Search for "Curves" in article titles:

1. Dangerous Curves (1929 film): Dangerous Curves is a 1929 American Pre-Code film starring Clara Bow and Richard Arlen. It was released by Paramount Pictures and was the first Hollywood film for Kay Francis. (1929 film) [100%] 2023-11-04 [1929 films] [Circus films]...
2. Dangerous Curves (1988 film): Dangerous Curves is a 1988 American comedy film directed by David Lewis and starring Tate Donovan and Grant Heslov. The movie also featured brief appearances by Debbe Dunning and Cynthia Geary, early in their respective careers. (1988 film) [100%] 2024-09-27 [1988 films] [1980s English-language films]...
3. Top Model Curves (season 1): Top Model Curves, season 1 was the first season of Top Model Curves. The first season features eighteen plus size models, who competed together for approximately twelve weeks. (Season 1) [89%] 2023-11-22 [Top Model] [2016 Danish television seasons]...
4. Sturm curves: Transcendental curves in the plane, described by a point associated with an ellipse, hyperbola or parabola, as it rolls along a straight line. An example of a Sturm curve is the trajectory of the focus of a parabola as it ... (Mathematics) [100%] 2023-10-17
5. Roses (curves): Planar curves whose equations in polar coordinates have the form $$\rho=a\sin k\phi,$$ where $a$ and $k$ are constants. If $k=m/n$ is a rational number, then a rose is an algebraic curve of even order. (Curves) [100%] 2023-10-17
6. Pearson curves: The name of a family of continuous probability distributions (Pearson distributions) whose densities $ p( x) $ satisfy the Pearson differential equation $$ \tag{* } \frac{dp(x)}{dx} = \frac{x-a}{b _ {0} + b _ {1} x + b _ {2} x ^ {2 ... (Mathematics) [100%] 2023-10-12
7. Bertrand curves: conjugate curves, Bertrand pair Two space curves $L$ and $L^*$ with common principal normals. Let $k_1$ and $k_2$ be the curvature and the torsion of $L$ respectively. (Mathematics) [100%] 2023-10-13
8. Cone of curves: In mathematics, the cone of curves (sometimes the Kleiman-Mori cone) of an algebraic variety \displaystyle{ X }[/math] is a combinatorial invariant of importance to the birational geometry of \displaystyle{ X }[/math]. Let \displaystyle{ X }[/math] be a proper variety. [81%] 2023-09-26 [Algebraic geometry] [Birational geometry]...
9. Twists of curves: In the mathematical field of algebraic geometry, an elliptic curve E over a field K has an associated quadratic twist, that is another elliptic curve which is isomorphic to E over an algebraic closure of K. In particular, an isomorphism ... [81%] 2022-11-12 [Elliptic curves] [Elliptic curve cryptography]...
10. Robinson–Dadson curves: The Robinson–Dadson curves are one of many sets of equal-loudness contours for the human ear, determined experimentally by D. W. (Physics) [81%] 2023-12-14 [Acoustics] [Audio engineering]...
11. Fletcher–Munson curves: The Fletcher–Munson curves are one of many sets of equal-loudness contours for the human ear, determined experimentally by Harvey Fletcher and Wilden A. Munson, and reported in a 1933 paper entitled "Loudness, its definition, measurement and calculation" in ... (Engineering) [81%] 2022-12-11 [Audio engineering]
12. Family of curves: In geometry, a family of curves is a set of curves, each of which is given by a function or parametrization in which one or more of the parameters is variable. In general, the parameter(s) influence the shape of ... (Set of curves from a function with variable parameter(s)) [81%] 2023-10-11 [Algebraic geometry]
13. Twisted Hessian curves: In mathematics, the Twisted Hessian curve represents a generalization of Hessian curves; it was introduced in elliptic curve cryptography to speed up the addition and doubling formulas and to have strongly unified arithmetic. In some operations (see the last sections ... [81%] 2023-09-25 [Elliptic curves] [Elliptic curve cryptography]...
14. Elkies trinomial curves: thumb|Elkies trinomial curve C168 In number theory, the Elkies trinomial curves are certain hyperelliptic curves constructed by Noam Elkies which have the property that rational points on them correspond to trinomial polynomials giving an extension of Q with particular ... [81%] 2024-09-01 [Galois theory] [Number theory]...
15. Family of curves: In geometry, a family of curves is a set of curves, each of which is given by a function or parametrization in which one or more of the parameters is variable. In general, the parameter(s) influence the shape of ... (Set of curves from a function with variable parameter(s)) [81%] 2024-09-01 [Algebraic geometry]
16. List of curves: This is a list of Wikipedia articles about curves used in different fields: mathematics (including geometry, statistics, and applied mathematics), physics, engineering, economics, medicine, biology, psychology, ecology, etc. Rational curves are subdivided according to the degree of the polynomial. (none) [81%] 2024-09-01 [Curves] [Algebraic curves]...
17. Affine geometry of curves: In the mathematical field of differential geometry, the affine geometry of curves is the study of curves in an affine space, and specifically the properties of such curves which are invariant under the special affine group SL ( n , R ) ⋉ R ... [70%] 2023-02-27 [Curves] [Differential geometry]...
18. Long-run cost curves: In microeconomic theory, a long-run cost curve is a cost curve (also known as a cost function) that relates costs to quantities of production when long-run decisions and actions can affect costs of production for a firm. The ... (Finance) [70%] 2023-11-09 [Costs] [Economics curves]...
19. List of curves topics: This is an alphabetical index of articles related to curves used in mathematics. (none) [70%] 2023-11-29 [Curves] [Mathematics-related lists]...
20. Fundamental theorem of curves: In differential geometry, the fundamental theorem of space curves states that every regular curve in three-dimensional space, with non-zero curvature, has its shape (and size or scale) completely determined by its curvature and torsion. A curve can be ... (Regular 3-D curves are shape and size determined by their curvature and torsion) [70%] 2022-11-28 [Differential geometry] [Theorems in differential geometry]...
21. Lyapunov surfaces and curves: A class of surfaces and curves that have quite good smoothness properties; it was introduced in potential theory by A.M. Lyapunov at the turn into the 20th century. (Mathematics) [70%] 2023-04-24
22. Moduli of algebraic curves: In algebraic geometry, a moduli space of (algebraic) curves is a geometric space (typically a scheme or an algebraic stack) whose points represent isomorphism classes of algebraic curves. It is thus a special case of a moduli space. [70%] 2022-05-10 [Algebraic varieties]
23. Counting points on elliptic curves: An important aspect in the study of elliptic curves is devising effective ways of counting points on the curve. There have been several approaches to do so, and the algorithms devised have proved to be useful tools in the study ... [63%] 2023-10-13 [Elliptic curves]
24. Vector bundles on algebraic curves: In mathematics, vector bundles on algebraic curves may be studied as holomorphic vector bundles on compact Riemann surfaces, which is the classical approach, or as locally free sheaves on algebraic curves C in a more general, algebraic setting (which can ... [63%] 2024-09-01 [Algebraic curves] [Vector bundles]...
25. Nagata s conjecture on curves: In mathematics, the Nagata conjecture on curves, named after Masayoshi Nagata, governs the minimal degree required for a plane algebraic curve to pass through a collection of very general points with prescribed multiplicities. Nagata arrived at the conjecture via work ... [63%] 2024-09-01 [Algebraic curves] [Conjectures]...
26. Moduli stack of elliptic curves: In mathematics, the moduli stack of elliptic curves, denoted as \displaystyle{ \mathcal{M}_{1,1} }[/math] or \displaystyle{ \mathcal{M}_{\textrm{ell}} }[/math], is an algebraic stack over \displaystyle{ \text{Spec}(\mathbb{Z}) }[/math] classifying elliptic curves. Note ... [63%] 2024-09-01 [Algebraic geometry]
27. Singular integral operators on closed curves: In mathematics, singular integral operators on closed curves arise in problems in analysis, in particular complex analysis and harmonic analysis. The two main singular integral operators, the Hilbert transform and the Cauchy transform, can be defined for any smooth Jordan ... [57%] 2022-08-26 [Operator theory] [Harmonic analysis]...
28. Max Noether s theorem on curves: In algebraic geometry, Max Noether's theorem on curves is a theorem about curves lying on algebraic surfaces, which are hypersurfaces in P, or more generally complete intersections. It states that, for degree at least four for hypersurfaces, the generic ... [57%] 2024-09-01 [Algebraic geometry]
29. Hasse s theorem on elliptic curves: Hasse's theorem on elliptic curves, also referred to as the Hasse bound, provides an estimate of the number of points on an elliptic curve over a finite field, bounding the value both above and below. If N is the ... (Estimates the number of points on an elliptic curve over a finite field) [57%] 2024-09-01 [Elliptic curves] [Finite fields]...
30. List of law school GPA curves: Many, or perhaps most, law schools in the United States grade on a norm-referenced grading curve. The process generally works within each class, where the instructor grades each exam, and then ranks the exams against each other, adding to ... (none) [57%] 2025-01-13 [Educational assessment and evaluation] [Law schools in the United States]...