scattergraph method - significado y definición. Qué es scattergraph method
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Qué (quién) es scattergraph method - definición

Schrodinger method; Schroedinger method; Schrodinger's method; Schroedinger's method; Schrödinger's method

Method (computer programming)         
COMPUTER FUNCTION OR SUBROUTINE THAT IS TIED TO A PARTICULAR INSTANCE OR CLASS
Class method; Instance method; Abstract method; Static method; Method (object-oriented programming); Method (programming); Member function; Method heading; Method name; Method (computing); Method (oo); Static functions; Static function; Static methods; Final method; Method (computer science); Hooking method; Method call; Special method; Overloaded method; Operator method; Method calls
A method in object-oriented programming (OOP) is a procedure associated with a message and an object. An object consists of state data and behavior; these compose an interface, which specifies how the object may be utilized by any of its various consumers.
class method         
COMPUTER FUNCTION OR SUBROUTINE THAT IS TIED TO A PARTICULAR INSTANCE OR CLASS
Class method; Instance method; Abstract method; Static method; Method (object-oriented programming); Method (programming); Member function; Method heading; Method name; Method (computing); Method (oo); Static functions; Static function; Static methods; Final method; Method (computer science); Hooking method; Method call; Special method; Overloaded method; Operator method; Method calls
<programming> A kind of method, available in some object-oriented programming languages, that operates on the class as a whole, as opposed to an object method that operates on an object that is an instance of the class. A typical example of a class method would be one that keeps a count of the number of objects of that class that have been created. (2000-03-22)
member function         
COMPUTER FUNCTION OR SUBROUTINE THAT IS TIED TO A PARTICULAR INSTANCE OR CLASS
Class method; Instance method; Abstract method; Static method; Method (object-oriented programming); Method (programming); Member function; Method heading; Method name; Method (computing); Method (oo); Static functions; Static function; Static methods; Final method; Method (computer science); Hooking method; Method call; Special method; Overloaded method; Operator method; Method calls
A method in C++.

Wikipedia

Schrödinger method

In combinatorial mathematics and probability theory, the Schrödinger method, named after the Austrian physicist Erwin Schrödinger, is used to solve some problems of distribution and occupancy.

Suppose

X 1 , , X n {\displaystyle X_{1},\dots ,X_{n}\,}

are independent random variables that are uniformly distributed on the interval [0, 1]. Let

X ( 1 ) , , X ( n ) {\displaystyle X_{(1)},\dots ,X_{(n)}\,}

be the corresponding order statistics, i.e., the result of sorting these n random variables into increasing order. We seek the probability of some event A defined in terms of these order statistics. For example, we might seek the probability that in a certain seven-day period there were at most two days in on which only one phone call was received, given that the number of phone calls during that time was 20. This assumes uniform distribution of arrival times.

The Schrödinger method begins by assigning a Poisson distribution with expected value λt to the number of observations in the interval [0, t], the number of observations in non-overlapping subintervals being independent (see Poisson process). The number N of observations is Poisson-distributed with expected value λ. Then we rely on the fact that the conditional probability

P ( A N = n ) {\displaystyle P(A\mid N=n)\,}

does not depend on λ (in the language of statisticians, N is a sufficient statistic for this parametrized family of probability distributions for the order statistics). We proceed as follows:

P λ ( A ) = n = 0 P ( A N = n ) P ( N = n ) = n = 0 P ( A N = n ) λ n e λ n ! , {\displaystyle P_{\lambda }(A)=\sum _{n=0}^{\infty }P(A\mid N=n)P(N=n)=\sum _{n=0}^{\infty }P(A\mid N=n){\lambda ^{n}e^{-\lambda } \over n!},}

so that

e λ P λ ( A ) = n = 0 P ( A N = n ) λ n n ! . {\displaystyle e^{\lambda }\,P_{\lambda }(A)=\sum _{n=0}^{\infty }P(A\mid N=n){\lambda ^{n} \over n!}.}

Now the lack of dependence of P(A | N = n) upon λ entails that the last sum displayed above is a power series in λ and P(A | N = n) is the value of its nth derivative at λ = 0, i.e.,

P ( A N = n ) = [ d n d λ n ( e λ P λ ( A ) ) ] λ = 0 . {\displaystyle P(A\mid N=n)=\left[{d^{n} \over d\lambda ^{n}}\left(e^{\lambda }\,P_{\lambda }(A)\right)\right]_{\lambda =0}.}

For this method to be of any use in finding P(A | N =n), must be possible to find Pλ(A) more directly than P(A | N = n). What makes that possible is the independence of the numbers of arrivals in non-overlapping subintervals.