We study integral spline operators of order k. exact on polynomials of degree 2m. with 0≤2m<k, having the form T_(k,t)^((m))f=∑ i∈J [∫_lf(x)C_(l,k)^(x)dx]N_IK, where {N_(l,k),i∈J} is the classical Bspline bas...We study integral spline operators of order k. exact on polynomials of degree 2m. with 0≤2m<k, having the form T_(k,t)^((m))f=∑ i∈J [∫_lf(x)C_(l,k)^(x)dx]N_IK, where {N_(l,k),i∈J} is the classical Bspline basis associated with the sequence t of knots on the interval I and C_(l,k)~is a linear combination of B-splines {N_(l+l,k),-m≤j≤m}. We prove a general theorem of eristence and uniqueness. Then we study the L^D -norms of these operators and error bounds for smooth furlctions f. We then obtain partial results about the L~∞--boundedness of T_(k,t)^((m)), independently of the pertition t. We also give the complete description of these operators in the case of a uniform partition of the real line.展开更多
文摘We study integral spline operators of order k. exact on polynomials of degree 2m. with 0≤2m<k, having the form T_(k,t)^((m))f=∑ i∈J [∫_lf(x)C_(l,k)^(x)dx]N_IK, where {N_(l,k),i∈J} is the classical Bspline basis associated with the sequence t of knots on the interval I and C_(l,k)~is a linear combination of B-splines {N_(l+l,k),-m≤j≤m}. We prove a general theorem of eristence and uniqueness. Then we study the L^D -norms of these operators and error bounds for smooth furlctions f. We then obtain partial results about the L~∞--boundedness of T_(k,t)^((m)), independently of the pertition t. We also give the complete description of these operators in the case of a uniform partition of the real line.
