Ideal theory in Sheffer stroke Hilbert algebras using intu- itionistic fuzzy points
Abstract
The ideal of the Sheffer stroke Hilbert algebra was addressed byOner, Katican and Borumand Saeid. In this manuscipt, the intuitionistic fuzzy
version of ideals in Shaper stroke Hilbert algebras are addressed. The notion of intuitionistic fuzzy ideals are introduced and its properties are explored. The characterization of intuitionistic fuzzy ideals is dealt with, and the conditions under which the intuitionistic fuzzy set becomes an intuitionistic fuzzy ideal are discussed. The (0, 1)-set H(0,1) is formed in relation to to an intuitionistic fuzzy set A∗ := (ℏA, ðA), and environments in which it becomes an ideal are provided.
Conditions for the intuitionistic level set and intuitionistic q-set to be ideals are addressed.
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