Advantages Rational function models have the following advantages.Rational function models have a moderately simple form.. As with polynomial models, this means that rational function mo
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Trang 8Advantages Rational function models have the following advantages.
Rational function models have a moderately simple form
1
Rational function models are a closed family As with polynomial models, this means that rational function models are not dependent on the underlying metric
2
Rational function models can take on an extremely wide range of shapes, accommodating a much wider range of shapes than does the polynomial family
3
Rational function models have better interpolatory properties than polynomial models Rational functions are typically smoother and less oscillatory than polynomial models
4
Rational functions have excellent extrapolatory powers Rational functions can typically be tailored to model the function not only within the domain of the data, but also so as to be in agreement with theoretical/asymptotic behavior outside the domain of interest
5
Rational function models have excellent asymptotic properties
Rational functions can be either finite or infinite for finite values, or finite or infinite for infinite values Thus, rational functions can easily be incorporated into a rational function model
6
Rational function models can often be used to model complicated structure with a fairly low degree in both the numerator and denominator This in turn means that fewer coefficients will be required compared to the polynomial model
7
Rational function models are moderately easy to handle computationally Although they are nonlinear models, rational function models are a particularly easy nonlinear models to fit
8
Disadvantages Rational function models have the following disadvantages
The properties of the rational function family are not as well known to engineers and scientists as are those of the polynomial family The literature on the rational function family is also more limited Because the properties of the family are often not well understood, it can be difficult to answer the following modeling question:
Given that data has a certain shape, what values should be chosen for the degree of the numerator and the degree on the denominator?
1
Unconstrained rational function fitting can, at times, result in undesired nusiance asymptotes (vertically) due to roots in the denominator polynomial The range of values affected by the function "blowing up" may be quite narrow, but such asymptotes, when they occur, are a nuisance for local interpolation in the neighborhood of the asymptote point These asymptotes are easy to
2
4.8.1.2 Rational Functions
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General
Properties of
Rational
Functions
The following are general properties of rational functions
If the numerator and denominator are of the same degree (n=m), then
y = a n /bm is a horizontal asymptote of the function
●
If the degree of the denominator is greater than the degree of the
numerator, then y = 0 is a horizontal asymptote.
●
If the degree of the denominator is less than the degree of the numerator, then there are no horizontal asymptotes
●
When x is equal to a root of the denominator polynomial, the
denominator is zero and there is a vertical asymptote The exception
is the case when the root of the denominator is also a root of the numerator However, for this case we can cancel a factor from both the numerator and denominator (and we effectively have a
lower-degree rational function)
●
Starting
Values for
Rational
Function
Models
One common difficulty in fitting nonlinear models is finding adequate starting values A major advantage of rational function models is the ability
to compute starting values using a linear least squares fit
To do this, choose p points from the data set, with p denoting the number of
parameters in the rational model For example, given the linear/quadratic model
we need to select four representative points
We then perform a linear fit on the model
Here, p n and p d are the degrees of the numerator and denominator,
respectively, and the and Y contain the subset of points, not the full data
set The estimated coefficients from this fit made using the linear least squares algorithm are used as the starting values for fitting the nonlinear model to the full data set
Note: This type of fit, with the response variable appearing on both sides of
the function, should only be used to obtain starting values for the nonlinear
fit The statistical properties of models like this are not well understood 4.8.1.2 Rational Functions
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Example The thermal expansion of copper case study contains an example of fitting a
rational function model
Specific
Rational
Functions
Constant / Linear Rational Function
1
Linear / Linear Rational Function
2
Linear / Quadratic Rational Function
3
Quadratic / Linear Rational Function
4
Quadratic / Quadratic Rational Function
5
Cubic / Linear Rational Function
6
Cubic / Quadratic Rational Function
7
Linear / Cubic Rational Function
8
Quadratic / Cubic Rational Function
9
Cubic / Cubic Rational Function
10
Determining m and n for Rational Function Models
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4.8.1.2 Rational Functions
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Domain:
Range:
Special
and vertical asymptote at:
Additional
Examples:
4.8.1.2.1 Constant / Linear Rational Function
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Domain:
Range:
Special
and vertical asymptote at:
Additional
Examples:
4.8.1.2.2 Linear / Linear Rational Function
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