Questions tagged [metric-spaces]

Metric spaces are sets on which a metric is defined. A metric is a generalization of the concept of "distance" in the Euclidean sense. Metric spaces arise as a special case of the more general notion of a topological space. For questions about Riemannian metrics use the tag (riemannian-geometry) instead.

A function $d: M\times M\to \mathbb R$ is called a metric if for all $x,y,z \in M$ we have

  1. $d(x,y)=0\iff x=y$
  2. $d(x,y)\geq 0$
  3. $d(x,y)=d(y,x)$
  4. $d(x,y)+d(y,z)\geq d(x,z)$.

It is a generalisation of "distance". A metric space is now defined as an ordered pair $(M,d)$, where $M$ is a set and $d:M\times M\to R$ is a metric.

An $\varepsilon$-neighbourhood of $x$ is defined as the set $$B_\epsilon(x):=\{y\in M\mid d(x,y)<\varepsilon\}.$$ $B_\varepsilon(x)$ is commonly also known as the open ball of radius $\varepsilon$ around $x$. All open balls form a base for a topology on $M$. Although all metric spaces are topological spaces, the converse is generally not true.

Some different types of metric space include

  1. Complete metric spaces (every Cauchy sequence converges)

  2. Bounded metric spaces (every metric is bounded by a finite value)

  3. Compact metric spaces (every sequence has a convergent subsequence)

  4. Locally compact metric spaces (every point has a compact neighbourhood)

  5. Separable metric spaces (it possesses a countable dense subset).

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If $\mathscr{B}(X;M)$ is complete, then $M$ is a complete metric space.

If exists a set $X$ such that $\mathscr{B}(X;M)$ is complete, then $M$ is a complete metric space. $\mathscr{B}(X;M)$ is the set of all bounded functions from $X\rightarrow M.$ In $\mathscr{B}(X;M)$ we do consider the sup metric. I've tried a…
user2345678
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Isolated point in metric spaces

i have a problem about the definition of isolated point. In my notes, it says that a boundary point z of A may not be an accumulation point. To prove this, it says if z is an isolated point of A, then there is a ball B(z,r) such that B(z,r)…
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Can a set be unbounded under discrete metric?

Suppose $(X,m)$ is a metric space and $A$ is a subset of $X$. Given that $m(x,y)$ is the discrete metric, can there possibly be a set that is unbounded wrt. $m$?
Larx
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Question on metric spaces and uniformly continuity

Let $M_{1}$, $M_{2}$, and $M_{3}$ be metric spaces. Let $g$ be a uniformly continuous function from $M_{1}$ into $M_{2}$, and let $f$ be a uniformly continuous function from $M_{2}$ into $M_{3}$. Prove that $f(g(x))$ is uniformly continuous on…
user497583
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Metric space notation (X,d)

It says "In mathematics, a metric space is a set for which distances between all members of the set are defined. Those distances, taken together, are called a metric on the set." on Wikipedia. I know what a distance function is and the properties it…
Larx
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Show that $\{a\}$ is connected set.

Let $(X,d)$ a metric space and $a\in X$. Show that $\{a\}$ is connected set. My approach: Let $a\in X$, and suppose that $\{a\}$ is not connected set,i.e., there exist open set $A,B\subset X$ non-empty, such that $\{a\}\subseteq A\cup B$ and $A\cap…
user470833
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Metric Spaces: Let X be non empty and $\rho: X \times X \rightarrow \mathbb{R}$ satisfy the axioms of a metric on X, prove $\rho$ is a metric on X

i feel this question is over the top simple but these sort of questions screw with my thinking so i'd like clarification. Let X be non empty and $\rho: X \times X \rightarrow \mathbb{R}$ satisfy $0 \leq \rho(x,y) < \infty~\forall x,y \in X, …
Vaas
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metrics, open sets

i am studying for my exam and trying to solve some questions. I have got a problem about proving the following. Let $X$ be a set, and let $d_1$ and $d_2$ be two metrics on $X$. Suppose that $d_1$ and $d_2$ are equivalent in the sense that there is a…
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Definition of bounded set in $\mathbb{R}^n$

I have a question regarding the definition of a bounded set in $\mathbb{R}^n$ here: http://mathworld.wolfram.com/BoundedSet.html Specifically, the definition in the link says that "A set in $\mathbb{R}^n$ is bounded iff it is contained inside some…
elbarto
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Show that the following is a metric for $\mathbb{R}^n$

I have recently started reading Kosniowski's A First Course in Algebraic Topology; my background on Calculus, Algebra and Vectors is vast enough to understand many of the concepts shown in the first few pages. The very first exercises, though, have…
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Definition of bounded sequence in $\mathbb{R}^n$

For a sequence $\{a_j\}$ in $\mathbb{R}$, we say that $\{a_j\}$ is bounded if and only if there exists $M>0$ such that for all $j$, $|a_j| \le M$. What is the definition of a bounded sequence in $\mathbb{R}^n$ with the standard metric? Is it as…
elbarto
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The set of homeomorphism $h:[a,b]\rightarrow [a,b]$ has empty interior

Let $C$ be the set of all continuous functions $f:[a,b]\rightarrow [a,b]$, with the metric $d(f,g)=\sup_{x \in X}|f(x)-g(x)|$. Let $X\subset C$ be the set of all homeomorphism $h:[a,b]\rightarrow [a,b]$. Show that $X$ has empty interior. Some…
user2345678
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help finding interior,exterior and boundary of subset in metric space

So I have a metric space $(\mathscr{C}[a,b],d_{\infty})$ Where $d_{\infty}=\sup\limits_{x\in[a,b]}${$|f(x)-f(y)|$} So i have two subsets: $A$={$f\in\mathscr{C}[a,b], f(a)\in[0,1)$} $B$={$f\in\mathscr{C}[a,b], \exists x \in [a,b], f(x)=0$} So i need…
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Limit of sequences in metric space

I could not prove the following statement. Can you help me? Let $X, d(x, y)$ be a metric space, and let $(x_n)$ be a sequence of points in $X$. Prove that $x_n → a$ if and only if for every open set $U\owns a$, there is a number $N$ such that…
Xentius
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Every metric space $M$ can be written as a countable union of limited subsets

Show that every metric space $M$ can be written as a countable union of limited subsets. Can someone give me some hints on this? The only ideas that i had was that every limited subset is contained into an open ball and to show that the set…
user2345678
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