KARYA ILMIAH

Pengarang
Resmawan
Subjek
- Sains
Abstrak
The fixed point theory remains the most important and preferred topic studied in mathematical analysis. This study discusses sufficient conditions to prove a unique fixed point in quasi-?b-metric spaces with cyclic mapping. The analysis starts by showing fulfillment of the cyclic Banach contraction and proving the Cauchy sequence as a condition for proving a unique fixed point in quasi-?b-metric spaces with cyclic mapping. Furthermore, it's shown that the cyclic mappings, T have a unique fixed point in quasi-?b-metric spaces. Finally, an example is given to strengthen the proof of the theorems that have been done.
Penerbit
InPrime: Indonesian Journal of Pure and Applied Mathematics
Kontributor
Ainun Sukmawati Al Idrus, Resmawan Resmawan, Muhammad Rezky Friesta Payu, Salmun K Nasib, Asriadi Asriadi
Terbit
2022
Tipe Material
ARTIKEL
Right
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