| Abstract: | In this paper,we have discussed constructive properties of a kind of uniformly
almost periodic functions, of which the sequence of its Fourier exponents has unique
limit point at infinity.
\\begin{gathered}
f(x) \sim \sum\limits_{k = - \infty }^\infty {{A_k}} {e^{i{\Lambda _k}x}} \hfill \ {\Lambda _0} = \alpha ,0 < \alpha \leqslant {\Lambda _k} < {\Lambda _{k + 1}}(k = 0,1,2,...) \hfill \ \mathop {\lim }\limits_{k \to \infty } {\Lambda _k} = \infty ,{\Lambda _k} = - {\Lambda _k} \hfill \ |{\Lambda _k}| + |{\Lambda _{ - k}}| > 0{\kern 1pt} {\kern 1pt} {\kern 1pt} {\kern 1pt} (k \ne 0) \hfill \\
\end{gathered} \]
Analogons to the approximation theory of periodic functioiis, we get some theorems
similar to the Jackson theorem, Bernstein theorem and Zygmund theorem of periodio
functions. |
