درجة افضل تقريب للدوال غير المقيدة في الفضاءات المحلية العامة الموزونة == The Degree of Best Approximation of Unbounded Functions in Locally - Global Weighted Spaces
Author name:
علي حسين زبون
Supervisor name:
صاحب كحيط جاسم الساعدي
General topic:
Mathematics
Specific topic:
Mathematics
Degree:
Master
University:
Mustansiriyah University - College Of Science - Department Of Mathematics
Language:
English
University location:
Baghdad
First pages:
27T1167 - p.pdf
Abstract:
The aim of this thesis is to obtain the degree of best approximation of unbounded functions in locally - global weighted - space L_(P,δ,w) (X),1≤P<∞ using many kinds of polynomials such as I - Bernstein polynomials in terms of weighted Ditzain - Totik modulus of smoothness.II - Trigonometric polynomials S_n^* (f,x) and in addition to that we defined a new operator, which depends on Dirchlet Kernel G_(2n - 3n) - operator in terms of weighted Ditzain - Totik modulus of smoothness.III - q - Bernstein - Kantorovich B ̃_(n,q)^* (f,x) operator by using the locally second usual weighted modulus of smoothness.IV - The linear positive operators L_n^*〖(f,x)〗 and K_n^*〖(f,x)〗 for f∈L_(P,δ,w) (X),X=[0,∞) which is used to obtain the degree of the best approximation of this function in weighted space in terms of weighted modulus of function f.V - Szasz - Mirakjan - Beta U_n^* (f,x) and R ̃_n^* (f,x) operators in terms of weighted locally averaged modulus of smoothness.VI - Also supported by some important results to improve the approximation of unbounded functions classes.
