Add to ORKGContinuity, epsilin-delta limit definition, uniform continuityThis Demonstration illustrates a theorem of analysis: a function that is continuous on the closed interval [a,b] is uniformly continuous on the interval. A function is continuous if, for each point x0 and each positive number epsilon , there is a positive number delta such that whenever /x-x0/< delta, /f(x) – f(x0)/ < epsilon. A function is uniformly continuous if, for each positive number epsilon, there is a positive number delta such that for all x0, whenever /x-x0/< delta, /f(x) – f(x0)/ < epsilon. In the first case delta depends on both epsilon and x0; in the second, delta depends only on epsilonComponente Curricular::Educação Superior::Ciências Exatas e da Terra::Matemátic
Summary. The continuity of real functions is discussed. There is a function defined on some domain i...
Let (X,p) and (Y,σ) be metric spaces. A function f : X → Y is (by definition) bounded if the image o...
Let (X,p) and (Y,σ) be metric spaces. A function f : X → Y is (by definition) bounded if the image o...
The purpose of this study is to give some uniform continuity definitions for real valued functions a...
Te paper collects results and open problems concerning several classes of functions that generalize ...
The aim of this material is to introduce the student to two notions of convergence for sequences of ...
The aim of this material is to introduce the student to two notions of convergence for sequences of ...
The aim of this material is to introduce the student to two notions of convergence for sequences of ...
This thesis is concerned with an investigation of the generalizations of continuous real functions o...
The main result of this thesis deals with continuous functions on metric spaces. Specifically, we sh...
Continuity is relevant for the real numbers and functions, namely to understand singularities and ju...
AbstractLet B be an ideal of subsets of a metric space 〈X,d〉. This paper considers a strengthening o...
A new stronger type of continuity which is stronger than both of $\delta \ p$ -continuity and strong...
The uniform continuity principle (UC) is the following statement: UC Every pointwise continuous func...
AbstractIn this paper, we present a definition of uniform continuity which applies to morphisms in t...
Summary. The continuity of real functions is discussed. There is a function defined on some domain i...
Let (X,p) and (Y,σ) be metric spaces. A function f : X → Y is (by definition) bounded if the image o...
Let (X,p) and (Y,σ) be metric spaces. A function f : X → Y is (by definition) bounded if the image o...
The purpose of this study is to give some uniform continuity definitions for real valued functions a...
Te paper collects results and open problems concerning several classes of functions that generalize ...
The aim of this material is to introduce the student to two notions of convergence for sequences of ...
The aim of this material is to introduce the student to two notions of convergence for sequences of ...
The aim of this material is to introduce the student to two notions of convergence for sequences of ...
This thesis is concerned with an investigation of the generalizations of continuous real functions o...
The main result of this thesis deals with continuous functions on metric spaces. Specifically, we sh...
Continuity is relevant for the real numbers and functions, namely to understand singularities and ju...
AbstractLet B be an ideal of subsets of a metric space 〈X,d〉. This paper considers a strengthening o...
A new stronger type of continuity which is stronger than both of $\delta \ p$ -continuity and strong...
The uniform continuity principle (UC) is the following statement: UC Every pointwise continuous func...
AbstractIn this paper, we present a definition of uniform continuity which applies to morphisms in t...
Summary. The continuity of real functions is discussed. There is a function defined on some domain i...
Let (X,p) and (Y,σ) be metric spaces. A function f : X → Y is (by definition) bounded if the image o...
Let (X,p) and (Y,σ) be metric spaces. A function f : X → Y is (by definition) bounded if the image o...