Please have a look to " http://mathworld.wolfram.com/VolterraIntegralEquationoftheSecondKind.html" to find more informmation about Volterra Integral Equation of the Second Kind. Your answer is appreciated Thanks Jabir
Hello, Is it possible to have contourPlot with Logarithmatic scale on X-AXIS. I mean, somthing like Log ContourPlot with x-axis. Thanks in advanced for the help. Regards jabir
Unrelated post about ContourPlot was moved to its own discussion, http://community.wolfram.com/web/community/groups/-/m/t/509418
Depends on what you mean by "such code". There is considerable code for numerically solving such integral equations at the links I provided in an earlier response.
Thank you very much . Your reply means that there is no such a code that can be found in any of the public resources. Jabir
That link is to MathWorld. It is unrelated to Wolfram|Alpha. There is no integral equation solver built into that latter.
Many thanks for the note. I am looking for the professional code that build in WolframAlpha.Please have a look to " http://mathworld.wolfram.com/VolterraIntegralEquationoftheSecondKind.html" . Your helpful answer is appreciated Thanks Jabir
There is some amount of code floating about on StackExchange.
http://mathematica.stackexchange.com/questions/4677/solving-a-volterra-integral-equation-numerically/
http://mathematica.stackexchange.com/questions/21062/how-to-solve-a-non-linear-integral-equation/
http://mathematica.stackexchange.com/questions/15897/solve-an-integral-equation-numerically/
http://mathematica.stackexchange.com/questions/66800/how-to-solve-this-integral-equation/
http://stackoverflow.com/questions/6974929/how-can-i-reference-a-specific-point-of-my-function-inside-ndsolve
Have a look at the website http://www.math.hkbu.edu.hk/~hbrunner/harbin10/HL1.pdf