| 21. | To study the Fourier transform, it is best to consider " complex "-valued test functions and complex-linear distributions.
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| 22. | It is discontinuous at " x " = 0, whereas we usually choose test functions to be smooth.
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| 23. | This integral is a real number which depends functional on the space of test functions D ( "'R "').
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| 24. | For given test functions, the relevant notion of convergence only corresponds to the topology used in "'C " '.
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| 25. | The if-test functions include:
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| 26. | As a distribution, the Dirac delta is a linear functional on the space of test functions and is defined by
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| 27. | In the second part, test functions with their respective Pareto fronts for multi-objective optimization problems ( MOP ) are given.
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| 28. | The test functions used to evaluate the algorithms for MOP were taken from Deb, Binh et al . and Binh.
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| 29. | The basic idea in distribution theory is to reinterpret functions as linear functionals acting on a space of test functions.
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| 30. | Here } } is the distribution that takes a test function to the Cauchy principal value of " ds " } }.
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