fuzzy equation - definição. O que é fuzzy equation. Significado, conceito
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O que (quem) é fuzzy equation - definição

SETS WHOSE ELEMENTS HAVE DEGREES OF MEMBERSHIP
Fuzzy sets; Fuzzy set theory; Fuzzification; Fuzzy subset; Credibility(fuzzy); Fuzzy category; Goguen category; Fuzzy Sets; Fuzzy relation equation; Pythagorean fuzzy set; Degree of membership; Uncertain set
  • Some Key Developments in the Introduction of Fuzzy Set Concepts.<ref name="CADsurvey"/>

fuzzy subset         
In fuzzy logic, a fuzzy subset F of a set S is defined by a "membership function" which gives the degree of membership of each element of S belonging to F.
Schrödinger equation         
  • [[Erwin Schrödinger]]
  • 1-dimensional potential energy box (or infinite potential well)
  • spring]], oscillates back and forth. (C–H) are six solutions to the Schrödinger Equation for this situation. The horizontal axis is position, the vertical axis is the real part (blue) or imaginary part (red) of the [[wave function]]. [[Stationary state]]s, or energy eigenstates, which are solutions to the time-independent Schrödinger equation, are shown in C, D, E, F, but not G or H.
  • harmonic oscillator]]. Left: The real part (blue) and imaginary part (red) of the wave function. Right: The [[probability distribution]] of finding the particle with this wave function at a given position. The top two rows are examples of '''[[stationary state]]s''', which correspond to [[standing wave]]s. The bottom row is an example of a state which is ''not'' a stationary state. The right column illustrates why stationary states are called "stationary".
  • 1=''V'' = 0}}. In other words, this corresponds to a particle traveling freely through empty space.
PARTIAL DIFFERENTIAL EQUATION DESCRIBING HOW THE QUANTUM STATE OF A NON-RELATIVISTIC PHYSICAL SYSTEM CHANGES WITH TIME
Schrodingers equation; Schroedinger's equation; Schroedinger equation; Schrödinger Wave Equation; Schrodinger's equation; Schrödinger wave equation; Schrödinger's equation; Schrödinger-equation; Schrödinger Equation; Schrödinger's wave equation; TDSE; Time-independent Schrödinger equation; Time-independent Schrodinger equation; Time-independent schrödinger equation; Time-independent schrodinger equation; Schrodinger Equation; Shrodinger equation; Shrodinger's equation; Schroedinger Equation; Sherdinger's equation; Shredinger's equation; Sherdinger equation; Shredinger equation; Schrodinger's wave equation; Schrodinger`s equation; Schrodiner`s equation; Erwin Schrodinger's wave model; Time independent Schrödinger equation; Schroedinger wave equation; Time-independent Schroedinger equation; Schrodinger Wave Equation; Schroedinger Wave Equation; Schroedinger's wave equation; Time independent Schroedinger equation; Schrodinger-equation; Time independent Schrodinger equation; Time-independent schroedinger equation; Schroedinger-equation; Schrodinger wave equation; Schrodinger equation; TISE; Schrodinger operator; Schrödinger’s equation; Schrodinger's Wave Equation; Schrödinger's Wave Equation; Schrodinger's Equation; Schrödinger's Equation; Schrodinger model; Schrödinger model; Non-Relativistic Schrodinger Wave Equation; Time-dependent Schrödinger equation; Schrodinger’s equation; Schrodenger equation
The Schrödinger equation is a linear partial differential equation that governs the wave function of a quantum-mechanical system. It is a key result in quantum mechanics, and its discovery was a significant landmark in the development of the subject.
Schrodinger equation         
  • [[Erwin Schrödinger]]
  • 1-dimensional potential energy box (or infinite potential well)
  • spring]], oscillates back and forth. (C–H) are six solutions to the Schrödinger Equation for this situation. The horizontal axis is position, the vertical axis is the real part (blue) or imaginary part (red) of the [[wave function]]. [[Stationary state]]s, or energy eigenstates, which are solutions to the time-independent Schrödinger equation, are shown in C, D, E, F, but not G or H.
  • harmonic oscillator]]. Left: The real part (blue) and imaginary part (red) of the wave function. Right: The [[probability distribution]] of finding the particle with this wave function at a given position. The top two rows are examples of '''[[stationary state]]s''', which correspond to [[standing wave]]s. The bottom row is an example of a state which is ''not'' a stationary state. The right column illustrates why stationary states are called "stationary".
  • 1=''V'' = 0}}. In other words, this corresponds to a particle traveling freely through empty space.
PARTIAL DIFFERENTIAL EQUATION DESCRIBING HOW THE QUANTUM STATE OF A NON-RELATIVISTIC PHYSICAL SYSTEM CHANGES WITH TIME
Schrodingers equation; Schroedinger's equation; Schroedinger equation; Schrödinger Wave Equation; Schrodinger's equation; Schrödinger wave equation; Schrödinger's equation; Schrödinger-equation; Schrödinger Equation; Schrödinger's wave equation; TDSE; Time-independent Schrödinger equation; Time-independent Schrodinger equation; Time-independent schrödinger equation; Time-independent schrodinger equation; Schrodinger Equation; Shrodinger equation; Shrodinger's equation; Schroedinger Equation; Sherdinger's equation; Shredinger's equation; Sherdinger equation; Shredinger equation; Schrodinger's wave equation; Schrodinger`s equation; Schrodiner`s equation; Erwin Schrodinger's wave model; Time independent Schrödinger equation; Schroedinger wave equation; Time-independent Schroedinger equation; Schrodinger Wave Equation; Schroedinger Wave Equation; Schroedinger's wave equation; Time independent Schroedinger equation; Schrodinger-equation; Time independent Schrodinger equation; Time-independent schroedinger equation; Schroedinger-equation; Schrodinger wave equation; Schrodinger equation; TISE; Schrodinger operator; Schrödinger’s equation; Schrodinger's Wave Equation; Schrödinger's Wave Equation; Schrodinger's Equation; Schrödinger's Equation; Schrodinger model; Schrödinger model; Non-Relativistic Schrodinger Wave Equation; Time-dependent Schrödinger equation; Schrodinger’s equation; Schrodenger equation
¦ noun Physics a differential equation which forms the basis of the quantum-mechanical description of a particle.
Origin
1920s: named after the Austrian physicist Erwin Schrodinger.

Wikipédia

Fuzzy set

In mathematics, fuzzy sets (a.k.a. uncertain sets) are sets whose elements have degrees of membership. Fuzzy sets were introduced independently by Lotfi A. Zadeh in 1965 as an extension of the classical notion of set. At the same time, Salii (1965) defined a more general kind of structure called an L-relation, which he studied in an abstract algebraic context. Fuzzy relations, which are now used throughout fuzzy mathematics and have applications in areas such as linguistics (De Cock, Bodenhofer & Kerre 2000), decision-making (Kuzmin 1982), and clustering (Bezdek 1978), are special cases of L-relations when L is the unit interval [0, 1].

In classical set theory, the membership of elements in a set is assessed in binary terms according to a bivalent condition—an element either belongs or does not belong to the set. By contrast, fuzzy set theory permits the gradual assessment of the membership of elements in a set; this is described with the aid of a membership function valued in the real unit interval [0, 1]. Fuzzy sets generalize classical sets, since the indicator functions (aka characteristic functions) of classical sets are special cases of the membership functions of fuzzy sets, if the latter only takes values 0 or 1. In fuzzy set theory, classical bivalent sets are usually called crisp sets. The fuzzy set theory can be used in a wide range of domains in which information is incomplete or imprecise, such as bioinformatics.