The concept of partial metric space is a minimal generalization of a metric space (X, d), where for each x ∈ X, d(x, x) does not need to be zero, in other terms is known as non-self distance. In this conference paper we defined some new definitions on partial metric space using by first difference of a sequence (xk) in partial metric space and examined some properties of these definitions..
REFERENCES
1.
2.
S.
Malhotra
, S.
Radenović
, and S.
Shukla
, Journal of the Egyptian Mathematical Society
22
, 83
–89
apr (2014
).3.
4.
5.
F.
Aryani
, H.
Mahmud
, C. C.
Marzuki
, M.
Soleh
, R.
Yendra
, and A.
Fudholi
, Journal of Mathematics and Statistics
12
, 271
–276
apr (2016
).
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