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mathematics, the height zeta function of an algebraic variety or more generally a subset of a variety encodes the distribution of points of given height. If S is
Height_zeta_function
zeta function of a variety Height zeta function of a variety Hurwitz zeta function, a generalization of the Riemann zeta function Igusa zeta function
List_of_zeta_functions
Mathematical functions that quantify complexity
A height function is a function that quantifies the complexity of mathematical objects. In Diophantine geometry, height functions quantify the size of
Height_function
Mathematics
similar formal properties to the abscissa of convergence of the height zeta function and it is conjectured that they are essentially the same. More precisely
Nevanlinna_invariant
Conjecture on zeros of the zeta function
Unsolved problem in mathematics Do all non-trivial zeros of the Riemann zeta function have a real part equal to one half? More unsolved problems in mathematics
Riemann_hypothesis
Sixth letter in the Greek alphabet
Zeta (UK: /ˈziːtə/, US: /ˈzeɪtə/ ; uppercase Ζ, lowercase ζ; (Ancient Greek and Katharevousa: ζῆτα, Demotic Greek: ζήτα, classical [d͡zɛ̌ːta] or [zdɛ̌ːta]
Zeta
local zeta-functions, and was basic in the formulation of the Tate conjecture (q.v.) and numerous other theories. Faltings height The Faltings height of
Glossary of arithmetic and diophantine geometry
Glossary_of_arithmetic_and_diophantine_geometry
Sum of inverse squares of natural numbers
Number of Primes Less Than a Given Magnitude", in which he defined his zeta function and proved its basic properties. The problem is named after the city
Basel_problem
Function in fluid mathematics
temperature in the surface layer under non-neutral conditions as a function of the dimensionless height parameter, named after Russian scientists A. S. Monin and
Monin–Obukhov similarity theory
Monin–Obukhov_similarity_theory
Evaluates the Riemann zeta function at many points
Odlyzko–Schönhage algorithm is a fast algorithm for evaluating the Riemann zeta function at many points, introduced by (Odlyzko & Schönhage 1988). The main point
Odlyzko–Schönhage_algorithm
Exploring properties of the integers with complex analysis
results on prime numbers (involving the Prime Number Theorem and Riemann zeta function) and additive number theory (such as the Goldbach conjecture and Waring's
Analytic_number_theory
Australian number theorist
number theory and related fields. He is known for his work on Riemann zeta function, analytic number theory, and distribution of primes. He currently is
Timothy_Trudgian
Association of one output to each input
complex function is illustrated by the multiplicative inverse of the Riemann zeta function: the determination of the domain of definition of the function z
Function_(mathematics)
Multivalued function in mathematics
In mathematics, the Lambert W function, also called the omega function or product logarithm, is a multivalued function, namely the branches of the converse
Lambert_W_function
Simplified approach for understanding fluid motions in a rotating system
controls the stream function by a Laplace operator, ζ = ∇ 2 Ψ , {\displaystyle {\zeta ={\nabla ^{2}\Psi }},} (21) where ζ {\displaystyle \zeta } is the relative
Potential_vorticity
Generalized function whose value is zero everywhere except at zero
{1}{2\pi i}}\oint _{\partial D}{\frac {f(\zeta )\,d\zeta }{\zeta -z}},\quad z\in D} for all holomorphic functions f in D that are continuous on the closure
Dirac_delta_function
American mathematician
to special values of the Riemann zeta function. Zagier found a formula for the value of the Dedekind zeta function of an arbitrary number field at s = 2
Don_Zagier
Potential counterexample to the generalized Riemann hypothesis
theorem, for example, that the Dedekind zeta function ζ K ( s ) = ∑ I ⊆ O K [ O K : I ] − s {\textstyle \zeta _{K}(s)=\sum _{I\subseteq {\mathfrak {O}}_{K}}[{\mathfrak
Siegel_zero
Number, approximately 3.14
{\displaystyle \zeta (s)=2^{s}\pi ^{s-1}\ \sin \left({\frac {\pi s}{2}}\right)\ \Gamma (1-s)\ \zeta (1-s).} Furthermore, the derivative of the zeta function satisfies
Pi
Engineering statistic in ship design
excitation force complex amplitude per wave height. The RAO is a frequency dependent and complex function (the i {\displaystyle i} in the above expression
Response_amplitude_operator
wind speed as function of height and C n 2 ( z ) {\displaystyle C_{n}^{2}(z)} the so-called atmospheric turbulence constant structure function, a measure
Greenwood_frequency
Nonlinear and exact periodic wave solution of the Korteweg–de Vries equation
{Q^{2}}{\zeta ^{2}}}+{\tfrac {1}{3}}\,\zeta \,Q\,u_{b}''+\cdots ,\\u_{b}'&=-{\frac {Q}{\zeta }}\,\zeta '+{\tfrac {1}{3}}\,\zeta \,\zeta '\,u_{b}''+{\tfrac
Cnoidal_wave
German mathematician (born 1958)
Deninger's papers studies L-functions and their special values. A classical example of an L-function is the Riemann zeta function ζ(s), for which formulas
Christopher_Deninger
Branch of pure mathematics
understood through the study of analytical objects, such as the Riemann zeta function, that encode properties of the integers, primes or other number-theoretic
Number_theory
Mathematical function with multiple real-number arguments
{\begin{aligned}&\zeta :\Xi \to \mathbb {R} ,\\&\zeta =\zeta (\xi _{1},\xi _{2},\ldots ,\xi _{m}),\end{aligned}}} is a function composition defined on X, in other terms
Function of several real variables
Function_of_several_real_variables
Concept in probability theory
SLE0, so the driving function ζ {\displaystyle \zeta } is a Brownian motion of diffusivity zero. The function ζ {\displaystyle \zeta } is thus identically
Schramm–Loewner_evolution
Influence on an oscillating physical system which reduces or prevents its oscillation
{\displaystyle \zeta } is a non-dimensional characterization of the decay rate relative to the frequency, approximately ζ = λ / ω {\displaystyle \zeta =\lambda
Damping
Algebraic curve in mathematics
ingredient is a function of a complex variable, L, the Hasse–Weil zeta function of E over Q. This function is a variant of the Riemann zeta function and Dirichlet
Elliptic_curve
Weil's explicit formula Hasse-Weil bound Hasse–Weil zeta function, and the related Hasse–Weil L-function Mordell–Weil group Mordell–Weil theorem Oka–Weil
List of things named after André Weil
List_of_things_named_after_André_Weil
Electronic filter topology
\alpha } , Q factor Q {\displaystyle Q} , and damping ratio ζ {\displaystyle \zeta } , are given by ω 0 = 2 π f 0 = 1 R 1 R 2 C 1 C 2 {\displaystyle \omega
Sallen–Key_topology
Irreducible fraction
is the conjecture that every nontrivial complex root of the Riemann zeta function has a real part equal to 1 2 {\displaystyle {\tfrac {1}{2}}} . The "one-half"
One_half
Ratio of the perimeter of Bernoulli's lemniscate to its diameter
first kind with modulus k, Β is the beta function, Γ is the gamma function and ζ is the Riemann zeta function. The lemniscate constant can also be computed
Lemniscate_constant
Ratio of shear stress to shear strain
\left[-{\frac {1+1/\zeta }{1+\zeta /\left(1-{\hat {T}}\right)}}\right]\quad {\text{for}}\quad {\hat {T}}:={\frac {T}{T_{m}}}\in [0,6+\zeta ],} and μ0 is the
Shear_modulus
Seventh letter in the Greek alphabet
Greek dialects to represent the voiceless glottal fricative, [h]. In this function, it was borrowed in the 8th century BC by the Etruscan and other Old Italic
Eta
Antenna consisting of two rod-shaped conductors
)\\E_{\mathrm {\theta } }\quad &=\quad \zeta _{\mathrm {o} }\ H_{\mathrm {\phi } }\quad =\quad j\ {\frac {\ \zeta _{\mathrm {o} }\ I_{\mathrm {h} }\ \ell
Dipole_antenna
group of the ring of integers of a number field to the field's Dedekind zeta function. Casas-Alvero conjecture: if a polynomial of degree d {\displaystyle
List of unsolved problems in mathematics
List_of_unsolved_problems_in_mathematics
French mathematician (1906-1998)
accomplishments were the 1940s proof of the Riemann hypothesis for zeta-functions of curves over finite fields, and his subsequent laying of proper foundations
André_Weil
Particular case of the generalized extreme value distribution
are given by κ n = ( n − 1 ) ! ζ ( n ) . {\displaystyle \kappa _{n}=(n-1)!\zeta (n).} The mode is μ, while the median is μ − β ln ( ln 2 ) , {\displaystyle
Gumbel_distribution
Experimental fusion reactor in the United Kingdom
ZETA, short for Zero Energy Thermonuclear Assembly, was a major experiment in the early history of fusion power research. Based on the pinch plasma confinement
ZETA_(fusion_reactor)
Type of generalization of periodic functions in Euclidean space
automorphic functions can be seen as generalizations of modular forms (as therefore elliptic curves), constructed by some zeta function analogue on an
Automorphic_form
Rate of increase in wind strength per unit increase in height
exponential variation of wind speed with height can be defined as follows: U ( h ) = U ( 0 ) h ζ {\displaystyle U(h)=U(0)h^{\zeta }} d U d h = ζ U ( h ) h {\displaystyle
Wind_gradient
American mathematician (1925–2019)
dissertation titled "Fourier analysis in number fields and Hecke's zeta functions" under the supervision of Emil Artin. Tate taught at Harvard for 36
John_Tate_(mathematician)
Branch of algebraic geometry
Dwork proved one of the four Weil conjectures (rationality of the local zeta function) in 1960. Grothendieck developed étale cohomology theory to prove two
Arithmetic_geometry
Algorithm for finding zeros of functions
to the roots (or zeroes) of a real-valued function. The most basic version starts with a real-valued function f, its derivative f′, and an initial guess
Newton's_method
Measure of polynomial height
Dirichlet L-function, and m ( 1 + x + y + z ) = 7 2 π 2 ζ ( 3 ) , {\displaystyle m(1+x+y+z)={\frac {7}{2\pi ^{2}}}\zeta (3),} where ζ {\displaystyle \zeta } is
Mahler_measure
Array of nonnegative integers in combinatorics
{\frac {\zeta (3)^{7/36}}{\sqrt {12\pi }}}\ \left({\frac {n}{2}}\right)^{-25/36}\ \exp \left(3\ \zeta (3)^{1/3}\left({\frac {n}{2}}\right)^{2/3}+\zeta '(-1)\right)
Plane_partition
Nonstandard, humorous unit of length
70 m) intervals instead of the conventional 6 feet (1.83 m). The Lambda Zeta (MIT) chapter of Lambda Chi Alpha, which created the smoot markings, continues
Smoot
Physical quantity
{\displaystyle \rho {\frac {\mathrm {D} \mathbf {u} }{\mathrm {D} t}}=-\nabla [p-\zeta (\nabla \cdot \mathbf {u} )]+\nabla \cdot \left\{\mu \left[\nabla \mathbf
Hydrostatic_pressure
Inverse of a finite difference
Hurwitz zeta, or as defined by their recurrence; not the definition by generating functions), ζ ( s , a ) {\displaystyle \zeta (s,a)} is the Hurwitz zeta function
Indefinite_sum
Rate of change of acceleration with time
Jump-discontinuity in acceleration can be modeled using a Dirac delta function in jerk, scaled to the height of the jump. Integrating jerk over time across the Dirac
Jerk_(physics)
definition of local zeta-function available. To get an L-function for A itself, one takes a suitable Euler product of such local functions; to understand the
Arithmetic of abelian varieties
Arithmetic_of_abelian_varieties
Stochastic volatility model used in derivatives markets
(1-\beta )}{\left(F_{\text{mid}}\right)^{2}}}\;,} The function D ( ζ ) {\displaystyle D\left(\zeta \right)} entering the formula above is given by D ( ζ
SABR_volatility_model
Physics phenomenon and formula
{\partial ^{2}\zeta }{\partial t^{2}}}+\nabla \cdot \left(c_{p}c_{g}\,\nabla \zeta \right)+\left(k^{2}c_{p}c_{g}-\omega _{0}^{2}\right)\zeta =0,} and the
Mild-slope_equation
Overview of GPS conversion formulas
ϕ {\displaystyle \phi } and height h {\displaystyle h} involves a circular relationship involving N, which is a function of latitude: Z p cot ϕ = 1
Geographic coordinate conversion
Geographic_coordinate_conversion
Time taken by a signal to change to a high value
In electronics, when describing a voltage or current step function, rise time is the time taken by a signal to change from a specified low value to a specified
Rise_time
Type of data measuring one attribute
Negative binomial distribution Poisson distribution Hypergeometric distribution Zeta distribution Uniform distribution (continuous) Normal distribution Gamma
Univariate_(statistics)
Statistical method in data analysis
patcog.2013.04.013. Zhao, D.; Tang, X. (2008). "Cyclizing clusters via zeta function of a graph". NIPS'08: Proceedings of the 21st International Conference
Hierarchical_clustering
Probability distribution
\end{aligned}}} where ζ {\displaystyle \zeta } is the Riemann zeta function, and ζ ′ ( − 1 ) = − 0.1654211437 {\displaystyle \zeta '(-1)=-0.1654211437} . This allows
Tracy–Widom_distribution
Country in Southeast Europe
half; Travunia, the west; and Rascia proper, the north. The Principality of Zeta emerged in the 14th and 15th centuries. From the late 14th century to the
Montenegro
Mathematical functions
x-\theta \operatorname {arsinh} (x)}}}+\zeta } . The hyperbolastic function of type I generalizes the logistic function. If the parameters θ = 0 {\displaystyle
Hyperbolastic_functions
Set of partial differential equations on fluid flow
x}}=0.\end{aligned}}} Here η is the total fluid column height (instantaneous fluid depth as a function of x, y and t), and the 2D vector (u,v) is the fluid's
Shallow_water_equations
Solution of Euler equations
{\displaystyle x=\xi (\alpha ,\beta ,t),} y = ζ ( α , β , t ) {\displaystyle y=\zeta (\alpha ,\beta ,t)} and z = η ( α , β , t ) {\displaystyle z=\eta (\alpha
Trochoidal_wave
Imaging Instrument
barrier height is of the order of the material's surface work function W, which for most metals has a value between 4 and 6 eV. The work function is the
Scanning_tunneling_microscope
Lambda Phi. Formerly a member of NIC. Originally nonsectarian. Merged with Zeta Beta Tau. Merged to create Phi Kappa Theta. Originally a service fraternity
List_of_social_fraternities
Speed of sound wave through elastic medium
with height can be defined as follows: U ( h ) = U ( 0 ) h ζ , d U d h ( h ) = ζ U ( h ) h , {\displaystyle {\begin{aligned}U(h)&=U(0)h^{\zeta },\\{\frac
Speed_of_sound
Electronic states at the surface of materials
\\\end{alignedat}}} whereas at the surface the potential is modeled as a step function of height V0. The solutions to the Schrödinger equation must be obtained separately
Surface_states
Mechanical oscillations about an equilibrium point
{\displaystyle \phi =\arctan \left({\frac {-2\zeta r}{1-r^{2}}}\right).} The plot of these functions, called "the frequency response of the system",
Vibration
Discrete (i.e., incremental) version of infinitesimal calculus
theorem: ( η , δ ζ ) = ( d η , ζ ) . {\displaystyle (\eta ,\delta \zeta )=(d\eta ,\zeta ).} Since the differential satisfies d 2 = 0 {\displaystyle d^{2}=0}
Discrete_calculus
Two-conductor flat cable used to carry radio frequency signals
{o}}={\frac {\zeta _{\mathsf {o}}}{\ \pi {\sqrt {\varepsilon _{\mathsf {R}}\ }}\ }}\ \operatorname {arcosh} \left({\frac {\ D\ }{d}}\right)={\frac {\zeta _{\mathsf
Twin-lead
French polymath (1749–1827)
∂ ∂ φ ( g ζ + U ) = 0 , {\displaystyle {\begin{aligned}{\frac {\partial \zeta }{\partial t}}&+{\frac {1}{a\cos(\varphi )}}\left[{\frac {\partial }{\partial
Pierre-Simon_Laplace
Pool in Jerusalem
built across the short Beth Zeta Valley, turning it into a reservoir for rain water; a sluice-gate in the dam allowed the height to be controlled, and a rock-cut
Pool_of_Bethesda
Metropolis when they are hit and apparently teleported to parts unknown by a Zeta Beam blast. The Wandering Earth 2 In a mid-credits scene, Tu's digital self
List of films with post-credits scenes
List_of_films_with_post-credits_scenes
Function that quantifies how near a number is to being rational
coefficients a i ∈ Z {\displaystyle a_{i}\in \mathbb {Z} } . Then define a height function H ( P ) = max ( | a 0 | , | a 1 | , . . . , | a n | ) {\displaystyle
Irrationality_measure
epsilon nought Vacuum permittivity farad per meter (F/m) ζ {\displaystyle \zeta } zeta damping ratio unitless η {\displaystyle \eta } eta angular jerk radian
List of common physics notations
List_of_common_physics_notations
Transformer - Transformers Wiki". "Hood Transformer - Transformers Wiki". "Zeta Prime (G1) - Transformers Wiki". "Five Faces of Darkness, Part 4 - Transformers
List of The Transformers characters
List_of_The_Transformers_characters
Statement on the gravitational attraction of spherical bodies
distance ζ. The area of the figure generated is I H ⋅ ζ {\displaystyle IH\cdot \zeta } , and its mass is proportional to this product. The force due to this mass
Shell_theorem
Number, approximately 1.46557
}={\frac {2\log \zeta }{\log \psi }}} , where ζ {\displaystyle \zeta } is the real root of ζ 7 − 2 ζ 2 − 1 = 0 {\displaystyle \zeta ^{7}-2\zeta ^{2}-1=0} ,
Supergolden_ratio
x ) ) n 1 δ 1 ( x ) ( 1 − u ( x , y ) u e ( x ) ) d y , {\displaystyle {\zeta _{n}(x)}=\int _{0}^{H/2}{(y-m(x))^{n}{1 \over \delta _{1}(x)}\left(1-{u(x
Boundary_layer_thickness
Character in alphabet writing systems
named zee. Both ultimately derive from the name of the parent Greek letter zeta ⟨Ζ⟩. In alphabets, letters are arranged in alphabetical order, which also
Letter_(alphabet)
Italian physicist and mathematician (1608–1647)
Giroux. ISBN 978-0374176815. Aubert, André (1989). "Prehistory of the Zeta-Function". In Aubert, Karl Egil; Bombieri, Enrico; Goldfeld, Dorian (eds.). Number
Evangelista_Torricelli
Magnetic confinement device used to produce thermonuclear fusion power
Unknown to Kurchatov, the British ZETA stabilized pinch machine was being built at the far end of the former runway. ZETA was, by far, the largest and most
Tokamak
Surface waves generated by wind on open water
fully determined and can be recreated by the following function where ζ {\displaystyle \zeta } is the wave elevation, ϵ j {\displaystyle \epsilon _{j}}
Wind_wave
Polynomials used in approximation theory
{\displaystyle Z(\varphi |\kappa )} is the Jacobi zeta function v {\displaystyle v} is as defined above. The height of the peak is given by Z n ( x max | κ )
Zolotarev_polynomials
Minimised surface of liquid connecting two wetted objects
characteristic parameters: (i) dimensionless height that is obtained by scaling of capillary bridge height by cubic root of its volume Eq. (16) and (ii)
Capillary_bridge
Mini SUV
market. The model was launched in India on 7 June 2023 with two trim levels: Zeta and Alpha, and is exclusively available at the Nexa dealership chain reserved
Suzuki_Jimny
Davy; Gelino, Christopher R.; et al. (2021). "The Field Substellar Mass Function Based on the Full-sky 20 pc Census of 525 L, T, and Y Dwarfs". The Astrophysical
List_of_nearest_stars
Any large system of circulating ocean surface currents
length scale), potential vorticity is a function of relative (local) vorticity ζ {\displaystyle \zeta } (zeta), planetary vorticity f {\displaystyle f}
Ocean_gyre
Mathematical term in calculus
print at end of: Sondow, Jonathan (May 2003). "Zeros of the Alternating Zeta Function on the Line R(S) = 1". The American Mathematical Monthly. 110 (5): 435–437
Cavalieri's quadrature formula
Cavalieri's_quadrature_formula
Type of microscopy
mode, usually referred to as "constant-height mode", the deflection of the cantilever is recorded as a function of the sample x–y position. As long as
Atomic_force_microscopy
{\bf {U}}={\frac {\epsilon }{\eta }}\left[{\frac {kT}{e}}\beta \zeta +{\frac {\zeta ^{2}}{8}}\right]\nabla \ln c_{\text{salt}}} where ϵ {\displaystyle
Diffusiophoresis and diffusioosmosis
Diffusiophoresis_and_diffusioosmosis
One-humped camel
Garland, D.; Rao, P.V.; Del Corso, A.; Mura, U.; Zigler Jr., J.S. (1991). "zeta-Crystallin is a major protein in the lens of Camelus dromedarius". Archives
Dromedary
Pandemic caused by SARS-CoV-2
from 6 to 41 days, typically about 14 days. Mortality rates increase as a function of age. People at the greatest mortality risk are the elderly and those
COVID-19_pandemic
Empire in the Balkans (1346–1371)
military capabilities, and they seem to have culminated when king Stefan raided Zeta, a province in Serbia where Dušan ruled autonomously, being a tradition of
Serbian_Empire
Equipment for electromagnetic testing
Q_{\rm {TE_{mnp}}}={\frac {Z_{0}lwh}{4R_{s}}}{\frac {k_{xy}^{2}k_{r}^{3}}{\zeta lh\left(k_{xy}^{4}+k_{x}^{2}k_{z}^{2}\right)+\xi wh\left(k_{xy}^{4}+k_{y
Electromagnetic reverberation chamber
Electromagnetic_reverberation_chamber
Representation of mechanical stress at every point within a deformed 3D object
π , {\displaystyle p=\zeta \,\nabla \cdot {\vec {u}}-\pi =\zeta \,{\frac {\partial u_{k}}{\partial x_{k}}}-\pi =\sum _{k}\zeta \,{\frac {\partial u_{k}}{\partial
Cauchy_stress_tensor
International historically Black American collegiate fraternity
hold a constitutional bond with a historically African-American sorority, Zeta Phi Beta, which was founded on January 16, 1920, at Howard University in
Phi_Beta_Sigma
Roger (1979), "Irrationalité de ζ ( 2 ) {\displaystyle \zeta (2)} et ζ ( 3 ) {\displaystyle \zeta (3)} ", Astérisque, 61: 11–13. Kingdom of Infinite Number:
List_of_numbers
Mathematics of varieties with integer coordinates
along with class field theory, complex multiplication, local zeta-functions and L-functions. Paul Vojta wrote: While others at the time shared this viewpoint
Diophantine_geometry
Constellation in the northern celestial hemisphere
20.3 years, are too faint to be observed with the unaided eye. The third, Zeta Cephei, is not as large as Mu Cephei and VV Cephei A with a diameter less
Cepheus_(constellation)
Vowel sound represented by ⟨æ⟩ in IPA
Hungarian and Valencian, this vowel is typically written with ⟨ɛ⟩. Its vowel height is near-open, also known as near-low, which means the tongue is positioned
Near-open front unrounded vowel
Near-open_front_unrounded_vowel
HEIGHT ZETA-FUNCTION
HEIGHT ZETA-FUNCTION
Female
English
English name derived from the second letter of the Greek alphabet, beta, related to Hebrew bet, BETA means "house."Â
Female
Polish
Feminine form of Polish Józef, JÓZEFA means "(God) shall add (another son)."Â
Male
French
French Provençal form of Latin Benedictus, BÉNÉZET means "blessed."Â
Female
German
Short form of German Margarete, META means "pearl."
Girl/Female
Greek
Born last.
Girl/Female
American, Australian
Form of Leigh or Leah
Female
Hebrew
(× Ö¶×˜Ö·×¢) Hebrew unisex name NETA means meaning "plant, shrub."
Surname or Lastname
English
English : variant of Wight.
Female
Italian
 Variant spelling of Italian Zita, ZETA means "little girl." Compare with another form of Zeta.
Surname or Lastname
English
English : variant spelling of Hight.
Female
Spanish
 Short form of Spanish Aleta, LETA means "winged." Compare with another form of Leta.
Female
Italian
Italian name ZITA means "little girl."Â
Female
Native American
 Native American Blackfoot name PETA means "golden eagle." Compare with another form of Peta.
Surname or Lastname
English
English : topographic name for someone who lived at the top of a hill or on a piece of raised ground, from Middle English heyt ‘summit’, ‘height’.
Female
Greek
(ΖÎνα) Contracted form of Greek Zenia, ZENA means "stranger, foreigner," but sometimes rendered "hospitable (esp. to foreigners)."
Male
English
English occupational surname transferred to forename use, derived from Old English wryhta/wyrhta, WRIGHT means "craftsman."
Surname or Lastname
English
English : topographic name for someone who lived at the top of a hill (see Hight).
Female
Persian/Iranian
 Short form of Persian Zenana, ZENA means "woman." Compare with another form of Zena.
Female
English
English name derived from the vocabulary word, from Latin delectare, DELIGHT means "to allure, delight."Â
Biblical
watch-tower, associated with modern Zeita|Wadi Zeita
HEIGHT ZETA-FUNCTION
HEIGHT ZETA-FUNCTION
Male
Scottish
Scottish Gaelic form of Old High German Godafrid, GOIRIDH means "God's peace."
Boy/Male
American, Australian, Gaelic, Irish
Son of Fhionnlaoich; White Warrior; Learned Ruler
Surname or Lastname
English and French
English and French : nickname from Middle English, Old French jay(e), gai ‘jay’ (the bird), probably referring to an idle chatterer or a showy person, although the jay was also noted for its thieving habits.The name is associated with a Huguenot family from La Rochelle, France, who settled in New Amsterdam. Peter Jay was the scion of the NY Jays; his son John (1745–1829) was a U.S. diplomat and first chief justice of the U.S. Supreme Court.
Boy/Male
Hindu
Good character
Girl/Female
Hebrew
Feminine, meaning God with us.
Surname or Lastname
English
English : nickname for a bald-headed man or someone of cadaverous appearance, from Middle English sc(h)olle, sc(h)ulle ‘skull’ (probably of Scandinavian origin).Nicholas Scull emigrated from Bristol, England, to Philadelphia, PA, with his brother John in 1685. He founded a wealthy Quaker family whose descendants have been prominent in western PA, in law, newspaper publication, and banking.
Boy/Male
Arabic, Indian, Modern, Muslim
Modern
Boy/Male
Hebrew, Hindu, Indian, Jain, Russian
Kiss
Boy/Male
Hindu, Indian
Grace of God; Lord Shiva
Male
Egyptian
, the Great An.
HEIGHT ZETA-FUNCTION
HEIGHT ZETA-FUNCTION
HEIGHT ZETA-FUNCTION
HEIGHT ZETA-FUNCTION
HEIGHT ZETA-FUNCTION
n.
A variant of Height.
pl.
of Seta
n.
A genus of large grasses of which the Indian corn (Zea Mays) is the only species known. Its origin is not yet ascertained. See Maize.
v. t.
A ponderous mass; something heavy; as, a clock weight; a paper weight.
superl.
Having weight; heavy; ponderous; as, a weighty body.
n.
Variant of Height.
a.
Seven and one; as, eight years.
superl.
Not of the legal, standard, or usual weight; clipped; diminished; as, light coin.
imp.
of Hight
n.
Utmost degree in extent; extreme limit of energy or condition; as, the height of a fever, of passion, of madness, of folly; the height of a tempest.
n.
A symbol representing eighty units, or ten eight times repeated, as 80 or lxxx.
v. t.
To load with a weight or weights; to load down; to make heavy; to attach weights to; as, to weight a horse or a jockey at a race; to weight a whip handle.
superl.
Slight; not important; as, a light error.
n.
That which is elevated; an eminence; a hill or mountain; as, Alpine heights.
n.
The sum of eight times ten; eighty units or objects.
n.
The quotient of a unit divided by eight; one of eight equal parts; an eighth part.
superl
Having light; not dark or obscure; bright; clear; as, the apartment is light.
p. p.
of Hight
v. t.
A scale, or graduated standard, of heaviness; a mode of estimating weight; as, avoirdupois weight; troy weight; apothecaries' weight.
v. t.
To assign a weight to; to express by a number the probable accuracy of, as an observation. See Weight of observations, under Weight.