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COMPONENT THEOREM

  • Component theorem
  • Classification of finite simple groups

    In the mathematical classification of finite simple groups, the component theorem of Aschbacher (1975, 1976) shows that if G is a simple group of odd

    Component theorem

    Component_theorem

  • Classification of finite simple groups
  • Theorem classifying finite simple groups

    involution. This is accomplished by the B-theorem, which states that every component of C/O(C) is the image of a component of C. The idea is that these groups

    Classification of finite simple groups

    Classification of finite simple groups

    Classification_of_finite_simple_groups

  • Residue theorem
  • Concept of complex analysis

    theorem; however, the latter can be used as a component of its proof. The statement is as follows: Residue theorem: Let U {\displaystyle U} be a simply connected

    Residue theorem

    Residue theorem

    Residue_theorem

  • Nyquist–Shannon sampling theorem
  • Sufficiency theorem for reconstructing signals from samples

    The Nyquist–Shannon sampling theorem is a theorem in the field of signal processing which serves as a fundamental bridge between continuous-time signals

    Nyquist–Shannon sampling theorem

    Nyquist–Shannon sampling theorem

    Nyquist–Shannon_sampling_theorem

  • Jordan curve theorem
  • Theorem in topology

    complement has 2 connected components. There is a strengthening of the Jordan curve theorem, called the Jordan–Schönflies theorem, which states that the interior

    Jordan curve theorem

    Jordan curve theorem

    Jordan_curve_theorem

  • Bézout's theorem
  • Number of intersection points of algebraic curves and hypersurfaces

    Bézout's theorem is a statement concerning the number of common zeros of n polynomials in n indeterminates. In its original form the theorem states that

    Bézout's theorem

    Bézout's_theorem

  • Kirchhoff's theorem
  • On the number of spanning trees in a graph

    mathematical field of graph theory, Kirchhoff's theorem or Kirchhoff's matrix tree theorem is a theorem about the number of spanning trees in a graph.

    Kirchhoff's theorem

    Kirchhoff's_theorem

  • Frisch–Waugh–Lovell theorem
  • Theorem in statistics and econometrics

    econometrics, the Frisch–Waugh–Lovell (FWL) theorem proves a property of ordinary least squares estimators. The theorem is named for econometricians Ragnar Frisch

    Frisch–Waugh–Lovell theorem

    Frisch–Waugh–Lovell theorem

    Frisch–Waugh–Lovell_theorem

  • Pythagorean theorem
  • Relation between sides of a right triangle

    In mathematics, the Pythagorean theorem or Pythagoras's theorem is a fundamental relation in Euclidean geometry between the three sides of a right triangle

    Pythagorean theorem

    Pythagorean theorem

    Pythagorean_theorem

  • Schnirelmann density
  • In additive number theory, a way to measure how dense a sequence of numbers is

    (1942). "On Erdõs's theorem on the addition of numerical sequences". Mat. Sb. 10: 67–78. Zbl 0063.03574. Imre Z. Ruzsa, Essential Components, Proceedings of

    Schnirelmann density

    Schnirelmann_density

  • Principal component analysis
  • Method of data analysis

    and factor analysis see Ch. 7 of Jolliffe's Principal Component Analysis), Eckart–Young theorem (Harman, 1960), or empirical orthogonal functions (EOF)

    Principal component analysis

    Principal component analysis

    Principal_component_analysis

  • Central limit theorem
  • Fundamental theorem in probability theory and statistics

    In probability theory, the central limit theorem (CLT) states that, under appropriate conditions, the distribution of a normalized version of the sample

    Central limit theorem

    Central limit theorem

    Central_limit_theorem

  • Primary decomposition
  • In algebra, expression of an ideal as the intersection of ideals of a specific type

    In mathematics, the Lasker–Noether theorem states that every Noetherian ring is a Lasker ring, which means that every ideal can be decomposed as an intersection

    Primary decomposition

    Primary_decomposition

  • CPT symmetry
  • Invariance under simultaneous charge conjugation, parity transformation and time reversal

    explicit proofs, so this theorem is sometimes known as the Lüders–Pauli theorem. At about the same time, and independently, this theorem was also proved by

    CPT symmetry

    CPT_symmetry

  • Chasles' theorem (kinematics)
  • Every rigid motion is a screw displacement

    components, one parallel to the axis of rotation associated with the isometry and the other component perpendicular to that axis. The Chasles theorem

    Chasles' theorem (kinematics)

    Chasles' theorem (kinematics)

    Chasles'_theorem_(kinematics)

  • Green's theorem
  • Theorem in calculus relating line and double integrals

    In vector calculus, Green's theorem relates a line integral around a simple closed curve C to a double integral over the plane region D (surface in R

    Green's theorem

    Green's_theorem

  • Divergence theorem
  • Theorem in calculus

    In vector calculus, the divergence theorem, also known as Gauss's theorem or Ostrogradsky's theorem, is a theorem relating the flux of a vector field through

    Divergence theorem

    Divergence_theorem

  • Seifert–Van Kampen theorem
  • Describes the fundamental group in terms of a cover by two open path-connected subspaces

    pushouts. Theorem. Let the topological space X be covered by the interiors of two subspaces X1, X2 and let A be a set which meets each path component of X1

    Seifert–Van Kampen theorem

    Seifert–Van_Kampen_theorem

  • Stokes' theorem
  • Theorem in vector calculus

    theorem, also known as the Kelvin–Stokes theorem after Lord Kelvin and George Stokes, the fundamental theorem for curls, or simply the curl theorem,

    Stokes' theorem

    Stokes' theorem

    Stokes'_theorem

  • Runge's theorem
  • Theorem in complex analysis

    In complex analysis, Runge's theorem (also known as Runge's approximation theorem) is named after the German mathematician Carl Runge who first proved

    Runge's theorem

    Runge's theorem

    Runge's_theorem

  • Noether's theorem
  • Statement relating differentiable symmetries to conserved quantities

    Noether's theorem states that every continuous symmetry of the action of a physical system with conservative forces has a corresponding conservation law

    Noether's theorem

    Noether's theorem

    Noether's_theorem

  • Symmetrical components
  • Method of analysis of unbalanced three-phase power systems

    phasors by means of a complex linear transformation. Fortescue's theorem (symmetrical components) is based on the superposition principle, so it is applicable

    Symmetrical components

    Symmetrical components

    Symmetrical_components

  • Component (graph theory)
  • Maximal subgraph whose vertices can reach each other

    as the product of the polynomials of its components. Numbers of components play a key role in Tutte's theorem on perfect matchings characterizing finite

    Component (graph theory)

    Component (graph theory)

    Component_(graph_theory)

  • Tutte's theorem on perfect matchings
  • Characterization of graphs with perfect matchings

    every vertex subset U in G, the graph G − U has at most |U| odd components. Tutte's theorem says that this condition is both necessary and sufficient for

    Tutte's theorem on perfect matchings

    Tutte's theorem on perfect matchings

    Tutte's_theorem_on_perfect_matchings

  • Ahlfors finiteness theorem
  • Mathematical theory

    finiteness theorem states that if Γ is a finitely-generated Kleinian group with region of discontinuity Ω, then Ω/Γ has a finite number of components, each

    Ahlfors finiteness theorem

    Ahlfors_finiteness_theorem

  • Thévenin's theorem
  • Theorem in electrical circuit analysis

    stated in terms of direct-current resistive circuits only, Thévenin's theorem states that "Any linear electrical network containing only voltage sources

    Thévenin's theorem

    Thévenin's theorem

    Thévenin's_theorem

  • Connectivity (graph theory)
  • Basic concept of graph theory

    One of the most important facts about connectivity in graphs is Menger's theorem, which characterizes the connectivity and edge-connectivity of a graph

    Connectivity (graph theory)

    Connectivity (graph theory)

    Connectivity_(graph_theory)

  • Pascal's theorem
  • Theorem in projective geometry

    In projective geometry, Pascal's theorem (also known as the hexagrammum mysticum theorem, Latin for mystical hexagram) states that if six arbitrary points

    Pascal's theorem

    Pascal's theorem

    Pascal's_theorem

  • Earnshaw's theorem
  • Statement on equilibrium in electromagnetism

    Earnshaw's theorem states that a collection of point charges cannot be maintained in a stable stationary equilibrium configuration solely by the electrostatic

    Earnshaw's theorem

    Earnshaw's theorem

    Earnshaw's_theorem

  • Mean value theorem
  • Theorem in mathematics

    In calculus and real analysis, the mean value theorem (or Lagrange's mean value theorem) is a theorem about differentiable functions, roughly stating

    Mean value theorem

    Mean_value_theorem

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

    Together with Ribet's theorem, it provides a proof for Fermat's Last Theorem. Both Fermat's Last Theorem and the modularity theorem were believed to be

    Wiles's proof of Fermat's Last Theorem

    Wiles's proof of Fermat's Last Theorem

    Wiles's_proof_of_Fermat's_Last_Theorem

  • Wigner–Eckart theorem
  • Theorem used in quantum mechanics for angular momentum calculations

    the Wigner–Eckart theorem is a theorem that tells how vector operators behave in a subspace. Within a given subspace, a component of a vector operator

    Wigner–Eckart theorem

    Wigner–Eckart_theorem

  • Universal approximation theorem
  • Property of artificial neural networks

    In the field of machine learning, the universal approximation theorems (UATs) state that neural networks with a certain structure can, in principle, approximate

    Universal approximation theorem

    Universal_approximation_theorem

  • Zariski's main theorem
  • Theorem of algebraic geometry and commutative algebra

    component of the transform of W is a projective space, which has dimension greater than W as predicted by Zariski's original form of his main theorem

    Zariski's main theorem

    Zariski's_main_theorem

  • ATS (programming language)
  • Programming language

    computer programming with formal specification. ATS has support for combining theorem proving with practical programming through the use of advanced type systems

    ATS (programming language)

    ATS (programming language)

    ATS_(programming_language)

  • Gordon–Luecke theorem
  • Two tame knots with homeomorphic complements are the same or mirror images

    In mathematics, the Gordon–Luecke theorem on knot complements states that if the complements of two tame knots are homeomorphic, then the knots are equivalent

    Gordon–Luecke theorem

    Gordon–Luecke_theorem

  • Kutta–Joukowski theorem
  • Formula relating lift on an airfoil to fluid speed, density, and circulation

    The Kutta–Joukowski theorem is a fundamental theorem in aerodynamics that relates the lift per unit span of an airfoil (and any two-dimensional body, including

    Kutta–Joukowski theorem

    Kutta–Joukowski_theorem

  • Strongly connected component
  • Partition of a graph whose components are reachable from all vertices

    every vertex is reachable from every other vertex. The strongly connected components of a directed graph form a partition into subgraphs that are strongly

    Strongly connected component

    Strongly connected component

    Strongly_connected_component

  • Perron–Frobenius theorem
  • Theorem in linear algebra

    have strictly positive components, and also asserts a similar statement for certain classes of nonnegative matrices. This theorem has important applications

    Perron–Frobenius theorem

    Perron–Frobenius_theorem

  • Cohen–Macaulay ring
  • Type of commutative ring in mathematics

    generally, a linear algebraic group whose identity component is reductive). This is the Hochster–Roberts theorem. Any determinantal ring. That is, let R be the

    Cohen–Macaulay ring

    Cohen–Macaulay_ring

  • Free will theorem
  • Quantum physics theorem on causality

    The free will theorem of John H. Conway and Simon B. Kochen states that if we have a free will in the sense that our choices are not a function of the

    Free will theorem

    Free_will_theorem

  • Petersen's theorem
  • Mathematical graph theorem

    connected components in the graph induced by V − U with an odd number of vertices is at most the cardinality of U. Then by Tutte's theorem on perfect

    Petersen's theorem

    Petersen's theorem

    Petersen's_theorem

  • No-hair theorem
  • Black holes are characterized only by mass, charge, and spin

    The no-hair theorem, also known as the black hole uniqueness theorem, states that all stationary black hole solutions of the Einstein–Maxwell equations

    No-hair theorem

    No-hair_theorem

  • Tychonoff's theorem
  • Product of any collection of compact topological spaces is compact

    Tychonoff's theorem states that the product of any collection of compact topological spaces is compact with respect to the product topology. The theorem is named

    Tychonoff's theorem

    Tychonoff's_theorem

  • Maxwell's theorem
  • Concept in probability theory

    In probability theory, Maxwell's theorem (known also as Herschel-Maxwell's theorem and Herschel-Maxwell's derivation) states that if the probability distribution

    Maxwell's theorem

    Maxwell's_theorem

  • Ergodic theory
  • Branch of mathematics that studies dynamical systems

    ergodic theorem then asserts that the average behavior of a function ƒ over sufficiently large time-scales is approximated by the orthogonal component of ƒ

    Ergodic theory

    Ergodic_theory

  • Berge's theorem
  • path component, it must either be in an alternating cycle or an even-length alternating path. Berge, Claude (September 15, 1957), "Two theorems in graph

    Berge's theorem

    Berge's theorem

    Berge's_theorem

  • Carathéodory kernel theorem
  • In mathematics, the Carathéodory kernel theorem is a result in complex analysis and geometric function theory established by the Greek mathematician Constantin

    Carathéodory kernel theorem

    Carathéodory_kernel_theorem

  • Divergence
  • Vector operator in vector calculus

    source density div v by the circulation density ∇ × v. This "decomposition theorem" is a by-product of the stationary case of electrodynamics. It is a special

    Divergence

    Divergence

    Divergence

  • Classification of Fatou components
  • Components of the Fatou set

    wandering domains: these are Fatou components that are not eventually periodic. No-wandering-domain theorem Montel's theorem John Domains Basins of attraction

    Classification of Fatou components

    Classification_of_Fatou_components

  • Shell theorem
  • Statement on the gravitational attraction of spherical bodies

    shell theorem gives gravitational simplifications that can be applied to objects inside or outside a spherically symmetric body. This theorem has particular

    Shell theorem

    Shell_theorem

  • No-cloning theorem
  • Theorem in quantum information science

    In physics, the no-cloning theorem states that it is impossible to create an independent and identical copy of an arbitrary unknown quantum state, a statement

    No-cloning theorem

    No-cloning_theorem

  • B-theorem
  • Theorem in group theory

    In mathematics, the B-theorem is a result in finite group theory formerly known as the B-conjecture. The theorem states that if C {\displaystyle C} is

    B-theorem

    B-theorem

  • Principal axis theorem
  • Principle in geometry and linear algebra

    principal axis theorem is a geometrical counterpart of the spectral theorem. It has applications to the statistics of principal components analysis and

    Principal axis theorem

    Principal_axis_theorem

  • Helmholtz decomposition
  • Certain vector fields are the sum of an irrotational and a solenoidal vector field

    In physics and mathematics, the Helmholtz decomposition theorem or the fundamental theorem of vector calculus states that certain differentiable vector

    Helmholtz decomposition

    Helmholtz_decomposition

  • Equipartition theorem
  • Theorem in classical statistical mechanics

    mechanics, the equipartition theorem relates the temperature of a system to its average energies. The equipartition theorem is also known as the law of

    Equipartition theorem

    Equipartition theorem

    Equipartition_theorem

  • Grushko theorem
  • Theorem in group theory

    mathematical subject of group theory, the Grushko theorem or the Grushko–Neumann theorem is a theorem stating that the rank (that is, the smallest cardinality

    Grushko theorem

    Grushko_theorem

  • Irreducible component
  • Subset (often algebraic set) that is not the union of subsets of the same nature

    irreducible, and its irreducible components are the two lines of equations x = 0 and y = 0. It is a fundamental theorem of classical algebraic geometry

    Irreducible component

    Irreducible_component

  • Grinberg's theorem
  • On Hamiltonian cycles in planar graphs

    In graph theory, Grinberg's theorem is a necessary condition for a planar graph to contain a Hamiltonian cycle, based on the lengths of its face cycles

    Grinberg's theorem

    Grinberg's theorem

    Grinberg's_theorem

  • Tutte–Berge formula
  • Characterization of the size of a maximum matching in a graph

    many connected components by removing a small set of vertices without regard to the parity of the components Hall's marriage theorem Berge, C. (1958)

    Tutte–Berge formula

    Tutte–Berge formula

    Tutte–Berge_formula

  • Sharkovskii's theorem
  • Mathematical rule

    In mathematics, Sharkovskii's theorem (also spelled Sharkovsky, Sharkovskiy, Šarkovskii or Sarkovskii), named after Oleksandr Mykolayovych Sharkovsky

    Sharkovskii's theorem

    Sharkovskii's_theorem

  • Chinese remainder theorem
  • About simultaneous modular congruences

    In mathematics, the Chinese remainder theorem states that if one knows the remainders of the Euclidean division of an integer n by several integers, then

    Chinese remainder theorem

    Chinese remainder theorem

    Chinese_remainder_theorem

  • Inverse function theorem
  • Theorem in mathematics

    In mathematical analysis, the inverse function theorem gives sufficient conditions for a function to have an inverse function. The essential idea is that

    Inverse function theorem

    Inverse function theorem

    Inverse_function_theorem

  • Shockley–Ramo theorem
  • The Shockley–Ramo theorem is a method for calculating the electric current induced by a charge moving in the vicinity of an electrode. Previously named

    Shockley–Ramo theorem

    Shockley–Ramo_theorem

  • Five color theorem
  • Planar maps require at most five colors

    The five color theorem is a result from graph theory that given a plane separated into regions, such as a political map of the countries of the world

    Five color theorem

    Five color theorem

    Five_color_theorem

  • Varignon's theorem (mechanics)
  • theorem is a theorem of French mathematician Pierre Varignon (1654–1722), published in 1687 in his book Projet d'une nouvelle mécanique. The theorem states

    Varignon's theorem (mechanics)

    Varignon's_theorem_(mechanics)

  • Fourier transform
  • Mathematical transform that expresses a function of time as a function of frequency

    sufficient regularity and decay properties is given by the Fourier inversion theorem, i.e., Inverse transform The functions f {\displaystyle f} and f ^ {\displaystyle

    Fourier transform

    Fourier transform

    Fourier_transform

  • Chevalley's structure theorem
  • Theorem in algebraic geometry

    In algebraic geometry, Chevalley's structure theorem states that a smooth connected algebraic group over a perfect field has a unique normal smooth connected

    Chevalley's structure theorem

    Chevalley's_structure_theorem

  • Convolution theorem
  • Theorem in mathematics

    portion of components u {\displaystyle u} and v {\displaystyle v} are often limited to duration P , {\displaystyle P,} but nothing in the theorem requires

    Convolution theorem

    Convolution_theorem

  • Abiotic component
  • Non-living factors that affect organisms and ecosystems

    In ecology, abiotic components or abiotic factors are non-living chemical and physical parts of the environment that affect living organisms and the functioning

    Abiotic component

    Abiotic_component

  • Gauss–Markov theorem
  • Theorem related to ordinary least squares

    In statistics, the Gauss–Markov theorem (or simply Gauss theorem for some authors) states that the ordinary least squares (OLS) estimator has the lowest

    Gauss–Markov theorem

    Gauss–Markov_theorem

  • Green–Tao theorem
  • Theorem about prime numbers

    and Green–Tao–Ziegler. Green and Tao's proof has three main components: Szemerédi's theorem, which asserts that subsets of the integers with positive upper

    Green–Tao theorem

    Green–Tao_theorem

  • Gershgorin circle theorem
  • Bound on eigenvalues

    In mathematics, the Gershgorin circle theorem (also called sometimes Gershgorin Disk Theorem) may be used to bound the spectrum of a square matrix. It

    Gershgorin circle theorem

    Gershgorin_circle_theorem

  • Jacobian matrix and determinant
  • Matrix of partial derivatives of a vector-valued function

    generalization includes generalizations of the inverse function theorem and the implicit function theorem, where the non-nullity of the derivative is replaced by

    Jacobian matrix and determinant

    Jacobian_matrix_and_determinant

  • Generalized Stokes theorem
  • Statement about integration on manifolds

    generalized Stokes theorem (sometimes with apostrophe as Stokes' theorem or Stokes's theorem), also called the Stokes–Cartan theorem, is a statement about

    Generalized Stokes theorem

    Generalized_Stokes_theorem

  • Electrical network
  • Assemblage of connected electrical elements

    An electrical network is an interconnection of electrical components (e.g., batteries, resistors, inductors, capacitors, switches, transistors) or a model

    Electrical network

    Electrical network

    Electrical_network

  • Kronecker's theorem
  • Theorem about Diophantine approximations

    Kronecker's theorem is a theorem about diophantine approximation, introduced by Leopold Kronecker (1884). Kronecker's approximation theorem had been firstly

    Kronecker's theorem

    Kronecker's_theorem

  • Wilks' theorem
  • Statistical theorem

    In statistics, Wilks' theorem offers an asymptotic distribution of the log-likelihood ratio statistic, which can be used to produce confidence intervals

    Wilks' theorem

    Wilks'_theorem

  • Gauss's law
  • Foundational law of electromagnetism relating electric field and charge distributions

    as Gauss's flux theorem or sometimes Gauss's theorem, is one of Maxwell's equations. It is an application of the divergence theorem, and it relates the

    Gauss's law

    Gauss's law

    Gauss's_law

  • Japanese theorem for cyclic polygons
  • Theorem in Euclidean geometry

    case of the cyclic polygon theorem is an immediate corollary. The quadrilateral rule can be applied to quadrilateral components of a general partition of

    Japanese theorem for cyclic polygons

    Japanese theorem for cyclic polygons

    Japanese_theorem_for_cyclic_polygons

  • Takens's theorem
  • Conditions under which a chaotic system can be reconstructed by observation

    derivative is of full rank and has no special symmetries in its components. The delay embedding theorem states that the function φ T ( x ) = ( α ( x ) , α ( f

    Takens's theorem

    Takens's theorem

    Takens's_theorem

  • Line graph
  • Graph representing edges of another graph

    properties of the underlying graph from vertices into edges, and by Whitney's theorem the same translation can also be done in the other direction. Line graphs

    Line graph

    Line_graph

  • Cauchy's integral theorem
  • Theorem in complex analysis

    In mathematics, the Cauchy integral theorem (also known as the Cauchy–Goursat theorem) in complex analysis, named after Augustin-Louis Cauchy (and Édouard

    Cauchy's integral theorem

    Cauchy's integral theorem

    Cauchy's_integral_theorem

  • Virial theorem
  • Physics theorem

    In mechanics, the virial theorem provides a general equation that relates the average over time of the total kinetic energy of a stable system of discrete

    Virial theorem

    Virial_theorem

  • Cayley–Hamilton theorem
  • Square matrices satisfy their characteristic equation

    In linear algebra, the Cayley–Hamilton theorem (named after the mathematicians Arthur Cayley and William Rowan Hamilton) states that every square matrix

    Cayley–Hamilton theorem

    Cayley–Hamilton theorem

    Cayley–Hamilton_theorem

  • Vampire (theorem prover)
  • Vampire is an automatic theorem prover for first-order classical logic developed in the Department of Computer Science at the University of Manchester

    Vampire (theorem prover)

    Vampire_(theorem_prover)

  • Krohn–Rhodes theory
  • Approach to the study of finite semigroups and automata

    Krohn and Rhodes explicitly refer to their theorem as a "prime decomposition theorem" for automata. The components in the decomposition, however, are not

    Krohn–Rhodes theory

    Krohn–Rhodes_theory

  • Lickorish–Wallace theorem
  • Characterizes closed, orientable, connected 3-manifolds via Dehn surgery on a 3-sphere

    ±1 surgery coefficients. Furthermore, each component of the link can be assumed to be unknotted. The theorem was proved in the early 1960s by W. B. R.

    Lickorish–Wallace theorem

    Lickorish–Wallace_theorem

  • Tennis racket theorem
  • A rigid body with 3 distinct axes of inertia is unstable rotating about the middle axis

    The tennis racket theorem, or intermediate axis theorem, is a kinetic phenomenon of classical mechanics which describes the movement of a rigid body with

    Tennis racket theorem

    Tennis racket theorem

    Tennis_racket_theorem

  • Liouville's theorem (Hamiltonian)
  • Key result in Hamiltonian mechanics and statistical mechanics

    In physics, Liouville's theorem, named after the French mathematician Joseph Liouville, is a key theorem in classical statistical and Hamiltonian mechanics

    Liouville's theorem (Hamiltonian)

    Liouville's_theorem_(Hamiltonian)

  • Honeycomb theorem
  • Mathematical theorem

    for the hexagon tiling. The theorem applies even if the complement of Γ {\displaystyle \Gamma } has additional components that are unbounded or whose

    Honeycomb theorem

    Honeycomb theorem

    Honeycomb_theorem

  • Shannon–Hartley theorem
  • Theorem that tells the maximum rate at which information can be transmitted

    In information theory, the Shannon–Hartley theorem tells the maximum rate at which information can be transmitted over a communications channel of a specified

    Shannon–Hartley theorem

    Shannon–Hartley_theorem

  • Petr–Douglas–Neumann theorem
  • Construction on any polygon that yields a regular polygon with the same number of sides

    geometry, the Petr–Douglas–Neumann theorem (or the PDN-theorem) is a result concerning arbitrary planar polygons. The theorem asserts that a certain procedure

    Petr–Douglas–Neumann theorem

    Petr–Douglas–Neumann_theorem

  • Threshold theorem
  • Quantum error correction schemes can suppress the logical error rate arbitrarily low

    In quantum computing, the threshold theorem (or quantum fault-tolerance theorem) states that a quantum computer with a physical error rate below a certain

    Threshold theorem

    Threshold_theorem

  • Cauchy's theorem (group theory)
  • Existence of group elements of prime order

    In mathematics, specifically group theory, Cauchy's theorem states that if G is a finite group and p is a prime number dividing the order of G (the number

    Cauchy's theorem (group theory)

    Cauchy's theorem (group theory)

    Cauchy's_theorem_(group_theory)

  • Hellmann–Feynman theorem
  • Theorem in quantum mechanics

    In quantum mechanics, the Hellmann–Feynman theorem relates the derivative of the total energy with respect to a parameter to the expectation value of

    Hellmann–Feynman theorem

    Hellmann–Feynman_theorem

  • Addition theorem
  • Result that expresses a function f(x + y) in terms of f(x) and f(y)

    can assume that F and G are vector-valued (have several components). An algebraic addition theorem is one in which G can be taken to be a vector of polynomials

    Addition theorem

    Addition_theorem

  • Connected space
  • Topological space that is connected

    definition). Every component is a closed subset of the original space. It follows that, in the case where their number is finite, each component is also an open

    Connected space

    Connected space

    Connected_space

  • Tennis ball theorem
  • On inflection points of spherical curves

    great circle. The theorem states that every C 2 {\displaystyle C^{2}} curve that partitions the sphere into two equal-area components has at least four

    Tennis ball theorem

    Tennis ball theorem

    Tennis_ball_theorem

  • Pappus's centroid theorem
  • Results on the surface areas and volumes of surfaces and solids of revolution

    Pappus's centroid theorem (also known as the Guldinus theorem, Pappus–Guldinus theorem or Pappus's theorem) is either of two related theorems dealing with

    Pappus's centroid theorem

    Pappus's centroid theorem

    Pappus's_centroid_theorem

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Online names & meanings

  • Hucke
  • Surname or Lastname

    English

    Hucke

    English : variant of Huck 1.German : topographic name from huck, a dialect word meaning ‘bog’.German : variant of Huck 2 and 3.German (of Slavic origin) : pet form of Sorbian hui ‘uncle’.

  • Tahirah
  • Girl/Female

    African, Arabic, French, Muslim

    Tahirah

    Chaste; Pure; Virginal; Another Name for Hazrat Fatimah Zahra

  • Savyasachi
  • Boy/Male

    Hindu

    Savyasachi

    Another name of Arjun

  • Farzad
  • Boy/Male

    Afghan, Arabic, Indian, Iranian, Muslim, Parsi, Persian

    Farzad

    Splendid Birth

  • Jerren
  • Boy/Male

    American, British, English

    Jerren

    To Sing

  • Creusa
  • Girl/Female

    Greek

    Creusa

    Daughter of Erechtheus.

  • Bhayanashini
  • Girl/Female

    Hindu, Indian, Sindhi, Traditional

    Bhayanashini

    Remover of Fear

  • Kalyanin | கல்யாநீந
  • Boy/Male

    Tamil

    Kalyanin | கல்யாநீந

    Virtuous

  • Anshumali
  • Girl/Female

    Hindu, Indian, Kannada, Malayalam, Marathi, Telugu

    Anshumali

    Sun

  • Alayha
  • Girl/Female

    Indian, Modern, Telugu

    Alayha

    Powerful; Complete

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COMPONENT THEOREM

  • Ingrediency
  • n.

    The quality or state of being an ingredient or component part.

  • Dissolution
  • n.

    The act of dissolving, sundering, or separating into component parts; separation.

  • Constituent
  • a.

    Serving to form, compose, or make up; elemental; component.

  • Species
  • n.

    A component part of compound medicine; a simple.

  • Opponent
  • n.

    One who opposes in a disputation, argument, or other verbal controversy; specifically, one who attacks some theirs or proposition, in distinction from the respondent, or defendant, who maintains it.

  • Gonidium
  • n.

    A component cell of the yellowish green layer in certain lichens.

  • Competent
  • a.

    Answering to all requirements; adequate; sufficient; suitable; capable; legally qualified; fit.

  • Oppugnant
  • n.

    An opponent.

  • Competent
  • a.

    Rightfully or properly belonging; incident; -- followed by to.

  • Compony
  • a.

    Alt. of Compone

  • Basis
  • n.

    The principal component part of a thing.

  • Component
  • n.

    A constituent part; an ingredient.

  • Disaggregation
  • n.

    The separation of an aggregate body into its component parts.

  • Irresolvable
  • a.

    Incapable of being resolved; not separable into component parts.

  • Contrary
  • n.

    An opponent; an enemy.

  • Component
  • v. t.

    Serving, or helping, to form; composing; constituting; constituent.

  • Ripple
  • n.

    the residual AC component in the DC current output from a rectifier, expressed as a percentage of the steady component of the current.

  • Ingredient
  • a.

    Entering as, or forming, an ingredient or component part.

  • Opponent
  • n.

    One who opposes; an adversary; an antagonist; a foe.

  • Metasome
  • n.

    One of the component segments of the body of an animal.