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How to solve this kind of Fredholm’s equation?
x(t)+$\lambda * \int_{0}^{1} (ts - min(t,s))x(s)ds=t$$$
x(t)+\lambda \int\limits_{0}^{1}\! \big[ts - \min\{t,s\}\big]x(s)ds=t
$$
Thanks for any help.
Fredholm equation
How to solve this kind of Fredholm’s equation?
x(t)+$\lambda * \int_{0}^{1} (ts - min(t,s))x(s)ds=t$
Thanks for any help
A Fredholm equation with a particular kernel
How to solve this kind of Fredholm’s equation?
$$
x(t)+\lambda \int\limits_{0}^{1}\! \big[ts - \min\{t,s\}\big]x(s)ds=t
$$
Thanks for any help.
