2017

Fasciculi Mathematici

Journal year: 2017 | Journal number: nr 59

scientific article

english

EN Given any sequence a = (a_n)_n≥1 of positive real numbers and any set E of complex sequences, we write E_a for the set of all sequences y = (y_n)_n≥1 such that y/a = (y_n/a_n)_n≥1 ∈ E. In this paper we deal with the solvability of the (SSIE) of the form l_∞ ⊂ Ɛ + F’_x where E is a linear space of sequences and F’ is either c₀, or l_∞ and we solve the (SSIE) c₀ ⊂ Ɛ + s_x for Ɛ ⊂ (s_α)_Δ and α ∈ c₀. Then we study the (SSIE) c ⊂ Ɛ + s_x^(c) and the (SSE) Ɛ +s_x^(c) = c. Then we apply the previous results to the solvability of the (SSE) of the form (l^p_r)_Δ + F_x = F for p ≥ 1 and F is any of the sets c₀, c, or l_∞. These results extend some of those given in [8] and [9].

107 - 123

10.1515/fascmath-2017-0020

CC BY-NC-ND (attribution - noncommercial - no derivatives)

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