| Abstract: | Let ω ( · ) be a given concave modulus of continuity and ω (g, · ) be the modulus of continuity of a function g ∈ C,where C is the space of 2π-periodic, continuous functions on (R) with norm ‖ f ‖ C := max | f( t ) |,(h) ∞,β r,ω( r= 0,1,2,… ) denotes those 2π-periodic, real-valued functions f on R that are analytic in the strip Sβ:= { z ∈ C: |Imz | < β|, β > 0, and satisfy the restriction condition: ω(f(r), ·)≤ω(·). In this paper, the exact n-width of the class of functions(h) ∞,β r,ωin the space C is determined. |
