FUZZY ORDERED SETS AND DUALITY FOR FINITE FUZZY
... paper the author introduced the concept of fuzzy relation, defined the notion of equivalence, and gave the concept of fuzzy orderings. The concept of fuzzy order was introduced by generalizing the notion of reflexivity, antisymmetry and transitivity, there by facilitating the derivation of known res ...
... paper the author introduced the concept of fuzzy relation, defined the notion of equivalence, and gave the concept of fuzzy orderings. The concept of fuzzy order was introduced by generalizing the notion of reflexivity, antisymmetry and transitivity, there by facilitating the derivation of known res ...
Algebraic Topology
... rather broad coverage of the subject. The viewpoint is quite classical in spirit, and stays well within the confines of pure algebraic topology. In a sense, the book could have been written thirty or forty years ago since virtually everything in it is at least that old. However, the passage of the i ...
... rather broad coverage of the subject. The viewpoint is quite classical in spirit, and stays well within the confines of pure algebraic topology. In a sense, the book could have been written thirty or forty years ago since virtually everything in it is at least that old. However, the passage of the i ...
Generalized Topological Semantics for First-Order Modal Logic Kohei Kishida
... that it interprets L with a structure that consists of • a set X , ∅, and • a map ⟦−⟧ : sent(L) → PX, where sent(L) is the set of sentences of L, among other things. We may call points in X possible worlds, and subsets of X propositions, so that we can read w ∈ ⟦φ⟧ as meaning that φ is true at w. In ...
... that it interprets L with a structure that consists of • a set X , ∅, and • a map ⟦−⟧ : sent(L) → PX, where sent(L) is the set of sentences of L, among other things. We may call points in X possible worlds, and subsets of X propositions, so that we can read w ∈ ⟦φ⟧ as meaning that φ is true at w. In ...
Local entropy theory - School of Mathematical Sciences
... by Glasner and Weiss [39] that a topological system carrying a K-measure is a u.p.e. system. This was generalized in the work of Blanchard, Host, Maass, Martinez and Rudolph [9], where the authors define entropy pairs for an invariant measure and show that for each invariant measure the set of entro ...
... by Glasner and Weiss [39] that a topological system carrying a K-measure is a u.p.e. system. This was generalized in the work of Blanchard, Host, Maass, Martinez and Rudolph [9], where the authors define entropy pairs for an invariant measure and show that for each invariant measure the set of entro ...
pdf
... of strongly G-β-open sets and G-δ-open sets in a topological space with a grill. Furthermore, by using these sets, we obtain new decompositions of continuity. 1. Introduction The idea of grills on a topological space was first introduced by Choquet [6]. The concept of grills has shown to be a powerfu ...
... of strongly G-β-open sets and G-δ-open sets in a topological space with a grill. Furthermore, by using these sets, we obtain new decompositions of continuity. 1. Introduction The idea of grills on a topological space was first introduced by Choquet [6]. The concept of grills has shown to be a powerfu ...
Global Aspects of Ergodic Group Actions Alexander S
... of such groups. We use Hjorth’s method to show that for such groups the set of ergodic actions is clopen in the uniform topology and so is each conjugacy class of ergodic actions. In Section 15 we study connectedness properties in the space of actions, using again the method of Section 5. This illus ...
... of such groups. We use Hjorth’s method to show that for such groups the set of ergodic actions is clopen in the uniform topology and so is each conjugacy class of ergodic actions. In Section 15 we study connectedness properties in the space of actions, using again the method of Section 5. This illus ...
Fuzzy Regular Generalized Super Closed Set
... Theorem 3.9:Let A be a fuzzy g-super closed set in a fuzzy topological space (X,) and f: (X,)→(Y,σ) is a fuzzy almost continuous and fuzzy super closed mappings then f(A) is fuzzy rg-super closed in Y. Proof: If f(A)≤G where GFRO(Y).Then A≤f-1(G) and hence cl(A) ≤ f-1(G)because A is a fuzzy g-s ...
... Theorem 3.9:Let A be a fuzzy g-super closed set in a fuzzy topological space (X,) and f: (X,)→(Y,σ) is a fuzzy almost continuous and fuzzy super closed mappings then f(A) is fuzzy rg-super closed in Y. Proof: If f(A)≤G where GFRO(Y).Then A≤f-1(G) and hence cl(A) ≤ f-1(G)because A is a fuzzy g-s ...
