Revision as of 04:09, 6 June 2016

The Weber function is defined by $$\mathbf{E}_{\nu}(z)=\dfrac{1}{\pi} \displaystyle\int_0^{\pi} \sin(\nu \theta - z \sin(\theta)) \mathrm{d}\theta.$$

Properties

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 =Properties=
-{{:Relationship between Weber function and Anger function}}
+[[Relationship between Weber function and Anger function]]<br />
-{{:Relationship between Anger function and Weber function}}
+[[Relationship between Anger function and Weber function]]<br />
-{{:Relationship between Weber function 0 and Struve function 0}}
+[[Relationship between Weber function 0 and Struve function 0]]<br />
-{{:Relationship between Weber function 1 and Struve function 1}}
+[[Relationship between Weber function 1 and Struve function 1]]<br />
-{{:Relationship between Weber function 2 and Struve function 2}}
+[[Relationship between Weber function 2 and Struve function 2]]<br />
 =References=
-[http://dualaud.net/specialfunctionswiki/abramowitz_and_stegun-1.03/page_498.htm Abramowitz and Stegun]
+* {{BookReference|Handbook of mathematical functions|1964|Milton Abramowitz|author2=Irene A. Stegun|prev=Anger of integer order is Bessel J|next=}}: 12.3.3
 [[Category:SpecialFunction]]
 [[Category:Definition]]