| 11. | This resource is considered to be an optimal collection of terminology to test functions with.
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| 12. | For all smooth test functions g that vanish outside of \ mathcal { B }.
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| 13. | For divergence-free test functions satisfying appropriate boundary conditions.
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| 14. | A typical space of test functions consists of all smooth functions on "'R "'with compact support.
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| 15. | A bilinear form on " D " arises by pairing the image distribution with a test function.
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| 16. | The basic space of test function consists of smooth functions with compact support, leading to standard distributions.
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| 17. | We first prove that the formula is true for test functions, there are densely many of them.
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| 18. | There are different possible choices for the space of test functions, leading to different spaces of distributions.
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| 19. | I ran the test function on both machines and both returned 0, meaning they are both Little Endian.
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| 20. | However, the latter is not a valid test function ( it is not even a proper function ).
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