2019
DOI: 10.3390/math7010057
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Abstract: In this paper, using the concept of ω -admissibility, we prove some fixed point results for interpolate Ćirić-Reich-Rus-type contraction mappings. We also present some consequences and a useful example.

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Cited by 83 publications
(54 citation statements)
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“…Next, we prove an existence theorem for the aforementioned contraction where continuity of the self-map is assumed. It is to mention that the following theorem generalizes Theorem 1 due to Aydi et al [16], which may be obtained by taking s = 1 in the definition of the concerned bMS. The first half of the proof adopts similar techniques as that of [16].…”
Section: Crr-type Contractionmentioning
confidence: 54%
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“…Next, we prove an existence theorem for the aforementioned contraction where continuity of the self-map is assumed. It is to mention that the following theorem generalizes Theorem 1 due to Aydi et al [16], which may be obtained by taking s = 1 in the definition of the concerned bMS. The first half of the proof adopts similar techniques as that of [16].…”
Section: Crr-type Contractionmentioning
confidence: 54%
“…It is to mention that the following theorem generalizes Theorem 1 due to Aydi et al [16], which may be obtained by taking s = 1 in the definition of the concerned bMS. The first half of the proof adopts similar techniques as that of [16]. The similar portion of the proof is retained here verbatim due to clarity of presentation.…”
Section: Crr-type Contractionmentioning
confidence: 54%
See 3 more Smart Citations