Skripsi

Identifikasi contoh spesifik terkait metrik parsial dualistik / Vinda Shonia Pratiwi

Abstrak
Metrics are the distance between pairs of elements that satisfy certain properties namely positivity definiteness symmetry and triangle inequality. In 1906 Maurice Frechet introduced the concept of distance in non-empty sets. The metric d in the non-empty set X is a function of the distance between two points in X such that the properties of the metric are satisfied. The set X with distance d is called the metric space denoted (X d). The notion of a partial metric space was introduced in 1992 by Steve G. Matthews for model computation over a metric space (Han dkk. 2017). Partial metric space is a generalization of a metric space in which the distance of a point from itself is not always zero. One of the research (O rsquo Neill 1996) defines the concept of dualistic partial metrics which are more general than partial metrics namely extending the range from [0 ) to R. In this paper we provide specific examples and proofs of dualistic partial metrics.

Informasi Detail

DDC

SKRIPSI DIGITAL

Prodi

Universitas Negeri Malang. Program Studi Matematika, 2023.

Deskripsi Fisik

viii, 13 hlm. : ilus.

Bahasa

Indonesia

No Reg

3656/RS/24

Edisi

Skripsi (Sarjana)--Universitas Negeri Malang. 2023

Subjek

1. MATRIK ( PARTIAL DUALISTIK ) - IDENTIFIKASI
2. MATRIX (PARTIAL DUALISTIC) - IDENTIFICATION

Pembimbing

1. Mochammad Hafiizh, S.pd, M.si, Ph.d

Lampiran Berkas