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MODULAR FORM

  • Modular form
  • Analytic function on the upper half-plane with a certain behavior under the modular group

    In number theory and complex analysis, a modular form is a type of function of a complex number variable that possesses a high degree of symmetry, of a

    Modular form

    Modular_form

  • Mock modular form
  • Complex-differentiable part of a Maass wave function

    mathematics, a mock modular form is the holomorphic part of a harmonic weak Maass form, and a mock theta function is essentially a mock modular form of weight ⁠1/2⁠

    Mock modular form

    Mock_modular_form

  • Siegel modular form
  • Major type of automorphic form in mathematics

    In mathematics, Siegel modular forms are a major type of automorphic form. These generalize conventional elliptic modular forms which are closely related

    Siegel modular form

    Siegel_modular_form

  • Hilbert modular form
  • Special modular forms

    In mathematics, a Hilbert modular form is a generalization of modular forms to functions of two or more variables. It is a (complex) analytic function

    Hilbert modular form

    Hilbert_modular_form

  • Teichmüller modular form
  • Teichmüller modular form is an analogue of a Siegel modular form on Teichmüller space. Ichikawa, Takashi (1994), "On Teichmüller modular forms", Mathematische

    Teichmüller modular form

    Teichmüller_modular_form

  • P-adic modular form
  • In mathematics, a p-adic modular form is a p-adic analog of a modular form, with coefficients that are p-adic numbers rather than complex numbers. Serre

    P-adic modular form

    P-adic_modular_form

  • Overconvergent modular form
  • In mathematics, overconvergent modular forms are special p-adic modular forms that are elements of certain p-adic Banach spaces (usually infinite dimensional)

    Overconvergent modular form

    Overconvergent_modular_form

  • Weakly holomorphic modular form
  • Mathematical function

    holomorphic modular form is similar to a holomorphic modular form, except that it is allowed to have poles at cusps. Examples include modular functions

    Weakly holomorphic modular form

    Weakly_holomorphic_modular_form

  • Topological modular forms
  • In mathematics, topological modular forms (tmf) is the name of a spectrum that describes a generalized cohomology theory. In concrete terms, for any integer

    Topological modular forms

    Topological_modular_forms

  • Ring of modular forms
  • Algebraic object

    the ring of modular forms associated to a subgroup Γ of the special linear group SL(2, Z) is the graded ring generated by the modular forms of Γ. The study

    Ring of modular forms

    Ring_of_modular_forms

  • Modular group
  • Orientation-preserving mapping class group of the torus

    from modular arithmetic. The modular group Γ is the group of fractional linear transformations of the complex upper half-plane, which have the form z ↦

    Modular group

    Modular group

    Modular_group

  • Modular curve
  • Algebraic variety

    In number theory and algebraic geometry, a modular curve Y(Γ) is a Riemann surface, or the corresponding algebraic curve, constructed as a quotient of

    Modular curve

    Modular_curve

  • Modular synthesizer
  • Synthesizer composed of separate modules

    Modular synthesizers are electronic musical instruments composed of separate synthesizer modules that represent different functions. The modules can be

    Modular synthesizer

    Modular synthesizer

    Modular_synthesizer

  • Almost holomorphic modular form
  • mathematics, almost holomorphic modular forms, also called nearly holomorphic modular forms, are a generalization of modular forms that are polynomials in 1/Im(τ)

    Almost holomorphic modular form

    Almost_holomorphic_modular_form

  • Wiles's proof of Fermat's Last Theorem
  • 1995 publication in mathematics

    announced his proof on 23 June 1993 at a lecture in Cambridge entitled "Modular Forms, Elliptic Curves and Galois Representations". However, in September

    Wiles's proof of Fermat's Last Theorem

    Wiles's proof of Fermat's Last Theorem

    Wiles's_proof_of_Fermat's_Last_Theorem

  • Modular forms modulo p
  • Mathematical concept

    complex modular forms and the p-adic theory of modular forms. Modular forms are analytic functions, so they admit a Fourier series. As modular forms also

    Modular forms modulo p

    Modular_forms_modulo_p

  • Modularity theorem
  • Relates rational elliptic curves to modular forms

    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

    Modularity_theorem

  • Automorphic form
  • Type of generalization of periodic functions in Euclidean space

    Automorphic forms are a generalization of the idea of periodic functions in Euclidean space to general topological groups. Modular forms are holomorphic

    Automorphic form

    Automorphic_form

  • Ramanujan–Petersson conjecture
  • Unsolved problem in mathematics

    conjecture concerning the growth rate of coefficients of modular forms and more generally, automorphic forms. The name of the conjecture comes from Srinivasa

    Ramanujan–Petersson conjecture

    Ramanujan–Petersson_conjecture

  • Poincaré series (modular form)
  • sets (in the upper halfplane), and is a modular form of weight 2k for Γ. Note that, when Γ is the full modular group and n = 0, one obtains the Eisenstein

    Poincaré series (modular form)

    Poincaré_series_(modular_form)

  • Rogers–Ramanujan identities
  • Mathematical identities related to integer partitions

    mechanics. The demodularized standard form of the Ramanujan's continued fraction unanchored from the modular form is as follows: H ( q ) G ( q ) = [ 1

    Rogers–Ramanujan identities

    Rogers–Ramanujan_identities

  • Fermat's Last Theorem
  • 17th-century conjecture proved by Andrew Wiles in 1994

    Yutaka Taniyama suspected a link might exist between elliptic curves and modular forms, two completely different areas of mathematics. Known at the time as

    Fermat's Last Theorem

    Fermat's Last Theorem

    Fermat's_Last_Theorem

  • Pi
  • Number, approximately 3.14

    }^{\infty }e^{2\pi inz\ +\ \pi in^{2}\tau },} which is a kind of modular form called a Jacobi form. This is sometimes written in terms of the nome q = e π i

    Pi

    Pi

  • Modular elliptic curve
  • 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

    Modular elliptic curve

    Modular_elliptic_curve

  • Modular lambda function
  • Symmetric holomorphic function

    In mathematics, the modular lambda function λ(τ) is a highly symmetric holomorphic function on the complex upper half-plane. It is invariant under the

    Modular lambda function

    Modular lambda function

    Modular_lambda_function

  • Hecke algebra
  • Type of vector space

    the classical elliptic modular form theory, the Hecke operators Tn with n coprime to the level acting on the space of cusp forms of a given weight are

    Hecke algebra

    Hecke_algebra

  • J-invariant
  • Modular function in mathematics

    In mathematics, the j-invariant or j function is a modular function of weight zero for the special linear group SL ⁡ ( 2 , Z ) {\displaystyle \operatorname

    J-invariant

    J-invariant

    J-invariant

  • Rogers–Ramanujan continued fraction
  • Continued fraction closely related to the Rogers–Ramanujan identities

    {\displaystyle R(q)} can be related to the Dedekind eta function, a modular form of weight 1/2, as, 1 R ( q ) − R ( q ) = η ( τ 5 ) η ( 5 τ ) + 1 {\displaystyle

    Rogers–Ramanujan continued fraction

    Rogers–Ramanujan continued fraction

    Rogers–Ramanujan_continued_fraction

  • Siegel modular variety
  • Algebraic variety that is a moduli space for principally polarized abelian varieties

    and play a central role in the theory of Siegel modular forms, which generalize classical modular forms to higher dimensions. They also have applications

    Siegel modular variety

    Siegel modular variety

    Siegel_modular_variety

  • Ramanujan–Sato series
  • Series related to Ramanujan's pi formulas

    {\displaystyle {\tbinom {n}{k}}} , and A , B , C {\displaystyle A,B,C} employing modular forms of higher levels. Ramanujan made the enigmatic remark that there were

    Ramanujan–Sato series

    Ramanujan–Sato_series

  • Dedekind eta function
  • Mathematical function

    mathematics, the Dedekind eta function, named after Richard Dedekind, is a modular form of weight 1/2 and is a function defined on the upper half-plane of complex

    Dedekind eta function

    Dedekind_eta_function

  • Srinivasa Ramanujan
  • Indian mathematician (1887–1920)

    generating function as the discriminant modular form Δ(q), a typical cusp form in the theory of modular forms. It was finally proven in 1973, as a consequence

    Srinivasa Ramanujan

    Srinivasa Ramanujan

    Srinivasa_Ramanujan

  • Hecke operator
  • Linear operator acting on modular forms

    In mathematics, in particular in the theory of modular forms, a Hecke operator, studied by Erich Hecke (1937a,1937b), is a certain kind of "averaging"

    Hecke operator

    Hecke_operator

  • Form
  • Topics referred to by the same term

    reliability of a system Indeterminate form, an algebraic expression that cannot be used to evaluate a limit Modular form, a (complex) analytic function on

    Form

    Form

  • Weierstrass elliptic function
  • Class of mathematical functions

    =g_{2}^{3}-27g_{3}^{2}.} The discriminant is a modular form of weight 12 {\displaystyle 12} . That is, under the action of the modular group, it transforms as Δ ( a τ

    Weierstrass elliptic function

    Weierstrass elliptic function

    Weierstrass_elliptic_function

  • Maass wave form
  • Complex-valued smooth functions of the upper half plane (harmonic analysis topic)

    fundamental domain of Γ {\displaystyle \Gamma } . In contrast to modular forms, Maass forms need not be holomorphic. They were studied first by Hans Maass

    Maass wave form

    Maass_wave_form

  • Harmonic Maass form
  • Mathematical function

    Maass form is a smooth function f {\displaystyle f} on the upper half plane, transforming like a modular form under the action of the modular group,

    Harmonic Maass form

    Harmonic_Maass_form

  • Taniyama's problems
  • 36 mathematical problems stated in 1955

    focused on algebraic geometry, number theory, and the connections between modular forms and elliptic curves. Taniyama's twelfth and thirteenth problems were

    Taniyama's problems

    Taniyama's_problems

  • Andrew Wiles
  • British mathematician who proved Fermat's Last Theorem

    he worked on unifying Galois representations, elliptic curves and modular forms, starting with Barry Mazur's generalizations of Iwasawa theory. In the

    Andrew Wiles

    Andrew Wiles

    Andrew_Wiles

  • Serre's modularity conjecture
  • Conjecture in number theory

    finite field arises from a modular form. A stronger version of this conjecture specifies the weight and level of the modular form. The conjecture in the level

    Serre's modularity conjecture

    Serre's_modularity_conjecture

  • Montgomery modular multiplication
  • Algorithm for fast modular multiplication

    In modular arithmetic computation, Montgomery modular multiplication, more commonly referred to as Montgomery multiplication, is a method for performing

    Montgomery modular multiplication

    Montgomery_modular_multiplication

  • Eisenstein series
  • Series representing modular forms

    are particular modular forms with infinite series expansions that may be written down directly. Originally defined for the modular group, Eisenstein

    Eisenstein series

    Eisenstein_series

  • Cusp form
  • Modular form

    theory, a cusp form is a particular kind of modular form with zero constant coefficient in its Fourier series expansion. A cusp form is distinguished

    Cusp form

    Cusp_form

  • Classical modular curve
  • Plane algebraic curve

    In number theory, the classical modular curve is an irreducible plane algebraic curve given by an equation Φn(x, y) = 0, such that (x, y) = (j(nτ), j(τ))

    Classical modular curve

    Classical_modular_curve

  • Picard–Fuchs equation
  • Mathematical equation

    {\displaystyle g_{2}} and g 3 {\displaystyle g_{3}} the modular invariants of the elliptic curve in Weierstrass form: y 2 = 4 x 3 − g 2 x − g 3 . {\displaystyle

    Picard–Fuchs equation

    Picard–Fuchs_equation

  • Ramanujan tau function
  • Function studied by Ramanujan

    proof of the Weil conjectures. Because the modular discriminant Δ ( z ) {\textstyle \Delta (z)} is a cusp form of weight 12, it gives rise to an L {\displaystyle

    Ramanujan tau function

    Ramanujan tau function

    Ramanujan_tau_function

  • Module
  • Topics referred to by the same term

    module or modular in Wiktionary, the free dictionary. Module, modular and modularity may refer to the concept of modularity. They may also refer to: Modular design

    Module

    Module

  • Michael J. Hopkins
  • American mathematician

    This was later used in the Hopkins–Miller construction of topological modular forms. Subsequent work of Hopkins on this topic includes papers on the question

    Michael J. Hopkins

    Michael J. Hopkins

    Michael_J._Hopkins

  • Weber modular function
  • In mathematics, the Weber modular functions are a family of three functions f, f1, and f2, studied by Heinrich Martin Weber. Let q = e 2 π i τ {\displaystyle

    Weber modular function

    Weber_modular_function

  • Jacobi form
  • Class of complex vector function

    Meromorphic Jacobi forms appear in the theory of Mock modular forms. Eichler, Martin; Zagier, Don (1985), The theory of Jacobi forms, Progress in Mathematics

    Jacobi form

    Jacobi_form

  • Modular symbol
  • modular symbols, introduced independently by Bryan John Birch and by Manin (1972), span a vector space closely related to a space of modular forms, on

    Modular symbol

    Modular_symbol

  • Don Zagier
  • American mathematician

    on Hilbert modular surfaces. Hirzebruch and Zagier coauthored Intersection numbers of curves on Hilbert modular surfaces and modular forms of Nebentypus

    Don Zagier

    Don Zagier

    Don_Zagier

  • Modular unit
  • Concept in mathematics

    In mathematics, modular units are certain units of rings of integers of fields of modular functions, introduced by Kubert and Lang (1975). They are functions

    Modular unit

    Modular_unit

  • Chinese paper folding
  • Chinese art form

    Venture migrants where large representational objects are made from modular forms. Paper was first invented by Cai Lun during the Eastern Han dynasty

    Chinese paper folding

    Chinese paper folding

    Chinese_paper_folding

  • Moduli stack of elliptic curves
  • Algebraic stack in mathematics

    exactly the condition for a holomorphic function to be modular. The modular forms are the modular functions which can be extended to the compactification

    Moduli stack of elliptic curves

    Moduli_stack_of_elliptic_curves

  • Vesselin Dimitrov
  • Bulgarian mathematician (born 1986)

    Swinnerton-Dyer: if a modular form ⁠ f ( τ ) {\displaystyle f(\tau )} ⁠ is not modular for some congruence subgroup of the modular group, then the Fourier

    Vesselin Dimitrov

    Vesselin Dimitrov

    Vesselin_Dimitrov

  • Unimodular lattice
  • Integral lattice of determinant 1 or –1

    has Γ0(4) structure (i.e., it is a modular form of level 4). Due to the dimension bound on spaces of modular forms, the minimum norm of a nonzero vector

    Unimodular lattice

    Unimodular_lattice

  • Nick Katz
  • American mathematician (born 1943)

    adapted methods of scheme theory and category theory to the theory of modular forms. Subsequently, he has applied geometric methods to various exponential

    Nick Katz

    Nick Katz

    Nick_Katz

  • Congruence subgroup
  • Matrix group

    fundamental objects in the classical theory of modular forms; the modern theory of automorphic forms makes a similar use of congruence subgroups in more

    Congruence subgroup

    Congruence_subgroup

  • Modularity
  • Degree to which a system's components may be separated and recombined

    resilience. In nature, modularity may refer to the construction of a cellular organism by joining together standardized units to form larger compositions

    Modularity

    Modularity

  • Fundamental pair of periods
  • Way of defining a lattice in the complex plane

    lattice is the underlying object with which elliptic functions and modular forms are defined. A fundamental pair of periods is a pair of complex numbers

    Fundamental pair of periods

    Fundamental pair of periods

    Fundamental_pair_of_periods

  • Atkin–Lehner theory
  • Part of the theory of modular forms

    In mathematics, Atkin–Lehner theory is part of the theory of modular forms describing when they arise at a given integer level N in such a way that the

    Atkin–Lehner theory

    Atkin–Lehner_theory

  • Q-expansion principle
  • states that a modular form f has coefficients in a module M if its q-expansion at enough cusps resembles the q-expansion of a modular form g with coefficients

    Q-expansion principle

    Q-expansion_principle

  • Congruence ideal
  • corresponding to a modular form, the congruence ideal describes congruences between the modular form of f and other modular forms. Suppose C and D are

    Congruence ideal

    Congruence_ideal

  • Hard hexagon model
  • z, κ, ρ, ρ1, ρ2, and ρ3 are modular functions of τ, while x1/24Q(x) is a modular form of weight 1/2. Since any two modular functions are related by an

    Hard hexagon model

    Hard_hexagon_model

  • Langlands program
  • Conjectures connecting number theory and geometry

    role of some low-dimensional Lie groups such as GL(2) in the theory of modular forms had been recognised, and with hindsight GL(1) in class field theory

    Langlands program

    Langlands_program

  • Modular equation
  • Type of algebraic equation

    In mathematics, a modular equation is an algebraic equation satisfied by moduli, in the sense of moduli problems. That is, given a number of functions

    Modular equation

    Modular_equation

  • Eigenform
  • an eigenform (meaning simultaneous Hecke eigenform with modular group SL(2,Z)) is a modular form that is an eigenvector for all Hecke operators Tm, m = 1

    Eigenform

    Eigenform

  • Frank Calegari
  • Australian-American mathematician

    O.L. Atkin and Swinnerton-Dyer: if a modular form f(τ) is not modular for some congruence subgroup of the modular group, then the Fourier coefficients

    Frank Calegari

    Frank Calegari

    Frank_Calegari

  • Modular arithmetic
  • Computation modulo a fixed integer

    In mathematics, modular arithmetic is a system of arithmetic operations for integers, differing from the usual ones in that numbers "wrap around" when

    Modular arithmetic

    Modular arithmetic

    Modular_arithmetic

  • Modular art
  • Modular art is art created by joining together standardized units (modules) to form larger, more complex compositions. In some works the units can be

    Modular art

    Modular_art

  • Modular lattice
  • Type of lattice in mathematical order theory

    module over a ring) form a modular lattice. In a not necessarily modular lattice, there may still be elements b for which the modular law holds in connection

    Modular lattice

    Modular lattice

    Modular_lattice

  • Modular invariance
  • name comes from the classical name modular group of this group, as in modular form theory. In string theory, modular invariance is an additional requirement

    Modular invariance

    Modular_invariance

  • Maass–Shimura operator
  • specifically the study of modular forms, a Maass–Shimura operator is an operator which maps modular forms to almost holomorphic modular forms. The Maass–Shimura

    Maass–Shimura operator

    Maass–Shimura_operator

  • Saito–Kurokawa lift
  • mathematics, the Saito–Kurokawa lift (or lifting) takes elliptic modular forms to Siegel modular forms of degree 2. The existence of this lifting was conjectured

    Saito–Kurokawa lift

    Saito–Kurokawa_lift

  • Riemann form
  • In mathematics, a Riemann form in the theory of abelian varieties and modular forms, is the following data: A lattice Λ in a complex vector space Cg.

    Riemann form

    Riemann_form

  • Automorphic factor
  • function, defined on subgroups of SL(2,R), appearing in the theory of modular forms. The general case, for general groups, is reviewed in the article 'factor

    Automorphic factor

    Automorphic_factor

  • Upper half-plane
  • Complex numbers with non-negative imaginary part

    Siegel modular forms. Cusp neighborhood Extended complex upper-half plane Fuchsian group Fundamental domain Half-space Kleinian group Modular group Moduli

    Upper half-plane

    Upper_half-plane

  • Modular programming
  • Organizing code into modules

    that corresponds to the elements declared in the interface. Modular programming, in the form of subsystems (particularly for I/O) and software libraries

    Modular programming

    Modular_programming

  • Ribet's theorem
  • Result concerning properties of Galois representations associated with modular forms

    theory. It concerns properties of Galois representations associated with modular forms. It was proposed by Jean-Pierre Serre and proven by Ken Ribet. The proof

    Ribet's theorem

    Ribet's_theorem

  • List of cohomology theories
  • π*(tmf) is called the ring of topological modular forms. TMF is tmf with the 24th power of the modular form Δ inverted, and has period 242=576. At the

    List of cohomology theories

    List_of_cohomology_theories

  • Monstrous moonshine
  • Monster and modular connection

    moonshine theory, is the unexpected connection between the monster group M and modular functions, in particular the j function. The initial numerical observation

    Monstrous moonshine

    Monstrous moonshine

    Monstrous_moonshine

  • Richard Taylor (mathematician)
  • British-American mathematician (born 1962)

    completing a doctoral dissertation, titled "On congruences between modular forms", under the supervision of Andrew Wiles. He was an assistant lecturer

    Richard Taylor (mathematician)

    Richard Taylor (mathematician)

    Richard_Taylor_(mathematician)

  • Triple modular redundancy
  • Method for increasing reliability

    In computing, triple modular redundancy, sometimes called triple-mode redundancy, (TMR) is a fault-tolerant form of N-modular redundancy, in which three

    Triple modular redundancy

    Triple modular redundancy

    Triple_modular_redundancy

  • Rankin–Cohen bracket
  • the Rankin–Cohen bracket of two modular forms is another modular form, generalizing the product of two modular forms. Rankin (1956, 1957) gave some general

    Rankin–Cohen bracket

    Rankin–Cohen_bracket

  • Elliptic cohomology
  • Algebraic invariant of topological spaces

    the sense of algebraic topology. It is related to elliptic curves and modular forms. Historically, elliptic cohomology arose from the study of elliptic

    Elliptic cohomology

    Elliptic_cohomology

  • Moduli space
  • Geometric space whose points represent algebro-geometric objects of some fixed kind

    of abelian varieties, such as the Siegel modular variety. This is the problem underlying Siegel modular form theory. See also Shimura variety. Using techniques

    Moduli space

    Moduli_space

  • Thomae's formula
  • Relates theta constants to the branch points of a hyperelliptic curve

    more general Siegel modular forms and the elliptic integral by a hyperelliptic integral. Hiroshi Umemura expressed these modular functions in terms of

    Thomae's formula

    Thomae's_formula

  • Modular design
  • Design approach

    Modular design, or modularity in design, is a design principle that subdivides a system into smaller parts called modules (such as modular process skids)

    Modular design

    Modular design

    Modular_design

  • Schwarzian derivative
  • Nonlinear differential operator used to study conformal mappings

    of the complex projective line, and in particular, in the theory of modular forms and hypergeometric functions. It plays an important role in the theory

    Schwarzian derivative

    Schwarzian_derivative

  • Umbral moonshine
  • Topic in group theory and harmonic analysis (Niemeier lattice-mock theta connection)

    multiplicities are mock modular forms, and Miranda Cheng suggested that characters of elements of M24 should also be mock modular forms. This suggestion became

    Umbral moonshine

    Umbral moonshine

    Umbral_moonshine

  • Representation theory
  • Branch of mathematics that studies abstract algebraic structures

    cases were worked out in detail, including the Hilbert modular forms and Siegel modular forms. Important results in the theory include the Selberg trace

    Representation theory

    Representation theory

    Representation_theory

  • Langlands–Tunnell theorem
  • coefficients of modular forms. More specifically, it gives the modularity of certain two-dimensional Galois representations. In one common form, it states

    Langlands–Tunnell theorem

    Langlands–Tunnell_theorem

  • Ikeda lift
  • In mathematics, the Ikeda lift is a lifting of modular forms to Siegel modular forms. The existence of the lifting was conjectured by W. Duke and Ö. Imamoḡlu

    Ikeda lift

    Ikeda_lift

  • Modular origami
  • Multi-stage paper folding technique

    There are some modular origami that are approximations of fractals, such as Menger's sponge. Macro-modular origami is a form of modular origami in which

    Modular origami

    Modular origami

    Modular_origami

  • Riemann zeta function
  • Analytic function in mathematics

    Euler, are rational numbers and play an important role in the theory of modular forms. Many generalizations of the Riemann zeta function, such as Dirichlet

    Riemann zeta function

    Riemann zeta function

    Riemann_zeta_function

  • Unifying theories in mathematics
  • View of mathematicians to consolidate two or more theories into a more generalized one

    conjecture, now the modularity theorem, which proposed that each elliptic curve over the rational numbers can be translated into a modular form (in such a way

    Unifying theories in mathematics

    Unifying_theories_in_mathematics

  • E8 lattice
  • Lattice in 8-dimensional space with special properties

    theta function of an even unimodular lattice of rank n is actually a modular form of weight n/2. The theta function of an integral lattice is often written

    E8 lattice

    E8_lattice

  • Paramodular group
  • and is conjugate to a (real) symplectic group. A paramodular form is a Siegel modular form for a paramodular group. Paramodular groups were introduced

    Paramodular group

    Paramodular_group

  • Yunqing Tang
  • Mathematician

    O.L. Atkin and Swinnerton-Dyer: if a modular form f(τ) is not modular for some congruence subgroup of the modular group, then the Fourier coefficients

    Yunqing Tang

    Yunqing Tang

    Yunqing_Tang

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Online names & meanings

  • Joy | ஜோய 
  • Boy/Male

    Tamil

    Joy | ஜோய 

    Happiness, Pleasure

  • Khian
  • Boy/Male

    Hindu

    Khian

    King of terror

  • Kalmali
  • Boy/Male

    Indian, Sanskrit

    Kalmali

    Di-speller of Darkness

  • Isahella
  • Girl/Female

    Hebrew Greek

    Isahella

    From Elisheba, meaning either oath of God, or God is satisfaction.

  • Jasanjot
  • Boy/Male

    Indian, Punjabi, Sikh

    Jasanjot

    Renowned Light

  • Sadrah
  • Girl/Female

    Arabic, Muslim

    Sadrah

    High Price Stone

  • Padmabandhu | பத்மபஂதூ
  • Boy/Male

    Tamil

    Padmabandhu | பத்மபஂதூ

    Friend of lotus bee, Sun

  • Yagana
  • Boy/Male

    Indian

    Yagana

    Unique, Unprecedented

  • Khaira
  • Girl/Female

    Indian

    Khaira

    Charitable, Good

  • Asub
  • Girl/Female

    Arabic

    Asub

    Queen Bee

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Other words and meanings similar to

MODULAR FORM

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MODULAR FORM

  • Popular
  • a.

    Beloved or approved by the people; pleasing to people in general, or to many people; as, a popular preacher; a popular law; a popular administration.

  • Modulate
  • v. t.

    To form, as sound, to a certain key, or to a certain portion.

  • Modulating
  • p. pr. & vb. n.

    of Modulate

  • Popular
  • a.

    Adapted to the means of the common people; possessed or obtainable by the many; hence, cheap; common; ordinary; inferior; as, popular prices; popular amusements.

  • Moduli
  • pl.

    of Modulus

  • Module
  • n.

    The size of some one part, as the diameter of semi-diameter of the base of a shaft, taken as a unit of measure by which the proportions of the other parts of the composition are regulated. Generally, for columns, the semi-diameter is taken, and divided into a certain number of parts, called minutes (see Minute), though often the diameter is taken, and any dimension is said to be so many modules and minutes in height, breadth, or projection.

  • Jocular
  • a.

    Given to jesting; jocose; as, a jocular person.

  • Molar
  • n.

    Any one of the teeth back of the incisors and canines. The molar which replace the deciduous or milk teeth are designated as premolars, and those which are not preceded by deciduous teeth are sometimes called true molars. See Tooth.

  • Ocular
  • a.

    Depending on, or perceived by, the eye; received by actual sight; personally seeing or having seen; as, ocular proof.

  • Popular
  • a.

    Prevailing among the people; epidemic; as, a popular disease.

  • Popular
  • a.

    Of or pertaining to the common people, or to the whole body of the people, as distinguished from a select portion; as, the popular voice; popular elections.

  • Populous
  • a.

    Popular; famous.

  • Ovular
  • a.

    Relating or belonging to an ovule; as, an ovular growth.

  • Nodular
  • a.

    Of, pertaining to, or in the form of, a nodule or knot.

  • Molar
  • a.

    Having power to grind; grinding; as, the molar teeth; also, of or pertaining to the molar teeth.

  • Modulate
  • v. t.

    To vary or inflect in a natural, customary, or musical manner; as, the organs of speech modulate the voice in reading or speaking.

  • Modular
  • a.

    Of or pertaining to mode, modulation, module, or modius; as, modular arrangement; modular accent; modular measure.

  • Morulae
  • pl.

    of Morula

  • Rumkin
  • n.

    A popular or jocular name for a drinking vessel.

  • Module
  • n.

    To model; also, to modulate.