On construction of approximate solution of non – linear Volterra - Fredholm integral equation in the space L
Journal of Mathematical Analysis and Application (USA) • 1993
معلومات البحث
المؤلفون
El-Sayed Ahmed M. Ghorayeb and M.I. Hessein
الكلمات المفتاحية
Not Available
المجلة العلمية
Journal of Mathematical Analysis and Application (USA)
الناشر
Not Available
المجلد
173
العدد
1
الصفحات
43-57
publication.type
International
رابط البحث
Not Available
المواد المرفقة
Not Available
الملخص
In this paper we propose an approximate method for finding approximate solution of mixed additive nonlinear Volterra-Fredholm integral equations in the space (p ~ 1). Using the linear polynomial operators, we replace the given equation by nonlinear inter,ral equation of Hammerstein type with degenerate kernel,
and taking the solution of it as an approximate solution to the given equation.
It is well known that [1-3], the linear polynomial operator Un(g;x) is
a good approximation to the 2n-periodic function g(x) in the space L [O,2n).
p
If g(x) has the Fourier coefficients a. ,b., then
'" 1 1
g(x) ~ iao + i~l [aicos ix + b i cos ixJ; (1)
and taking the solution of it as an approximate solution to the given equation.
It is well known that [1-3], the linear polynomial operator Un(g;x) is
a good approximation to the 2n-periodic function g(x) in the space L [O,2n).
p
If g(x) has the Fourier coefficients a. ,b., then
'" 1 1
g(x) ~ iao + i~l [aicos ix + b i cos ixJ; (1)
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