Show that the unit sphere in $mathbb{R}^3$ is pathwise(=arcwise) connected?











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I know this question has been already asked but no one does not address the definition of pathwise(=arcwise) connectedness as the following:



A set $C$ in metric space $(M,d)$ is pathwise(=arcwise) connected if any two points of $C$ can be joined by an arc that is entirely lies in $C$.



Formally,



$$
forall p,q in C,,, exists ,,,, phi: [a,b] rightarrow C ,,, text{s.t.} phi(a)=p, phi(b)=q
$$

where $phi$ is a continuous function.



Now to show sphere is pathwise(=arcwise) in $mathbb{R}^3$ we need such a $phi$ that maps a closed interval in $mathbb{R}$ to the sphere.



What is that function $phi$ and that interval?



This is my homework problem and what we have learned in our real analysis course is the above so the professor expects us to solve the problem from the above point of view.



Please answer in this direction.










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  • Sphere = surface or also the interior of the ball?
    – Math_QED
    Nov 13 at 21:43










  • If it is the latter: show two easy things: (1) sphere is convex (2) convex implies path connected
    – Math_QED
    Nov 13 at 21:45















up vote
1
down vote

favorite












I know this question has been already asked but no one does not address the definition of pathwise(=arcwise) connectedness as the following:



A set $C$ in metric space $(M,d)$ is pathwise(=arcwise) connected if any two points of $C$ can be joined by an arc that is entirely lies in $C$.



Formally,



$$
forall p,q in C,,, exists ,,,, phi: [a,b] rightarrow C ,,, text{s.t.} phi(a)=p, phi(b)=q
$$

where $phi$ is a continuous function.



Now to show sphere is pathwise(=arcwise) in $mathbb{R}^3$ we need such a $phi$ that maps a closed interval in $mathbb{R}$ to the sphere.



What is that function $phi$ and that interval?



This is my homework problem and what we have learned in our real analysis course is the above so the professor expects us to solve the problem from the above point of view.



Please answer in this direction.










share|cite|improve this question
























  • Sphere = surface or also the interior of the ball?
    – Math_QED
    Nov 13 at 21:43










  • If it is the latter: show two easy things: (1) sphere is convex (2) convex implies path connected
    – Math_QED
    Nov 13 at 21:45













up vote
1
down vote

favorite









up vote
1
down vote

favorite











I know this question has been already asked but no one does not address the definition of pathwise(=arcwise) connectedness as the following:



A set $C$ in metric space $(M,d)$ is pathwise(=arcwise) connected if any two points of $C$ can be joined by an arc that is entirely lies in $C$.



Formally,



$$
forall p,q in C,,, exists ,,,, phi: [a,b] rightarrow C ,,, text{s.t.} phi(a)=p, phi(b)=q
$$

where $phi$ is a continuous function.



Now to show sphere is pathwise(=arcwise) in $mathbb{R}^3$ we need such a $phi$ that maps a closed interval in $mathbb{R}$ to the sphere.



What is that function $phi$ and that interval?



This is my homework problem and what we have learned in our real analysis course is the above so the professor expects us to solve the problem from the above point of view.



Please answer in this direction.










share|cite|improve this question















I know this question has been already asked but no one does not address the definition of pathwise(=arcwise) connectedness as the following:



A set $C$ in metric space $(M,d)$ is pathwise(=arcwise) connected if any two points of $C$ can be joined by an arc that is entirely lies in $C$.



Formally,



$$
forall p,q in C,,, exists ,,,, phi: [a,b] rightarrow C ,,, text{s.t.} phi(a)=p, phi(b)=q
$$

where $phi$ is a continuous function.



Now to show sphere is pathwise(=arcwise) in $mathbb{R}^3$ we need such a $phi$ that maps a closed interval in $mathbb{R}$ to the sphere.



What is that function $phi$ and that interval?



This is my homework problem and what we have learned in our real analysis course is the above so the professor expects us to solve the problem from the above point of view.



Please answer in this direction.







real-analysis general-topology connectedness path-connected






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share|cite|improve this question













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edited Nov 13 at 22:25









Henno Brandsma

103k345111




103k345111










asked Nov 13 at 20:19









Saeed

485110




485110












  • Sphere = surface or also the interior of the ball?
    – Math_QED
    Nov 13 at 21:43










  • If it is the latter: show two easy things: (1) sphere is convex (2) convex implies path connected
    – Math_QED
    Nov 13 at 21:45


















  • Sphere = surface or also the interior of the ball?
    – Math_QED
    Nov 13 at 21:43










  • If it is the latter: show two easy things: (1) sphere is convex (2) convex implies path connected
    – Math_QED
    Nov 13 at 21:45
















Sphere = surface or also the interior of the ball?
– Math_QED
Nov 13 at 21:43




Sphere = surface or also the interior of the ball?
– Math_QED
Nov 13 at 21:43












If it is the latter: show two easy things: (1) sphere is convex (2) convex implies path connected
– Math_QED
Nov 13 at 21:45




If it is the latter: show two easy things: (1) sphere is convex (2) convex implies path connected
– Math_QED
Nov 13 at 21:45










2 Answers
2






active

oldest

votes

















up vote
3
down vote













So there are many ways to show that a space is path connected. Spherical coordinates may be more difficult then the approach I propose. We start with this useful fact:




Lemma. If $f:Xto Y$ is a continous function and $X$ is path connected then so is the image $f(X)$.




The proof is quite simple: you take two points $a,bin f(X)$, you connect points from their preimages and then compose that newly created path with $f$. $Box$



With that you have a new tool to show that some space $Y$ is path connected. You first show that a different space $X$ is path connected (which might be easier) and then you show that $Y$ is a continuous image of $X$. So let's have a look at a simplier space:




Fact. $mathbb{R}^nbackslash{0}$ is path connected for $n>1$.




Proof. Indeed, let $v,winmathbb{R}^n$, $v,wneq 0$. We will consider two cases:



(1) if $v, w$ are linearly independent then the path we are looking for is given by
$$varphi:[0,1]tomathbb{R}^nbackslash{0}$$
$$varphi(t)=tv+(1-t)w$$
You can easily verify that this is a well defined continous function. The assumption that $v,w$ are linearly independent obviously means that $varphi(t)neq 0$ for any $t$.



(2) for $v,w$ linearly dependent take any point $zinmathbb{R}^n$ such that $z$ does not lie on the line connecting $v, w$ (or in other words such that $v,z$ are not linearly dependent). Such point always exists when $n>1$, you gain it by taking $v=(v_1,ldots, v_n)$, now taking its first non-zero coordinate say $v_m$ and reversing its sign into $-v_m$.



In that case we can apply (1) to both $(v,z)$ and $(z,w)$ pairs in order to produce two paths. You join those two paths to complete the proof. $Box$




Fact. The $n$-dimensional sphere $mathbb{S}^n={vinmathbb{R}^{n+1} | lVert vrVert=1}$ is path connected for $ngeq 1$.




Proof. Let



$$N:mathbb{R}^{n+1}backslash{0}to mathbb{S}^n$$
$$N(v)=frac{v}{lVert vrVert}$$



and note that this is a surjective, continuous function. Both Lemma and previous Fact apply. $Box$






share|cite|improve this answer























  • Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
    – Saeed
    Nov 13 at 21:26






  • 1




    @Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
    – freakish
    Nov 13 at 21:28


















up vote
1
down vote













You can try to use stereographic projection $ sigma : Bbb{S}^2smallsetminus {*} to Bbb{R}^2$ with appropriate “north pole” each time you want to construct a path between two points $p$ and $q$ in $Bbb{S}^2$.




The key fact is that the stereographic projection is a homeomorphism, so we can pass the path in the plane to the sphere.




For any two points $p,q in Bbb{S}^2smallsetminus {*} $ you have the corresponding points $sigma(p),sigma(q)in Bbb{R}^2$. Choose a path $gamma : I to Bbb{R}^2$ joining those points, and then compose it with $sigma^{-1}$. So you have path $sigma ^{-1} circ gamma : I to Bbb{S}^2smallsetminus {*}$ joining $p$ and $q$. If you want to be strict, just composing it one more time with inclusion map $ i : Bbb{S}^2smallsetminus {*} hookrightarrow Bbb{S}^2$. Then you are done.




Alternatively (without constructing paths), note that $Bbb{S}^2$ is the image of the continous map $ pi : Bbb{R}^3 smallsetminus {0} to Bbb{R}^3$ defined by $x mapsto frac{x}{||x||}$. Since the image of any path-connected space under a continous map is path-connected, therefore $Bbb{S}^2$ is path-connected.







share|cite|improve this answer























  • Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
    – Saeed
    Nov 13 at 20:33










  • @Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
    – Kelvin Lois
    Nov 13 at 20:42












  • My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
    – Saeed
    Nov 13 at 20:55











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2 Answers
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active

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2 Answers
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active

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active

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active

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up vote
3
down vote













So there are many ways to show that a space is path connected. Spherical coordinates may be more difficult then the approach I propose. We start with this useful fact:




Lemma. If $f:Xto Y$ is a continous function and $X$ is path connected then so is the image $f(X)$.




The proof is quite simple: you take two points $a,bin f(X)$, you connect points from their preimages and then compose that newly created path with $f$. $Box$



With that you have a new tool to show that some space $Y$ is path connected. You first show that a different space $X$ is path connected (which might be easier) and then you show that $Y$ is a continuous image of $X$. So let's have a look at a simplier space:




Fact. $mathbb{R}^nbackslash{0}$ is path connected for $n>1$.




Proof. Indeed, let $v,winmathbb{R}^n$, $v,wneq 0$. We will consider two cases:



(1) if $v, w$ are linearly independent then the path we are looking for is given by
$$varphi:[0,1]tomathbb{R}^nbackslash{0}$$
$$varphi(t)=tv+(1-t)w$$
You can easily verify that this is a well defined continous function. The assumption that $v,w$ are linearly independent obviously means that $varphi(t)neq 0$ for any $t$.



(2) for $v,w$ linearly dependent take any point $zinmathbb{R}^n$ such that $z$ does not lie on the line connecting $v, w$ (or in other words such that $v,z$ are not linearly dependent). Such point always exists when $n>1$, you gain it by taking $v=(v_1,ldots, v_n)$, now taking its first non-zero coordinate say $v_m$ and reversing its sign into $-v_m$.



In that case we can apply (1) to both $(v,z)$ and $(z,w)$ pairs in order to produce two paths. You join those two paths to complete the proof. $Box$




Fact. The $n$-dimensional sphere $mathbb{S}^n={vinmathbb{R}^{n+1} | lVert vrVert=1}$ is path connected for $ngeq 1$.




Proof. Let



$$N:mathbb{R}^{n+1}backslash{0}to mathbb{S}^n$$
$$N(v)=frac{v}{lVert vrVert}$$



and note that this is a surjective, continuous function. Both Lemma and previous Fact apply. $Box$






share|cite|improve this answer























  • Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
    – Saeed
    Nov 13 at 21:26






  • 1




    @Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
    – freakish
    Nov 13 at 21:28















up vote
3
down vote













So there are many ways to show that a space is path connected. Spherical coordinates may be more difficult then the approach I propose. We start with this useful fact:




Lemma. If $f:Xto Y$ is a continous function and $X$ is path connected then so is the image $f(X)$.




The proof is quite simple: you take two points $a,bin f(X)$, you connect points from their preimages and then compose that newly created path with $f$. $Box$



With that you have a new tool to show that some space $Y$ is path connected. You first show that a different space $X$ is path connected (which might be easier) and then you show that $Y$ is a continuous image of $X$. So let's have a look at a simplier space:




Fact. $mathbb{R}^nbackslash{0}$ is path connected for $n>1$.




Proof. Indeed, let $v,winmathbb{R}^n$, $v,wneq 0$. We will consider two cases:



(1) if $v, w$ are linearly independent then the path we are looking for is given by
$$varphi:[0,1]tomathbb{R}^nbackslash{0}$$
$$varphi(t)=tv+(1-t)w$$
You can easily verify that this is a well defined continous function. The assumption that $v,w$ are linearly independent obviously means that $varphi(t)neq 0$ for any $t$.



(2) for $v,w$ linearly dependent take any point $zinmathbb{R}^n$ such that $z$ does not lie on the line connecting $v, w$ (or in other words such that $v,z$ are not linearly dependent). Such point always exists when $n>1$, you gain it by taking $v=(v_1,ldots, v_n)$, now taking its first non-zero coordinate say $v_m$ and reversing its sign into $-v_m$.



In that case we can apply (1) to both $(v,z)$ and $(z,w)$ pairs in order to produce two paths. You join those two paths to complete the proof. $Box$




Fact. The $n$-dimensional sphere $mathbb{S}^n={vinmathbb{R}^{n+1} | lVert vrVert=1}$ is path connected for $ngeq 1$.




Proof. Let



$$N:mathbb{R}^{n+1}backslash{0}to mathbb{S}^n$$
$$N(v)=frac{v}{lVert vrVert}$$



and note that this is a surjective, continuous function. Both Lemma and previous Fact apply. $Box$






share|cite|improve this answer























  • Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
    – Saeed
    Nov 13 at 21:26






  • 1




    @Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
    – freakish
    Nov 13 at 21:28













up vote
3
down vote










up vote
3
down vote









So there are many ways to show that a space is path connected. Spherical coordinates may be more difficult then the approach I propose. We start with this useful fact:




Lemma. If $f:Xto Y$ is a continous function and $X$ is path connected then so is the image $f(X)$.




The proof is quite simple: you take two points $a,bin f(X)$, you connect points from their preimages and then compose that newly created path with $f$. $Box$



With that you have a new tool to show that some space $Y$ is path connected. You first show that a different space $X$ is path connected (which might be easier) and then you show that $Y$ is a continuous image of $X$. So let's have a look at a simplier space:




Fact. $mathbb{R}^nbackslash{0}$ is path connected for $n>1$.




Proof. Indeed, let $v,winmathbb{R}^n$, $v,wneq 0$. We will consider two cases:



(1) if $v, w$ are linearly independent then the path we are looking for is given by
$$varphi:[0,1]tomathbb{R}^nbackslash{0}$$
$$varphi(t)=tv+(1-t)w$$
You can easily verify that this is a well defined continous function. The assumption that $v,w$ are linearly independent obviously means that $varphi(t)neq 0$ for any $t$.



(2) for $v,w$ linearly dependent take any point $zinmathbb{R}^n$ such that $z$ does not lie on the line connecting $v, w$ (or in other words such that $v,z$ are not linearly dependent). Such point always exists when $n>1$, you gain it by taking $v=(v_1,ldots, v_n)$, now taking its first non-zero coordinate say $v_m$ and reversing its sign into $-v_m$.



In that case we can apply (1) to both $(v,z)$ and $(z,w)$ pairs in order to produce two paths. You join those two paths to complete the proof. $Box$




Fact. The $n$-dimensional sphere $mathbb{S}^n={vinmathbb{R}^{n+1} | lVert vrVert=1}$ is path connected for $ngeq 1$.




Proof. Let



$$N:mathbb{R}^{n+1}backslash{0}to mathbb{S}^n$$
$$N(v)=frac{v}{lVert vrVert}$$



and note that this is a surjective, continuous function. Both Lemma and previous Fact apply. $Box$






share|cite|improve this answer














So there are many ways to show that a space is path connected. Spherical coordinates may be more difficult then the approach I propose. We start with this useful fact:




Lemma. If $f:Xto Y$ is a continous function and $X$ is path connected then so is the image $f(X)$.




The proof is quite simple: you take two points $a,bin f(X)$, you connect points from their preimages and then compose that newly created path with $f$. $Box$



With that you have a new tool to show that some space $Y$ is path connected. You first show that a different space $X$ is path connected (which might be easier) and then you show that $Y$ is a continuous image of $X$. So let's have a look at a simplier space:




Fact. $mathbb{R}^nbackslash{0}$ is path connected for $n>1$.




Proof. Indeed, let $v,winmathbb{R}^n$, $v,wneq 0$. We will consider two cases:



(1) if $v, w$ are linearly independent then the path we are looking for is given by
$$varphi:[0,1]tomathbb{R}^nbackslash{0}$$
$$varphi(t)=tv+(1-t)w$$
You can easily verify that this is a well defined continous function. The assumption that $v,w$ are linearly independent obviously means that $varphi(t)neq 0$ for any $t$.



(2) for $v,w$ linearly dependent take any point $zinmathbb{R}^n$ such that $z$ does not lie on the line connecting $v, w$ (or in other words such that $v,z$ are not linearly dependent). Such point always exists when $n>1$, you gain it by taking $v=(v_1,ldots, v_n)$, now taking its first non-zero coordinate say $v_m$ and reversing its sign into $-v_m$.



In that case we can apply (1) to both $(v,z)$ and $(z,w)$ pairs in order to produce two paths. You join those two paths to complete the proof. $Box$




Fact. The $n$-dimensional sphere $mathbb{S}^n={vinmathbb{R}^{n+1} | lVert vrVert=1}$ is path connected for $ngeq 1$.




Proof. Let



$$N:mathbb{R}^{n+1}backslash{0}to mathbb{S}^n$$
$$N(v)=frac{v}{lVert vrVert}$$



and note that this is a surjective, continuous function. Both Lemma and previous Fact apply. $Box$







share|cite|improve this answer














share|cite|improve this answer



share|cite|improve this answer








edited Nov 24 at 19:53

























answered Nov 13 at 20:56









freakish

10.9k1527




10.9k1527












  • Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
    – Saeed
    Nov 13 at 21:26






  • 1




    @Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
    – freakish
    Nov 13 at 21:28


















  • Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
    – Saeed
    Nov 13 at 21:26






  • 1




    @Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
    – freakish
    Nov 13 at 21:28
















Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
– Saeed
Nov 13 at 21:26




Thank you for your complete answer but I have revise the last part of the question to be clear what I expect as the answer. I am not allowed to use the fact that you have mentioned. We just have that definition of arcwise connected and have been asked to prove that. How can we do that?
– Saeed
Nov 13 at 21:26




1




1




@Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
– freakish
Nov 13 at 21:28




@Saeed I'm not really sure what exactly you are not allowed to use? There are few details missing in my answer (like showing that each function is continuous) but both facts + lemma have a proof here.
– freakish
Nov 13 at 21:28










up vote
1
down vote













You can try to use stereographic projection $ sigma : Bbb{S}^2smallsetminus {*} to Bbb{R}^2$ with appropriate “north pole” each time you want to construct a path between two points $p$ and $q$ in $Bbb{S}^2$.




The key fact is that the stereographic projection is a homeomorphism, so we can pass the path in the plane to the sphere.




For any two points $p,q in Bbb{S}^2smallsetminus {*} $ you have the corresponding points $sigma(p),sigma(q)in Bbb{R}^2$. Choose a path $gamma : I to Bbb{R}^2$ joining those points, and then compose it with $sigma^{-1}$. So you have path $sigma ^{-1} circ gamma : I to Bbb{S}^2smallsetminus {*}$ joining $p$ and $q$. If you want to be strict, just composing it one more time with inclusion map $ i : Bbb{S}^2smallsetminus {*} hookrightarrow Bbb{S}^2$. Then you are done.




Alternatively (without constructing paths), note that $Bbb{S}^2$ is the image of the continous map $ pi : Bbb{R}^3 smallsetminus {0} to Bbb{R}^3$ defined by $x mapsto frac{x}{||x||}$. Since the image of any path-connected space under a continous map is path-connected, therefore $Bbb{S}^2$ is path-connected.







share|cite|improve this answer























  • Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
    – Saeed
    Nov 13 at 20:33










  • @Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
    – Kelvin Lois
    Nov 13 at 20:42












  • My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
    – Saeed
    Nov 13 at 20:55















up vote
1
down vote













You can try to use stereographic projection $ sigma : Bbb{S}^2smallsetminus {*} to Bbb{R}^2$ with appropriate “north pole” each time you want to construct a path between two points $p$ and $q$ in $Bbb{S}^2$.




The key fact is that the stereographic projection is a homeomorphism, so we can pass the path in the plane to the sphere.




For any two points $p,q in Bbb{S}^2smallsetminus {*} $ you have the corresponding points $sigma(p),sigma(q)in Bbb{R}^2$. Choose a path $gamma : I to Bbb{R}^2$ joining those points, and then compose it with $sigma^{-1}$. So you have path $sigma ^{-1} circ gamma : I to Bbb{S}^2smallsetminus {*}$ joining $p$ and $q$. If you want to be strict, just composing it one more time with inclusion map $ i : Bbb{S}^2smallsetminus {*} hookrightarrow Bbb{S}^2$. Then you are done.




Alternatively (without constructing paths), note that $Bbb{S}^2$ is the image of the continous map $ pi : Bbb{R}^3 smallsetminus {0} to Bbb{R}^3$ defined by $x mapsto frac{x}{||x||}$. Since the image of any path-connected space under a continous map is path-connected, therefore $Bbb{S}^2$ is path-connected.







share|cite|improve this answer























  • Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
    – Saeed
    Nov 13 at 20:33










  • @Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
    – Kelvin Lois
    Nov 13 at 20:42












  • My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
    – Saeed
    Nov 13 at 20:55













up vote
1
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up vote
1
down vote









You can try to use stereographic projection $ sigma : Bbb{S}^2smallsetminus {*} to Bbb{R}^2$ with appropriate “north pole” each time you want to construct a path between two points $p$ and $q$ in $Bbb{S}^2$.




The key fact is that the stereographic projection is a homeomorphism, so we can pass the path in the plane to the sphere.




For any two points $p,q in Bbb{S}^2smallsetminus {*} $ you have the corresponding points $sigma(p),sigma(q)in Bbb{R}^2$. Choose a path $gamma : I to Bbb{R}^2$ joining those points, and then compose it with $sigma^{-1}$. So you have path $sigma ^{-1} circ gamma : I to Bbb{S}^2smallsetminus {*}$ joining $p$ and $q$. If you want to be strict, just composing it one more time with inclusion map $ i : Bbb{S}^2smallsetminus {*} hookrightarrow Bbb{S}^2$. Then you are done.




Alternatively (without constructing paths), note that $Bbb{S}^2$ is the image of the continous map $ pi : Bbb{R}^3 smallsetminus {0} to Bbb{R}^3$ defined by $x mapsto frac{x}{||x||}$. Since the image of any path-connected space under a continous map is path-connected, therefore $Bbb{S}^2$ is path-connected.







share|cite|improve this answer














You can try to use stereographic projection $ sigma : Bbb{S}^2smallsetminus {*} to Bbb{R}^2$ with appropriate “north pole” each time you want to construct a path between two points $p$ and $q$ in $Bbb{S}^2$.




The key fact is that the stereographic projection is a homeomorphism, so we can pass the path in the plane to the sphere.




For any two points $p,q in Bbb{S}^2smallsetminus {*} $ you have the corresponding points $sigma(p),sigma(q)in Bbb{R}^2$. Choose a path $gamma : I to Bbb{R}^2$ joining those points, and then compose it with $sigma^{-1}$. So you have path $sigma ^{-1} circ gamma : I to Bbb{S}^2smallsetminus {*}$ joining $p$ and $q$. If you want to be strict, just composing it one more time with inclusion map $ i : Bbb{S}^2smallsetminus {*} hookrightarrow Bbb{S}^2$. Then you are done.




Alternatively (without constructing paths), note that $Bbb{S}^2$ is the image of the continous map $ pi : Bbb{R}^3 smallsetminus {0} to Bbb{R}^3$ defined by $x mapsto frac{x}{||x||}$. Since the image of any path-connected space under a continous map is path-connected, therefore $Bbb{S}^2$ is path-connected.








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share|cite|improve this answer



share|cite|improve this answer








edited Nov 14 at 6:03

























answered Nov 13 at 20:26









Kelvin Lois

3,0872823




3,0872823












  • Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
    – Saeed
    Nov 13 at 20:33










  • @Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
    – Kelvin Lois
    Nov 13 at 20:42












  • My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
    – Saeed
    Nov 13 at 20:55


















  • Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
    – Saeed
    Nov 13 at 20:33










  • @Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
    – Kelvin Lois
    Nov 13 at 20:42












  • My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
    – Saeed
    Nov 13 at 20:55
















Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
– Saeed
Nov 13 at 20:33




Could you tell me how to do stereographic projection? It is not clear to me. I have read wiki on this but does not help.
– Saeed
Nov 13 at 20:33












@Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
– Kelvin Lois
Nov 13 at 20:42






@Saeed You can read about it on standard topology text, such as Lee’s Topological Manifold page 56. The point is that stereographic projection is a homeomorphism so you can pass your path in $R^2$ to the sphere minus a point.
– Kelvin Lois
Nov 13 at 20:42














My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
– Saeed
Nov 13 at 20:55




My problem is I am not a math student and I have taken real analysis as my graduate course and this question is a homework problem. My professor has said nothing about your answer. So there should be some solution which does not depend on stereographic projection.
– Saeed
Nov 13 at 20:55


















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