KelvinBer, KelvinBei - Kelvin functions ber and bei
KelvinKer, KelvinKei - Kelvin functions ker and kei
KelvinHer, KelvinHei - Kelvin functions her and hei
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Calling Sequence
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KelvinBer(v, x)
KelvinBei(v, x)
KelvinKer(v, x)
KelvinKei(v, x)
KelvinHer(v, x)
KelvinHei(v, x)
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Parameters
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v
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algebraic expression (the order or index)
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x
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algebraic expression (the argument)
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Description
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The Kelvin functions (sometimes known as the Thompson functions) are defined by the following equations:
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The Kelvin functions are all real valued for real x and positive v.
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Examples
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References
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Abramowitz, M., and Stegun, I. Handbook of Mathematical Functions, Section 9.9. Washington: National Bureau of Standards Applied Mathematics, 1964.
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Erdelyi, A., ed. Higher Transcendental Functions, Section 7.2.3. New York: McGraw-Hill, 1953.
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