves and modular forms. Historically
Elliptic_cohomology
Special functions of several complex variables
functions occur most commonly in the theory of elliptic functions. With respect to one of the complex variables z {\displaystyle z} , a theta function
Theta_function
Methods to test or prove primality
In mathematics, elliptic curve primality testing techniques, or elliptic curve primality proving (ECPP), are among the quickest and most widely used methods
Elliptic_curve_primality
In mathematics Abel elliptic functions are a special kind of elliptic functions, that were established by the Norwegian mathematician Niels Henrik Abel
Abel_elliptic_functions
Mathematical operation on points on an elliptic curve
Elliptic curve scalar multiplication is the operation of successively adding a point along an elliptic curve to itself repeatedly. It is used in elliptic
Elliptic curve point multiplication
Elliptic_curve_point_multiplication
Mathematical curves that are isomorphic over algebraic closures
field of algebraic geometry, an elliptic curve E over a field K has an associated quadratic twist, that is another elliptic curve which is isomorphic to
Twists_of_elliptic_curves
Modular function in mathematics
each τ as representing an isomorphism class of elliptic curves. Every elliptic curve E over C is a complex torus, and thus can be identified with a rank
J-invariant
Analytic function on the upper half-plane with a certain behavior under the modular group
non-zero complex number α. Thus, a modular function can also be regarded as a meromorphic function on the set of isomorphism classes of elliptic curves
Modular_form
Non-Euclidean geometry
Elliptic geometry is an example of a geometry in which Euclid's parallel postulate does not hold. Instead, as in spherical geometry, there are no parallel
Elliptic_geometry
2D surface which extends indefinitely
intersect, so that every pair of lines intersects in exactly one point. The elliptic plane may be further defined by adding a metric to the real projective
Plane_(mathematics)
coefficients. Over the open subscheme where q is invertible, the Tate curve is an elliptic curve. The Tate curve can also be defined for q as an element of a complete
Tate_curve
Canadian-American mathematician (1925–2020)
previously understood for second-order elliptic partial differential equations, to the general setting of elliptic systems. With Basilis Gidas and Wei-Ming
Louis_Nirenberg
Class of partial differential equations
mathematics, an elliptic partial differential equation is a type of partial differential equation (PDE). In mathematical modeling, elliptic PDEs are frequently
Elliptic partial differential equation
Elliptic_partial_differential_equation
Way of defining a lattice in the complex plane
ordered pair of complex numbers that defines a lattice in the complex plane. This type of lattice is the underlying object with which elliptic functions and
Fundamental_pair_of_periods
Mathematical concept
the set of isomorphism classes of elliptic curves over R {\displaystyle R} . Since elliptic curves over the complex numbers are isomorphic (over an algebraic
J-line
Atiyah–Singer index theorem de Rham cohomology Dolbeault cohomology elliptic complex Hodge theory pseudodifferential operator Klein geometry, Erlangen programme
List of differential geometry topics
List_of_differential_geometry_topics
Type of smooth complex surface of kodaira dimension 0
families of complex analytic K3 surfaces with an elliptic fibration, and 18-dimensional moduli spaces of projective K3 surfaces with an elliptic fibration
K3_surface
Modular unit in mathematics
system. A system of elliptic units may be constructed for an elliptic curve E with complex multiplication by the ring of integers R of an imaginary quadratic
Elliptic_unit
Study of complex manifolds and several complex variables
Calabi–Yau manifolds are given by elliptic curves, K3 surfaces, and complex Abelian varieties. A complex Fano variety is a complex algebraic variety with ample
Complex_geometry
Elliptic analog of hypergeometric series
function of the complex number n. They were introduced by Date-Jimbo-Kuniba-Miwa-Okado (1987) and Frenkel & Turaev (1997) in their study of elliptic 6-j symbols
Elliptic hypergeometric series
Elliptic_hypergeometric_series
36 mathematical problems stated in 1955
According to Serge Lang, Taniyama's eleventh problem deals with elliptic curves with complex multiplication, but is unrelated to Taniyama's twelfth and thirteenth
Taniyama's_problems
Function with two complex number "periods"
zero. Elliptic function Abel elliptic functions Jacobi elliptic functions Weierstrass elliptic functions Lemniscate elliptic functions Dixon elliptic functions
Doubly_periodic_function
Mathematical concept
A modular elliptic curve is an elliptic curve E that admits a parametrization X0(N) → E by a modular curve. This is not the same as a modular curve that
Modular_elliptic_curve
Gauss sum on an elliptic curve
In mathematics, an elliptic Gauss sum is an analog of a Gauss sum depending on an elliptic curve with complex multiplication. The quadratic residue symbol
Elliptic_Gauss_sum
varieties are a natural generalization of elliptic curves to higher dimensions. However, unlike the case of elliptic curves, there is no well-behaved stack
Moduli_of_abelian_varieties
mathematics, a hyperelliptic surface, or bi-elliptic surface, is a minimal surface whose Albanese morphism is an elliptic fibration without singular fibres. Any
Hyperelliptic_surface
Concept in algebraic geometry
variety. One-dimensional complex tori are just elliptic curves and are all algebraic, but Riemann discovered that most complex tori of dimension 2 are
Abelian_surface
Theorem in complex analysis
In complex analysis, Liouville's theorem states that every bounded entire function must be constant. That is, every holomorphic function f {\displaystyle
Liouville's theorem (complex analysis)
Liouville's_theorem_(complex_analysis)
2D coordinate system whose coordinate lines are confocal ellipses and hyperbolae
In geometry, the elliptic coordinate system is a two-dimensional orthogonal coordinate system in which the coordinate lines are confocal ellipses and hyperbolae
Elliptic_coordinate_system
Theorem in complex geometry
theory applied to a compact Kähler manifold. The Hodge theorem for an elliptic complex may be applied to any of the operators d , ∂ , ∂ ¯ {\displaystyle d
Ddbar_lemma
Algebraic stack in mathematics
In mathematics, the moduli stack of elliptic curves, denoted as M 1 , 1 {\displaystyle {\mathcal {M}}_{1,1}} or M e l l {\displaystyle {\mathcal {M}}_{\mathrm
Moduli stack of elliptic curves
Moduli_stack_of_elliptic_curves
17th-century conjecture proved by Andrew Wiles in 1994
Goro Shimura and Yutaka Taniyama suspected a link might exist between elliptic curves and modular forms, two completely different areas of mathematics
Fermat's_Last_Theorem
Mathematical function associated to algebraic varieties
meromorphic function for all complex s, and should satisfy a functional equation similar to that of the Riemann zeta function. For elliptic curves over the rational
Hasse–Weil_zeta_function
Mathematical functions
In mathematics, the lemniscate elliptic functions are elliptic functions related to the arc length of the lemniscate of Bernoulli. They were first studied
Lemniscate_elliptic_functions
Estimates the number of points on an elliptic curve over a finite field
Hasse's theorem on elliptic curves, also referred to as the Hasse bound, provides an estimate of the number of points on an elliptic curve over a finite
Hasse's theorem on elliptic curves
Hasse's_theorem_on_elliptic_curves
Mathematical conjecture about elliptic curves
varieties and fields are open. Let E be an elliptic curve defined over the rational numbers without complex multiplication. For a prime number p, define
Sato–Tate_conjecture
Twisted cubic Elliptic curve, cubic curve Elliptic function, Jacobi's elliptic functions, Weierstrass's elliptic functions Elliptic integral Complex multiplication
List of algebraic geometry topics
List_of_algebraic_geometry_topics
Prime number with a certain relationship to an elliptic curve
In algebraic number theory, a supersingular prime for a given elliptic curve is a prime number with a certain relationship to that curve. If the curve
Supersingular prime (algebraic number theory)
Supersingular_prime_(algebraic_number_theory)
Term used in the theories of Riemann surfaces and algebraic curves
paths, give rise to integrals that generalise the elliptic integrals to all curves over the complex numbers. They include for example the hyperelliptic
Differential of the first kind
Differential_of_the_first_kind
Projective variety that is also an algebraic group
g=1} , the notion of abelian variety is the same as that of elliptic curve, and every complex torus gives rise to such a curve; for g > 1 {\displaystyle
Abelian_variety
Problem about mathematical number fields
case of any imaginary quadratic field, by using modular functions and elliptic functions chosen with a particular period lattice related to the field
Hilbert's_twelfth_problem
Dome who bottom cross section takes the form of an ellipse
from a spherical dome. As the mathematical description of an elliptical dome is more complex than that of spherical dome, design care is needed. In a geodesic
Elliptical_dome
Concept in differential geometry
(2): 97–136. doi:10.2307/2372795. JSTOR 2372795. Pati, Vishwambhar. "Elliptic complexes and index theory" (PDF). Archived (PDF) from the original on 20 Aug
Spin_structure
Smooth closed surface with g holes
the projective plane. Elliptic curves over the complex numbers can be identified with genus 1 surfaces. The formulation of elliptic curves as the embedding
Genus_g_surface
American mathematician
Rubin, Karl (1987). "Tate-Shafarevich groups and L-functions of elliptic curves with complex multiplication". Inventiones Mathematicae. 89 (3): 527–559. doi:10
Karl_Rubin
American mathematician, cyberneticist, editor
Hypernumbers-Magic Square Shuster, John A.; Köplinger, Jens (15 August 2010). "Elliptic complex numbers with dual multiplication". Applied Mathematics and Computation
Charles_Musès
Rational function of the form (az + b)/(cz + d)
PSL(2, R) important in the study of lattices in the complex plane, elliptic functions and elliptic curves. The discrete subgroups of PSL(2, R) are known
Möbius_transformation
Group of real 2×2 matrices with unit determinant
transformations corresponding to complex traces; analogous classifications are used elsewhere. A subgroup that is contained with the elliptic (respectively, parabolic
SL2(R)
1995 publication in mathematics
mathematician Andrew Wiles of a special case of the modularity theorem for elliptic curves. Together with Ribet's theorem, it provides a proof for Fermat's
Wiles's proof of Fermat's Last Theorem
Wiles's_proof_of_Fermat's_Last_Theorem
ring End(A). The terminology here is from complex multiplication theory, which was developed for elliptic curves in the nineteenth century. One of the
Complex multiplication of abelian varieties
Complex_multiplication_of_abelian_varieties
Algebraic variety
an action on the extended complex upper-half plane). The points of a modular curve parametrize isomorphism classes of elliptic curves, together with some
Modular_curve
Family of distributions that generalize the multivariate normal distribution
In probability and statistics, an elliptical distribution is any member of a broad family of probability distributions that generalize the multivariate
Elliptical_distribution
Type of pseudoprime
pseudoprime is called an elliptic pseudoprime for (E, P), where E is an elliptic curve defined over the field of rational numbers with complex multiplication by
Elliptic_pseudoprime
Type of algebraic equation
of the term modular equation is in relation to the moduli problem for elliptic curves. In that case the moduli space itself is of dimension one. That
Modular_equation
C standard library header file
a new _Complex keyword (and complex convenience macro; only available if the <complex.h> header is included) that provides support for complex numbers
C_mathematical_functions
back to the studies of Pierre de Fermat on what are now recognized as elliptic curves; and has become a very substantial area of arithmetic geometry both
Arithmetic of abelian varieties
Arithmetic_of_abelian_varieties
Fundamental trigonometric functions
Discrete sine transform Dixon elliptic functions Euler's formula Generalized trigonometry Hyperbolic function Lemniscate elliptic functions Law of sines List
Sine_and_cosine
algebraic geometry, including elliptic curves. 3rd century AD Diophantus of Alexandria studies rational points on elliptic curves c. 1000 Al-Karaji writes
Timeline_of_abelian_varieties
surfaces Picard modular surfaces Shioda modular surfaces Elliptic surfaces, surfaces with an elliptic fibration; quasielliptic surfaces constitute a modification
List of complex and algebraic surfaces
List_of_complex_and_algebraic_surfaces
American mathematician
Nirenberg (Curvature and the Eigenvalues of the Laplacian for Geometrical Elliptic Complexes). From 1971 to 1972 he was an instructor in computer science at the
Peter_B._Gilkey
Ring homomorphism from the cobordism ring of manifolds to another ring
manifolds of dimension greater than or equal to 5. A genus is called an elliptic genus if the power series Q ( z ) = z / f ( z ) {\displaystyle Q(z)=z/f(z)}
Genus of a multiplicative sequence
Genus_of_a_multiplicative_sequence
Hyperelliptic curve cryptography is similar to elliptic curve cryptography (ECC) insofar as the Jacobian of a hyperelliptic curve is an abelian group in
Hyperelliptic curve cryptography
Hyperelliptic_curve_cryptography
Simply connected Riemann surface is equivalent to an open disk, complex plane, or sphere
those with universal cover the complex plane are the Riemann surfaces of genus 1, namely the complex tori or elliptic curves with fundamental group Z2;
Uniformization_theorem
Relates rational elliptic curves to modular forms
In number theory, the modularity theorem states that elliptic curves over the field of rational numbers are related to modular forms in a particular way
Modularity_theorem
Branch of mathematics
Landweber exact functor theorem. Typical theories it studies include: complex K-theory, elliptic cohomology, Morava K-theory and tmf. In algebraic topology, the
Chromatic_homotopy_theory
Proposed lower bound on the Mahler measure for polynomials with integer coefficients
where D = [ K ( Q ) : K ] {\displaystyle D=[K(Q):K]} . If the elliptic curve E has complex multiplication, then the analogue of Dobrowolski's result holds:
Lehmer's_conjecture
Symmetric holomorphic function
branch points of a ramified double cover of the projective line by the elliptic curve C / ⟨ 1 , τ ⟩ {\displaystyle \mathbb {C} /\langle 1,\tau \rangle
Modular_lambda_function
Elliptic differential operators in geometry mathematics
In differential geometry there are a number of second-order, linear, elliptic differential operators bearing the name Laplacian. This article provides
Laplace operators in differential geometry
Laplace_operators_in_differential_geometry
Mathematical equation
ordinary differential equation whose solutions describe the periods of elliptic curves. Let j = g 2 3 g 2 3 − 27 g 3 2 {\displaystyle j={\frac
Picard–Fuchs_equation
Riemannian manifold with SU(n) holonomy
one-dimensional Calabi–Yau manifold is a complex elliptic curve, and in particular, algebraic. In two complex dimensions, the K3 surfaces furnish the only
Calabi–Yau_manifold
Species of plant
petals are about 1 mm long, obovate or elliptic. The fruits are 10-25 mm long, about 10 mm wide, ovoid to elliptical, slightly laterally flattened. Blooms
Prangos_ferulacea
In mathematics, the signature operator is an elliptic differential operator defined on a certain subspace of the space of differential forms on an even-dimensional
Signature_operator
American public spaceflight company
CubeSat weighing 55 pounds and is the first spacecraft to test a unique, elliptical lunar orbit. As a pathfinder for the Lunar Gateway, a Moon-orbiting outpost
Rocket_Lab
Algebraic variety
Riemann sphere is one example of a complex algebraic manifold, since it is the complex projective line. Elliptic curves Grassmannian Algebraic geometry
Algebraic_manifold
Mathematical concept
singularities. The term "singular elliptic curve" (or "singular j-invariant") was originally used to refer to complex elliptic curves whose ring of endomorphisms
Supersingular_variety
Quaternion of norm 1 (unit quaternion)
illustrate elliptic geometry, in particular elliptic space, a three-dimensional realm of rotations. The versors are the points of this elliptic space, though
Versor
ELLIPTIC COMPLEX
ELLIPTIC COMPLEX
Girl/Female
Tamil
Gaurangi | கௌராஂகீ
Giver of happiness, One name of radhas name, Lord krishnas beloved, Fair complexioned
Gaurangi | கௌராஂகீ
Surname or Lastname
Irish
Irish : reduced Anglicized form of Gaelic Ó Duinn, Ó Doinn ‘descendant of Donn’, a byname meaning ‘brown-haired’ or ‘chieftain’.English : nickname for a man with dark hair or a swarthy complexion, from Middle English dunn ‘dark-colored’.Scottish : habitational name from Dun in Angus, named with Gaelic dùn ‘fort’.Scottish : nickname from Gaelic donn ‘brown’. Compare 1.
Surname or Lastname
German
German : nickname from the small medieval coin known as the häller or heller because it was first minted (in 1208) at the Swabian town of (Schwäbisch) Hall. Compare Hall.Jewish (Ashkenazic) : habitational name for someone from Schwäbisch Hall.German : topographic name for someone living by a field named as ‘hell’ (see Helle 3).English : topographic name for someone living on a hill, from southeastern Middle English hell + the habitational suffix -er.Dutch : from a Germanic personal name composed of the elements hild ‘strife’ + hari, heri ‘army’.Jewish (Ashkenazic) : nickname for a person with fair hair or a light complexion, from an inflected form, used before a male personal name, of German hell ‘light’, ‘bright’, Yiddish hel.
Girl/Female
Tamil
Dheekshit | தீகà¯à®·à®¿à®¤
Fair complexioned
Dheekshit | தீகà¯à®·à®¿à®¤
Boy/Male
Tamil
Pandurang | பாஂடà¯à®°à®‚க
A deity, One with pale white complexion, Lord Vishnu
Pandurang | பாஂடà¯à®°à®‚க
Girl/Female
Tamil
Anekavarna | அநேகவாரநா
One who has many complexions
Anekavarna | அநேகவாரநா
Boy/Male
Tamil
Pandurangan | பநà¯à®¤à¯à®°à®‚கந
A deity, One with pale white complexion, Lord Vishnu
Pandurangan | பநà¯à®¤à¯à®°à®‚கந
Girl/Female
Tamil
Fair complexioned
Surname or Lastname
English
English : from Old English dūst ‘dust’, applied as a nickname, possibly for someone with a dusty complexion or hair (as, for example, a miller), or for a worthless person.North German : possibly a Westphalian habitational name from a farm named with dost ‘bush’, ‘brush’. However, the word also means ‘fine dust’, ‘flour’ and may have been applied as an occupational nickname for a miller. Compare 1.
Surname or Lastname
English (Midlands)
English (Midlands) : nickname for a dark-complexioned man, from Old English earp ‘swarthy’.Americanized spelling of German Erp.
Girl/Female
Tamil
Dheekshitha | தீகà¯à®·à¯€à®¤à®¾Â
Fair complexioned
Dheekshitha | தீகà¯à®·à¯€à®¤à®¾Â
Surname or Lastname
English
English : variant of Grice.French (Grisé) : variant spelling of Griset, a nickname for someone with gray hair, a gray complexion, or perhaps one who habitually wore gray, from Old French gris ‘gray’.
Surname or Lastname
English
English : nickname from Middle English gulle ‘gull’ or gul(le) (Old Norse gulr) ‘yellow’, ‘pale’ (of hair or complexion).Swiss German : nickname for an irascible or unreliable person, from an Alemannic form of Latin gallus ‘rooster’. See also Guell.
Surname or Lastname
English
English : patronymic for the son of a vicar or, perhaps in most cases, an occupational name for the servant of a vicar (see Vicker). In many cases it may represent an elliptical form of a topographic name. Compare Parsons.
Surname or Lastname
English
English : from the popular medieval personal name Hudde, which is of complex origin. It is usually explained as a pet form of Hugh, but there was a pre-existing Old English personal name, Hūda, underlying place names such as Huddington, Worcestershire. This personal name may well still have been in use at the time of the Norman Conquest. If so, it was absorbed by the Norman Hugh and its many diminutives. Reaney adduces evidence that Hudde was also regarded as a pet form of Richard.German : from a short form of a Germanic compound personal name formed with hut ‘guard’ as the first element.Variant spelling of German Hütt (see Huett).Jewish (Ashkenazic) : metonymic occupational name from Yiddish hut, German Hut ‘hat’ (see Huth).
Boy/Male
Tamil
Panduranga | பாநà¯à®¤à¯à®°à®‚கா
A deity, One with pale white complexion, Lord Vishnu
Panduranga | பாநà¯à®¤à¯à®°à®‚கா
Surname or Lastname
English
English : nickname for someone with a complexion that was as ‘white as a lily’ (Middle English lilie).
Surname or Lastname
English
English : nickname for a person with a ruddy complexion, from an adjective derivative of Middle English mad(d)er ‘madder’, the dye plant (see Mader 1), here used in a transferred sense.
Surname or Lastname
English
English : variant of Douthwaite, a habitational name from Dowthwaite in Cumbria or Dowthwaite Hall in North Yorkshire. The first is from the Old Norse personal name Dúfa + Old Norse þveit ‘clearing’; the second is from the Old Irish personal name Dubhan + Old Norse þveit. The elliptic form of the surname probably reflects the local pronunciation of the place names.
Girl/Female
Tamil
Gourangi | கௌராஂகீ
Giver of happiness, One name of radhas name, Lord krishnas beloved, Fair complexioned
ELLIPTIC COMPLEX
ELLIPTIC COMPLEX
Boy/Male
American, Anglo, Australian, British, English, German, Irish, Latin
Intelligent; Highborn; Brilliant; Shining Brightly; Day-bright; Shining Pledge; Bright Warrior; Renowned Northerner; Will; Desire; Famous; Inspiration
Surname or Lastname
Jewish (Ashkenazic)
Jewish (Ashkenazic) : from Yiddish wald ‘forest’ + man ‘man’. Very few Jews would have been living anywhere near a forest at the time when they acquired surnames, so in most cases this is probably an ornamental name. In other cases it many be a metonymic occupational name for someone whose job was connected with forestry, such as a woodcutter or lumber merchant.Americanized spelling of German Waldmann.English : topographic name for a forest dweller, from Old English w(e)ald ‘forest’ + mann ‘man’.
Boy/Male
Hindu, Indian, Tamil
Hindu God
Female
English
Anglicized form of Irish Gaelic CaitlÃn, CATHLEEN means "pure."
Girl/Female
Tamil
Yotshna | யோதà¯à®·à®¨à®¾
Light of Moon
Girl/Female
Tamil
Goddess Laxmi
Boy/Male
Arabic, Hindu, Indian, Muslim
Karma
Girl/Female
Bengali, Hindu, Indian, Kannada, Malayalam, Marathi, Sindhi, Telugu, Traditional
Goddess Durga
Girl/Female
Indian, Telugu
One who Gives Shelter; Depends
Girl/Female
Gujarati, Hindu, Indian
Smiling Face; Moon Light
ELLIPTIC COMPLEX
ELLIPTIC COMPLEX
ELLIPTIC COMPLEX
ELLIPTIC COMPLEX
ELLIPTIC COMPLEX
a.
Pertaining to, or derived from, the mineral mellite.
n.
An ellipse.
pl.
of Ellipsis
n.
A small shield, especially one of an approximately elliptic form, or crescent-shaped.
n.
The twelfth part of the ecliptic or zodiac.
n.
The elliptical orbit of a planet.
a.
A great circle drawn on a terrestrial globe, making an angle of 23¡ 28' with the equator; -- used for illustrating and solving astronomical problems.
a.
Pertaining to the ecliptic; as, the ecliptic way.
n.
Omission. See Ellipsis.
a.
Containing saccharine matter; marked by saccharine secretions; as, mellitic diabetes.
a.
See Mellitic.
a.
A great circle of the celestial sphere, making an angle with the equinoctial of about 23¡ 28'. It is the apparent path of the sun, or the real path of the earth as seen from the sun.
a.
Alt. of Elliptical
n.
A salt of mellitic acid.
n.
The angular distance of a heavenly body from the ecliptic.
a.
Having a form intermediate between elliptic and lanceolate.
a.
Broadly elliptical.
a.
Of or pertaining to an ellipse; having the form of an ellipse; oblong, with rounded ends.
a.
Having a part omitted; as, an elliptical phrase.
a.
Pertaining to an eclipse or to eclipses.