- #1
eljose79
- 1,518
- 1
Let be the integral equation:
f(x)-g(x)=Kf where K is the integral operator having the kernel
my question : is there an operator R satisfying:
g(x)-f(x)=Rg where f satisfy the original integral equation so it can be solved by mean of R operator.
Another question is can any integral equation be transformed into a differential equation?..if so how it is made?..thanks.
f(x)-g(x)=Kf where K is the integral operator having the kernel
my question : is there an operator R satisfying:
g(x)-f(x)=Rg where f satisfy the original integral equation so it can be solved by mean of R operator.
Another question is can any integral equation be transformed into a differential equation?..if so how it is made?..thanks.