Let (U;D) be a Gr-covering approximation space (U; C) with covering lower approximation operator D and covering upper approximation operator D. For a subset X of U, this paper investigates the following three conditions: (1) X is a definable subset of (U;D); (2) X is an inner definable subset of (U;D); (3) X is an outer definable subset of (U;D). It is proved that if one of the above three conditions holds, then the others hold. These results give a positive answer of an open problem for definable subsets of covering approximation spaces
The domain of approximation for v, denoted A(v), defines a relationship in Rd between a fixed ration...
AbstractIn this paper we will treat a generalization of inner and outer approximations of fuzzy sets...
AbstractIn this current paper we reveal a mathematical tool that helps us to comprehend certain natu...
Covering approximation spaces is a class of important generalization of approximation spaces. For a ...
AbstractIn this paper a generalized notion of an approximation space is considered. By an approximat...
Abstract. Definability and approximations are two important notions of the theory of rough sets. In ...
In this paper, we present the covering rough sets based on neighborhoods by approximation operations...
In this paper, we propose a new covering-based set in which the lower and the upper approximation op...
We show that [Lemma 3.3, p. 538] which was introduced in [1] is incorrect in general, by giving coun...
In this paper, we discuss the relationship between different types of reduction and set definability...
AbstractThe concept of approximation spaces is a key notion of rough set theory, which is an importa...
AbstractRough set theory, a mathematical tool to deal with inexact or uncertain knowledge in informa...
The notion of approximability preserving reductions between different problems deserves special atte...
Adopting Zakowski-s upper approximation operator C and lower approximation operator C, this paper in...
AbstractAn approximation theorem for an upper semicontinuous mapping F from an arbitrary (not necess...
The domain of approximation for v, denoted A(v), defines a relationship in Rd between a fixed ration...
AbstractIn this paper we will treat a generalization of inner and outer approximations of fuzzy sets...
AbstractIn this current paper we reveal a mathematical tool that helps us to comprehend certain natu...
Covering approximation spaces is a class of important generalization of approximation spaces. For a ...
AbstractIn this paper a generalized notion of an approximation space is considered. By an approximat...
Abstract. Definability and approximations are two important notions of the theory of rough sets. In ...
In this paper, we present the covering rough sets based on neighborhoods by approximation operations...
In this paper, we propose a new covering-based set in which the lower and the upper approximation op...
We show that [Lemma 3.3, p. 538] which was introduced in [1] is incorrect in general, by giving coun...
In this paper, we discuss the relationship between different types of reduction and set definability...
AbstractThe concept of approximation spaces is a key notion of rough set theory, which is an importa...
AbstractRough set theory, a mathematical tool to deal with inexact or uncertain knowledge in informa...
The notion of approximability preserving reductions between different problems deserves special atte...
Adopting Zakowski-s upper approximation operator C and lower approximation operator C, this paper in...
AbstractAn approximation theorem for an upper semicontinuous mapping F from an arbitrary (not necess...
The domain of approximation for v, denoted A(v), defines a relationship in Rd between a fixed ration...
AbstractIn this paper we will treat a generalization of inner and outer approximations of fuzzy sets...
AbstractIn this current paper we reveal a mathematical tool that helps us to comprehend certain natu...