Discretization Theorems for Entire Functions of Exponential Type
Abstract
We prove Lq(m)--discretization inequalities for entire functions f of exponential type in the form C2\|f\|Lq(m) (Σ=1 f(X) q)1/q C1\|f\|Lq(m), q∈[1,], with estimates for C1 and C2. We find a necessary and sufficient condition on =\X\=1⊂m for the right inequality to be valid and a sufficient condition on for the left one to hold true. In addition, L(Qmb)-discretization inequalities on an m-dimensional cube are proved for entire functions of exponential type and exponential polynomials.
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