Ngày tải lên :
14/10/2015, 15:18
... For < p ≤ ∞, α > and m ≥ l − 1, put b(α, p) := 2(2α − 1)(p + 1)1/p , and l−1 α −l β(α, l, m) := (2 − 1) s=0 m (2α − 1)s , s β(α, 0, m) := ˚α and and every Theorem 2.2 Let < p ≤ ∞ and < α ≤ Then ... smoothness and optimal Fibonacci cubature for functions on the square, http://arxiv.org/abs/1311.1563 [19] J Garcke and M Hegland Fitting multidimensional data using gradient penalties and the sparse ... Faber-Schauder system of the hat functions is defined by F := {ϕk,s : s ∈ Z(k), k ∈ Z+ }, where Z(0) := {0} and Z(k) := {0, 1, , 2k−1 − 1} for k > 0, ϕ0,0 (x) := 1, x ∈ T, and for k > and s ∈ Z(k)...