NEAR SOFT CONTINUOUS AND NEAR SOFT JP-CONTINUOUS FUNCTIONS
Vol. 9(2) July 2021, No. 14, pp. 166-171
H. TASBOZAN AND N. BAGIRMAZ
Most real life situations need some sort of approximation to fit mathematical models. Pawlak introduced approximations as a means of approximating one set of object with another set of objects using an indiscernibility relation that is based on a comparison between the feature values of objects. Near sets were introduced by Peters where objects with affinities were considered perceptually near to others. Soft set theory was proposed by Molodtsov as a general framework for reasoning about vague concepts. We obtained near soft set by combining two concepts soft set and near sets. Based on a near set topology and near soft open sets, the approximation of a near soft set is proposed to obtain a function called near soft continuous . In this paper, we defined near soft continuous and near soft JP- continuous functions and give some examples about this functions.