Accurate and Efficient Explicit Approximations of the Colebrook Flow Friction Equation Based on the Wright ω-Function: Reply to Discussion

Brkić, Dejan; Praks, Pavel

doi:10.3390/math7050410

Cited by 17 publications

(11 citation statements)

References 37 publications

(91 reference statements)

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“…Our rational approximation approach is based on Padé approximants [20,21], symbolic regression [30,31] and although not used directly, it is inspired by the Wright ω-function, a cognate of the Lambert W-function [32]. To avoid detailed explanations about the Lambert W-function [33], here it should be noted that in this context it is used to transform the Colebrook equation from the shape implicitly given in respect to the unknown flow friction factor to the explicit form [23,24,[27][28][29]34,35].…”

Section: Mathematics Behind the Proposed Approximationmentioning

confidence: 99%

“…Based on that approach, few very accurate and efficient explicit approximations suitable for coding and for engineering practice have been constructed [22]. In addition, the same authors developed few approximations of the Colebrook equation based on the Wright ω-function, which are among the most accurate to date [23][24][25]. On the other hand, they contain one or two logarithmic functions, depending on the chosen version [23,24] (these procedures are based on the previous efforts by Praks and Brkić for symbolic regression [26] and by Brkić with Lambert W-function [27][28][29]).…”

Section: Introductionmentioning

confidence: 99%

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Rational Approximation for Solving an Implicitly Given Colebrook Flow Friction Equation

Praks

Brkić

2019

Mathematics

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The empirical logarithmic Colebrook equation for hydraulic resistance in pipes implicitly considers the unknown flow friction factor. Its explicit approximations, used to avoid iterative computations, should be accurate but also computationally efficient. We present a rational approximate procedure that completely avoids the use of transcendental functions, such as logarithm or non-integer power, which require execution of the additional number of floating-point operations in computer processor units. Instead of these, we use only rational expressions that are executed directly in the processor unit. The rational approximation was found using a combination of a Padé approximant and artificial intelligence (symbolic regression). Numerical experiments in Matlab using 2 million quasi-Monte Carlo samples indicate that the relative error of this new rational approximation does not exceed 0.866%. Moreover, these numerical experiments show that the novel rational approximation is approximately two times faster than the exact solution given by the Wright omega function.

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Section: Mathematics Behind the Proposed Approximationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Rational Approximation for Solving an Implicitly Given Colebrook Flow Friction Equation

Praks

Brkić

2019

Mathematics

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“…However, the Colebrook equation can be rearranged in the explicit form using the Lambert W function, where further, this special function can be evaluated only approximately [5]. Some numerical constraints in using the Lambert W function, which can occur in our case, will be detected [37] and a way to mitigate this inconvenience will be shown [27][28][29].…”

Section: Special Functionsmentioning

confidence: 99%

“…On the contrary, basic mathematical operations (addition, subtraction, multiplication, and division) are very fast on computers, because they are executed directly. Students can learn how to avoid using these time-consuming functions [27][28][29][30]. This simplification process can have a large effect on the students' future jobs, regarding the design of complex pipe networks, which involve extensive computations [31][32][33][34][35][36].…”

Section: Introductionmentioning

confidence: 99%

“…For this reason, the next step involves the series expansion of the Lambert W function, and its cognate, the Wright ω function [39]. In this step, students will learn how to make accurate, but at the same time, efficient approximations of the Colebrook equation using the Wright ω function [27][28][29]40,41]. Last, but not least, students can use raw numerical data that can efficiently simulate the Colebrook equation and, in that way, learn principles of using artificial intelligence in everyday engineering practice [12,[42][43][44][45].…”

Section: Introductionmentioning

confidence: 99%

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What Can Students Learn While Solving Colebrook’s Flow Friction Equation?

Brkić

Praks

2019

Fluids

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Even a relatively simple equation such as Colebrook’s offers a lot of possibilities to students to increase their computational skills. The Colebrook’s equation is implicit in the flow friction factor and, therefore, it needs to be solved iteratively or using explicit approximations, which need to be developed using different approaches. Various procedures can be used for iterative methods, such as single the fixed-point iterative method, Newton–Raphson, and other types of multi-point iterative methods, iterative methods in a combination with Padé polynomials, special functions such as Lambert W, artificial intelligence such as neural networks, etc. In addition, to develop explicit approximations or to improve their accuracy, regression analysis, genetic algorithms, and curve fitting techniques can be used too. In this learning numerical exercise, a few numerical examples will be shown along with the explanation of the estimated pedagogical impact for university students. Students can see what the difference is between the classical vs. floating-point algebra used in computers.

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Review of new flow friction equations: Constructing Colebrook’s explicit correlations accurately

Praks¹,

Brkić²

2020

RIMNI

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Using only a limited number of computationally expensive functions, we show a way how to construct accurate and computationally efficient approximations of the Colebrook equation for flow friction.The presented approximations are based on the asymptotic series expansion of the Wright ω-function and symbolic regression. The results are verified with 8 million of Quasi-Monte Carlo points covering the domain of interest for engineers. In comparison with the built-in "wrightOmega" feature of Matlab R2016a, the herein introduced related approximations of the Wright ω-function significantly accelerate the computation. With only two logarithms and several basic arithmetic operations used, the presented approximations are not only computationally efficient but also extremely accurate. The maximal relative error of the most promising approximation which is given in the form suitable for engineers' use is limited to 0.0012%, while for a little bit more complex variant is limited to 0.000024%.

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Accurate and Efficient Explicit Approximations of the Colebrook Flow Friction Equation Based on the Wright ω-Function: Reply to Discussion

Cited by 17 publications

References 37 publications

Rational Approximation for Solving an Implicitly Given Colebrook Flow Friction Equation

Rational Approximation for Solving an Implicitly Given Colebrook Flow Friction Equation

What Can Students Learn While Solving Colebrook’s Flow Friction Equation?

Review of new flow friction equations: Constructing Colebrook’s explicit correlations accurately

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