Calculating $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ over $mathbb{Z}$
Calculating $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ over $mathbb{Z}$:
I just need someone to confirm that I have calculated $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ correctly. I know this is an easy, common calculation, however I cannot find any actual answer to confirm my results against anywhere. Which is very frustrating.
I have calculated: $ operatorname{Ext}^0(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, $ operatorname{Ext}^1(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, and $ operatorname{Ext}^n(mathbb{Z}/2, mathbb{Z}/2) = 0$ for $n geq 2$. Is this correct?
I used the projective resolution:
$...rightarrow 0 rightarrow 0 rightarrow mathbb{Z} = P_1 xrightarrow {cdot 2} mathbb{Z} = P_0 xrightarrow {cdot 1} mathbb{Z}/2$
which yielded Hom groups:
$...leftarrow 0 leftarrow 0 leftarrow operatorname{Hom}(mathbb{Z},mathbb{Z}/2) xleftarrow {cdot 2} operatorname{Hom}(mathbb{Z},mathbb{Z}/2) leftarrow 0$
which is equivalent to:
$...leftarrow 0 leftarrow 0 leftarrow mathbb{Z}/2 xleftarrow {cdot 0} mathbb{Z}/2 leftarrow 0$
The homology at the 0th and 1st points is then $mathbb{Z}/2$, and $0$ elsewhere.
homological-algebra
edited 2 days ago
Bernard
118k639112
asked 2 days ago
DavenDaven
36619
add a comment |
Calculating $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ over $mathbb{Z}$:
I just need someone to confirm that I have calculated $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ correctly. I know this is an easy, common calculation, however I cannot find any actual answer to confirm my results against anywhere. Which is very frustrating.
I have calculated: $ operatorname{Ext}^0(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, $ operatorname{Ext}^1(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, and $ operatorname{Ext}^n(mathbb{Z}/2, mathbb{Z}/2) = 0$ for $n geq 2$. Is this correct?
I used the projective resolution:
$...rightarrow 0 rightarrow 0 rightarrow mathbb{Z} = P_1 xrightarrow {cdot 2} mathbb{Z} = P_0 xrightarrow {cdot 1} mathbb{Z}/2$
which yielded Hom groups:
$...leftarrow 0 leftarrow 0 leftarrow operatorname{Hom}(mathbb{Z},mathbb{Z}/2) xleftarrow {cdot 2} operatorname{Hom}(mathbb{Z},mathbb{Z}/2) leftarrow 0$
which is equivalent to:
$...leftarrow 0 leftarrow 0 leftarrow mathbb{Z}/2 xleftarrow {cdot 0} mathbb{Z}/2 leftarrow 0$
The homology at the 0th and 1st points is then $mathbb{Z}/2$, and $0$ elsewhere.
homological-algebra
edited 2 days ago
Bernard
118k639112
asked 2 days ago
DavenDaven
36619
add a comment |
Calculating $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ over $mathbb{Z}$:
I just need someone to confirm that I have calculated $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ correctly. I know this is an easy, common calculation, however I cannot find any actual answer to confirm my results against anywhere. Which is very frustrating.
I have calculated: $ operatorname{Ext}^0(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, $ operatorname{Ext}^1(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, and $ operatorname{Ext}^n(mathbb{Z}/2, mathbb{Z}/2) = 0$ for $n geq 2$. Is this correct?
I used the projective resolution:
$...rightarrow 0 rightarrow 0 rightarrow mathbb{Z} = P_1 xrightarrow {cdot 2} mathbb{Z} = P_0 xrightarrow {cdot 1} mathbb{Z}/2$
which yielded Hom groups:
$...leftarrow 0 leftarrow 0 leftarrow operatorname{Hom}(mathbb{Z},mathbb{Z}/2) xleftarrow {cdot 2} operatorname{Hom}(mathbb{Z},mathbb{Z}/2) leftarrow 0$
which is equivalent to:
$...leftarrow 0 leftarrow 0 leftarrow mathbb{Z}/2 xleftarrow {cdot 0} mathbb{Z}/2 leftarrow 0$
The homology at the 0th and 1st points is then $mathbb{Z}/2$, and $0$ elsewhere.
homological-algebra
edited 2 days ago
Bernard
118k639112
asked 2 days ago
DavenDaven
36619
Calculating $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ over $mathbb{Z}$:
I just need someone to confirm that I have calculated $ operatorname{Ext}(mathbb{Z}/2, mathbb{Z}/2)$ correctly. I know this is an easy, common calculation, however I cannot find any actual answer to confirm my results against anywhere. Which is very frustrating.
I have calculated: $ operatorname{Ext}^0(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, $ operatorname{Ext}^1(mathbb{Z}/2, mathbb{Z}/2) = mathbb{Z}/2$, and $ operatorname{Ext}^n(mathbb{Z}/2, mathbb{Z}/2) = 0$ for $n geq 2$. Is this correct?
I used the projective resolution:
$...rightarrow 0 rightarrow 0 rightarrow mathbb{Z} = P_1 xrightarrow {cdot 2} mathbb{Z} = P_0 xrightarrow {cdot 1} mathbb{Z}/2$
which yielded Hom groups:
$...leftarrow 0 leftarrow 0 leftarrow operatorname{Hom}(mathbb{Z},mathbb{Z}/2) xleftarrow {cdot 2} operatorname{Hom}(mathbb{Z},mathbb{Z}/2) leftarrow 0$
which is equivalent to:
$...leftarrow 0 leftarrow 0 leftarrow mathbb{Z}/2 xleftarrow {cdot 0} mathbb{Z}/2 leftarrow 0$
The homology at the 0th and 1st points is then $mathbb{Z}/2$, and $0$ elsewhere.
homological-algebra
homological-algebra
edited 2 days ago
Bernard
118k639112
asked 2 days ago
DavenDaven
36619
edited 2 days ago
Bernard
118k639112
asked 2 days ago
DavenDaven
36619
edited 2 days ago
Bernard
118k639112
edited 2 days ago
Bernard
118k639112
edited 2 days ago
Bernard
118k639112
118k639112
asked 2 days ago
DavenDaven
36619
asked 2 days ago
DavenDaven
36619
asked 2 days ago
DavenDaven
36619
36619
add a comment |
add a comment |
1 Answer
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Yes, that's fine. Another way to compute Ext is to note the only two possible extensions of $mathbb Z/2$ by itself are the trivial one and $mathbb Z/4$, up to isomorphism, and this is isomorphic to $mathbb Z/2$, of course. Note, however, that if you try to do the same with $mathbb Z/p$ (the very same computation works), then you get Ext is $mathbb Z/p$: there are $p-1$ nontrivial extensions with the same underlying middle term $mathbb Z/p^2$ which are not-isomorphic. Can you find them?
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
add a comment |
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1 Answer
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Yes, that's fine. Another way to compute Ext is to note the only two possible extensions of $mathbb Z/2$ by itself are the trivial one and $mathbb Z/4$, up to isomorphism, and this is isomorphic to $mathbb Z/2$, of course. Note, however, that if you try to do the same with $mathbb Z/p$ (the very same computation works), then you get Ext is $mathbb Z/p$: there are $p-1$ nontrivial extensions with the same underlying middle term $mathbb Z/p^2$ which are not-isomorphic. Can you find them?
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
add a comment |
Yes, that's fine. Another way to compute Ext is to note the only two possible extensions of $mathbb Z/2$ by itself are the trivial one and $mathbb Z/4$, up to isomorphism, and this is isomorphic to $mathbb Z/2$, of course. Note, however, that if you try to do the same with $mathbb Z/p$ (the very same computation works), then you get Ext is $mathbb Z/p$: there are $p-1$ nontrivial extensions with the same underlying middle term $mathbb Z/p^2$ which are not-isomorphic. Can you find them?
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
add a comment |
Yes, that's fine. Another way to compute Ext is to note the only two possible extensions of $mathbb Z/2$ by itself are the trivial one and $mathbb Z/4$, up to isomorphism, and this is isomorphic to $mathbb Z/2$, of course. Note, however, that if you try to do the same with $mathbb Z/p$ (the very same computation works), then you get Ext is $mathbb Z/p$: there are $p-1$ nontrivial extensions with the same underlying middle term $mathbb Z/p^2$ which are not-isomorphic. Can you find them?
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
Yes, that's fine. Another way to compute Ext is to note the only two possible extensions of $mathbb Z/2$ by itself are the trivial one and $mathbb Z/4$, up to isomorphism, and this is isomorphic to $mathbb Z/2$, of course. Note, however, that if you try to do the same with $mathbb Z/p$ (the very same computation works), then you get Ext is $mathbb Z/p$: there are $p-1$ nontrivial extensions with the same underlying middle term $mathbb Z/p^2$ which are not-isomorphic. Can you find them?
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
edited 2 days ago
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
answered 2 days ago
Pedro Tamaroff♦Pedro Tamaroff
96.3k10151296
96.3k10151296
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
add a comment |
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
Thank you! Your extra comment will be very helpful for furthering my understanding
– Daven
2 days ago
add a comment |
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