Gülle, EsraDündar, ErdinçUlusu, Uğur2024-02-262024-02-262023Gülle, E., Dündar, E., & Ulusu, U. (2023). Ideal convergence in partial metric spaces. Soft Computing, 27(19), 13789-13795.https://link.springer.com/article/10.1007/s00500-023-08994-0https://hdl.handle.net/20.500.12418/14317The aim of this paper was to develop the summability literature by introducing the concept of I_p-convergence in the partial metric space (X, p). First, we give some properties of I_p-convergence. Also, we introduce the concept of I*_p-convergence in the partial metric space (X, p) and examine relations between newly defined concepts. Then, we present the concepts of I_p-Cauchy and I*_p-Cauchy sequence in the partial metric space (X, p) and investigate relations between these Cauchy sequences.en10.1007/s00500-023-08994-0info:eu-repo/semantics/openAccessIdeal convergenceStatistical convergencePartial metric spaceArticle271913795137892-s2.0-85165903443N/AWOS:001038581900002Q2