In mathematics, Felix Klein's j-invariant or j function, regarded as a function of a complex variable τ, is a modular function of weight zero for special...
27 KB (4,703 words) - 11:45, 7 August 2024
1728 (number) (section Modular j-invariant)
of the normalized j-invariant exapand as, 1728 j ( τ ) = 1 / q + 744 + 196884 q + 21493760 q 2 + ⋯ {\displaystyle 1728{\text{ }}j(\tau...
9 KB (1,448 words) - 19:35, 16 July 2024
The j-invariant of an elliptic curve given by the Weierstrass equation y 2 = x 3 + a x + b {\displaystyle y^{2}=x^{3}+ax+b} is given by the formula: j (...
25 KB (3,699 words) - 00:30, 30 December 2023
In mathematics, an invariant is a property of a mathematical object (or a class of mathematical objects) which remains unchanged after operations or transformations...
24 KB (2,785 words) - 09:56, 7 November 2024
J-function may refer to: The Klein j-invariant or j function in mathematics Leverett J-function in petroleum engineering This disambiguation page lists...
202 bytes (52 words) - 21:15, 28 December 2019
Invariant theory is a branch of abstract algebra dealing with actions of groups on algebraic varieties, such as vector spaces, from the point of view...
19 KB (2,590 words) - 20:58, 17 May 2024
Reshetikhin–Turaev invariant Tau-invariant I-Invariant Klein J-invariant Quantum isotopy invariant Ermakov–Lewis invariant Hermitian invariant Goussarov–Habiro theory...
4 KB (347 words) - 01:28, 2 May 2024
of the j-invariant. In what follows, j(z) denotes the j-invariant of the complex number z. Briefly, j ( 1 + − d 2 ) {\displaystyle \textstyle j\left({\frac...
17 KB (3,538 words) - 15:12, 27 September 2024
It comes from the phrase "singular values of the j-invariant" used for values of the j-invariant for which a complex elliptic curve has complex multiplication...
13 KB (2,235 words) - 10:11, 15 September 2024
Riemann surface (redirect from Conformally invariant)
sense of algebraic geometry. Reversing this is accomplished by the j-invariant j(E), which can be used to determine τ and hence a torus. The set of all...
26 KB (3,305 words) - 09:23, 3 November 2024
j, the second imaginary unit of a quaternion j, an index variable in a matrix The j-invariant, a modular function J, Joule, the SI unit of energy J,...
5 KB (784 words) - 22:43, 23 October 2024
Moduli stack of elliptic curves (section j-invariant)
affine line, the coarse moduli space of elliptic curves, given by the j-invariant of an elliptic curve. It is a classical observation that every elliptic...
14 KB (2,344 words) - 20:44, 22 September 2024
class invariant (or type invariant) is an invariant used for constraining objects of a class. Methods of the class should preserve the invariant. The class...
12 KB (1,585 words) - 05:12, 1 July 2024
the (cyclic) image of the J-homomorphism, and the kernel of the Adams e-invariant (Adams 1966), a homomorphism from the stable homotopy groups to Q / Z...
8 KB (918 words) - 21:06, 22 August 2023
coordinate: that is, both the Laplace–Beltrami operator and the curvature are invariant under isometries. Thus, for example, let S be a Riemann surface with metric...
10 KB (2,101 words) - 14:58, 4 July 2024
smooth curve appears is described by the j-invariant in the table. Over the complex numbers, the curve with j-invariant 0 is the unique elliptic curve with...
16 KB (1,883 words) - 18:07, 26 July 2024
equation Φn(x, y) = 0, such that (x, y) = (j(nτ), j(τ)) is a point on the curve. Here j(τ) denotes the j-invariant. The curve is sometimes called X0(n), though...
9 KB (1,283 words) - 23:03, 3 October 2024
Scale invariance (redirect from Scale invariant)
closely related concept is self-similarity, where a function or curve is invariant under a discrete subset of the dilations. It is also possible for the...
32 KB (4,486 words) - 11:45, 10 September 2024
In computer science, a loop invariant is a property of a program loop that is true before (and after) each iteration. It is a logical assertion, sometimes...
17 KB (2,426 words) - 22:47, 18 August 2023
Image moment (redirect from Moment invariant)
reversible. These invariants therefore are only approximately invariant when describing a shape in a discrete image. The central moments μi j of any order...
12 KB (2,164 words) - 06:50, 21 August 2024
approximately constant when changes occur slowly is called an adiabatic invariant. By this it is meant that if a system is varied between two end points...
20 KB (3,423 words) - 06:19, 17 April 2024
decomposed forms 1⁄2 or 1/2 may be more appropriate. Division by two Sloane, N. J. A. (ed.). "Sequence A159907 (Numbers n with half-integral abundancy index...
9 KB (1,030 words) - 05:39, 31 October 2024
lambda function Closely related are the modular forms, which include J-invariant Dedekind eta function Airy function Bessel functions: Defined by a differential...
10 KB (1,065 words) - 20:52, 29 October 2024
In control theory, a time-invariant (TI) system has a time-dependent system function that is not a direct function of time. Such systems are regarded...
8 KB (1,355 words) - 11:33, 6 February 2023
In geometry, the Dehn invariant is a value used to determine whether one polyhedron can be cut into pieces and reassembled ("dissected") into another...
40 KB (5,770 words) - 21:54, 21 August 2024
tiling of the Poincaré disk is given in a natural way by the J-invariant, which is invariant under the modular group, and attains every complex number once...
25 KB (3,316 words) - 14:48, 18 September 2024
For example, the Chudnovsky algorithm involves in an essential way the j-invariant of an elliptic curve. Modular forms are holomorphic functions in the...
148 KB (17,578 words) - 10:10, 1 November 2024
745. 744 is a semiperfect number. It is also an abundant number. The j-invariant, an important function in the study of modular forms and Monstrous moonshine...
2 KB (249 words) - 20:19, 19 August 2024
\mathbf {Q} } . This means that a formula expressing an invariant in terms of components, A i j {\displaystyle A_{ij}} , will give the same result for...
10 KB (1,661 words) - 22:50, 5 August 2024
degree term of the expansion of Klein's j-invariant, and the zeroth degree term of the Laurent series of the J-invariant. Furthermore, 744 = 3 × 248 where 248...
28 KB (4,004 words) - 22:57, 12 September 2024