We consider Jackson inequality in L^2 (B^d×T, Wκ,μ^B (x)), where the weight function Wκ,μ^B (X) is defined on the ball B^d and related to reflection group, and obtain the sharp Jackson inequalityEn-1,m-1(f)2≤κn,m(τ,r)ωr(f,t)2,τ≥2τn,λ,where Tn,λ is the first positive zero of the Gegenbauer cosine polynomial Cn^λ (cos θ)(n ∈ N).
In this paper, we study the sharp Jackson inequality for the best approximation of f ∈L2,k(Rd) by a subspace Ek2(σ) (SEk2(σ)), which is a subspace of entire functions of exponential type (spherical exponential type) at most σ. Here L2,k(Rd) denotes the space of all d-variate functions f endowed with the L2-norm with the weight vk(x)=Пζ∈R+}(ζ,x)}2k(ζ),which is defined by a positive subsystem R+ of a finite root system R Rd and a function k(ζ):R→R+ invariant under the reflection group G(R) generated by R. In the case G(R) = Z2d, we get some exact results. Moreover, the deviation of best approximation by the subspace Ek2(σ) (SE2(σ)) of some class of the smooth functions in the space L2,k(Rd) is obtained.
In this paper,we consider the best EFET(entire functions of the exponential type) approximations of some convolution classes associated with Laplace operator on R d and obtain exact constants in the spaces L1(R2) and L2(Rd).Moreover,the best constants of trigonometric approximations of their analogies on Td are also gained.
