Left homotopy groups
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What are $delta_0$ and $delta_1$ in the diagram of the definition $2.1$
in the notion of homotopy here?
general-topology homotopy-theory higher-homotopy-groups
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up vote
0
down vote
favorite
What are $delta_0$ and $delta_1$ in the diagram of the definition $2.1$
in the notion of homotopy here?
general-topology homotopy-theory higher-homotopy-groups
add a comment |
up vote
0
down vote
favorite
up vote
0
down vote
favorite
What are $delta_0$ and $delta_1$ in the diagram of the definition $2.1$
in the notion of homotopy here?
general-topology homotopy-theory higher-homotopy-groups
What are $delta_0$ and $delta_1$ in the diagram of the definition $2.1$
in the notion of homotopy here?
general-topology homotopy-theory higher-homotopy-groups
general-topology homotopy-theory higher-homotopy-groups
edited 2 days ago
Paul Frost
7,4341527
7,4341527
asked 2 days ago
user122424
1,0701616
1,0701616
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add a comment |
1 Answer
1
active
oldest
votes
up vote
1
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accepted
They are constant functions. For any $xin X$, we have $delta_0(x) = 0$ and $delta_1(x) = 1$.
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
add a comment |
1 Answer
1
active
oldest
votes
1 Answer
1
active
oldest
votes
active
oldest
votes
active
oldest
votes
up vote
1
down vote
accepted
They are constant functions. For any $xin X$, we have $delta_0(x) = 0$ and $delta_1(x) = 1$.
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
add a comment |
up vote
1
down vote
accepted
They are constant functions. For any $xin X$, we have $delta_0(x) = 0$ and $delta_1(x) = 1$.
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
add a comment |
up vote
1
down vote
accepted
up vote
1
down vote
accepted
They are constant functions. For any $xin X$, we have $delta_0(x) = 0$ and $delta_1(x) = 1$.
They are constant functions. For any $xin X$, we have $delta_0(x) = 0$ and $delta_1(x) = 1$.
answered 2 days ago
Arthur
108k7103186
108k7103186
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
add a comment |
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
OK. An how can I see that $eta$ is a natural transformation?
– user122424
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
@user122424 A natural transformation between which functors?
– Paul Frost
2 days ago
add a comment |
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