Let\(\mathfrak{B}_a^c ,\mathfrak{B}_a^m ,\mathfrak{B}_a^s (0 0). The theorem is proved that for every\(f \in \mathfrak{B}_a^m \backslash (\mathfrak{B}_a^c \cup \mathfrak{B}_a^s )\) there correspond\(f_c \in \mathfrak{B}_a^c\) and\(f_s \in \mathfrak{B}_a^s\), such that f=fc + fs. Some unsolved problems related to this theorem are formulated.