Show that endomorphism is automorphism











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Let dim V = n, $ain End(V)$, and for some $vin V$ set of $a(v)$, $a^2(v)$, $ldots$, $a^n(v)$ is linearly independent. (where $a^i(v) = acirc acirc ldotscirc a$ i times, $circ$ is a composition. Show that a has invertible. I need to show that a is injection, if I will prove it I can prove that this is surjetive, then I will show that this is bijection and this will mean that we have invertible $a^{-1}$. but the problem is that I dont know how to prove that this is injection. Can you give me a hint?










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  • It's probably easier to show directly that $a$ is surjective (from which it will follow that $a$ is also injective). For that, note that ${ a(v), a^2(v), ldots, a^n(v) }$ must be a basis of $V$...
    – Daniel Schepler
    Nov 20 at 22:31















up vote
0
down vote

favorite












Let dim V = n, $ain End(V)$, and for some $vin V$ set of $a(v)$, $a^2(v)$, $ldots$, $a^n(v)$ is linearly independent. (where $a^i(v) = acirc acirc ldotscirc a$ i times, $circ$ is a composition. Show that a has invertible. I need to show that a is injection, if I will prove it I can prove that this is surjetive, then I will show that this is bijection and this will mean that we have invertible $a^{-1}$. but the problem is that I dont know how to prove that this is injection. Can you give me a hint?










share|cite|improve this question






















  • It's probably easier to show directly that $a$ is surjective (from which it will follow that $a$ is also injective). For that, note that ${ a(v), a^2(v), ldots, a^n(v) }$ must be a basis of $V$...
    – Daniel Schepler
    Nov 20 at 22:31













up vote
0
down vote

favorite









up vote
0
down vote

favorite











Let dim V = n, $ain End(V)$, and for some $vin V$ set of $a(v)$, $a^2(v)$, $ldots$, $a^n(v)$ is linearly independent. (where $a^i(v) = acirc acirc ldotscirc a$ i times, $circ$ is a composition. Show that a has invertible. I need to show that a is injection, if I will prove it I can prove that this is surjetive, then I will show that this is bijection and this will mean that we have invertible $a^{-1}$. but the problem is that I dont know how to prove that this is injection. Can you give me a hint?










share|cite|improve this question













Let dim V = n, $ain End(V)$, and for some $vin V$ set of $a(v)$, $a^2(v)$, $ldots$, $a^n(v)$ is linearly independent. (where $a^i(v) = acirc acirc ldotscirc a$ i times, $circ$ is a composition. Show that a has invertible. I need to show that a is injection, if I will prove it I can prove that this is surjetive, then I will show that this is bijection and this will mean that we have invertible $a^{-1}$. but the problem is that I dont know how to prove that this is injection. Can you give me a hint?







linear-algebra






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asked Nov 20 at 22:23







user596269



















  • It's probably easier to show directly that $a$ is surjective (from which it will follow that $a$ is also injective). For that, note that ${ a(v), a^2(v), ldots, a^n(v) }$ must be a basis of $V$...
    – Daniel Schepler
    Nov 20 at 22:31


















  • It's probably easier to show directly that $a$ is surjective (from which it will follow that $a$ is also injective). For that, note that ${ a(v), a^2(v), ldots, a^n(v) }$ must be a basis of $V$...
    – Daniel Schepler
    Nov 20 at 22:31
















It's probably easier to show directly that $a$ is surjective (from which it will follow that $a$ is also injective). For that, note that ${ a(v), a^2(v), ldots, a^n(v) }$ must be a basis of $V$...
– Daniel Schepler
Nov 20 at 22:31




It's probably easier to show directly that $a$ is surjective (from which it will follow that $a$ is also injective). For that, note that ${ a(v), a^2(v), ldots, a^n(v) }$ must be a basis of $V$...
– Daniel Schepler
Nov 20 at 22:31










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The vectors $a(v),ldots,a^n(v)$ lies in the image of $a$ and they form a basis of $V$. So $a$ is suryective and, because the dimension is finite, it is an automorphism.






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  • Thank you! But I did not understood why this is basis leads to surjectivity?
    – user596269
    Nov 20 at 22:34










  • The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
    – Dante Grevino
    Nov 21 at 0:48











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up vote
0
down vote













The vectors $a(v),ldots,a^n(v)$ lies in the image of $a$ and they form a basis of $V$. So $a$ is suryective and, because the dimension is finite, it is an automorphism.






share|cite|improve this answer





















  • Thank you! But I did not understood why this is basis leads to surjectivity?
    – user596269
    Nov 20 at 22:34










  • The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
    – Dante Grevino
    Nov 21 at 0:48















up vote
0
down vote













The vectors $a(v),ldots,a^n(v)$ lies in the image of $a$ and they form a basis of $V$. So $a$ is suryective and, because the dimension is finite, it is an automorphism.






share|cite|improve this answer





















  • Thank you! But I did not understood why this is basis leads to surjectivity?
    – user596269
    Nov 20 at 22:34










  • The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
    – Dante Grevino
    Nov 21 at 0:48













up vote
0
down vote










up vote
0
down vote









The vectors $a(v),ldots,a^n(v)$ lies in the image of $a$ and they form a basis of $V$. So $a$ is suryective and, because the dimension is finite, it is an automorphism.






share|cite|improve this answer












The vectors $a(v),ldots,a^n(v)$ lies in the image of $a$ and they form a basis of $V$. So $a$ is suryective and, because the dimension is finite, it is an automorphism.







share|cite|improve this answer












share|cite|improve this answer



share|cite|improve this answer










answered Nov 20 at 22:32









Dante Grevino

7787




7787












  • Thank you! But I did not understood why this is basis leads to surjectivity?
    – user596269
    Nov 20 at 22:34










  • The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
    – Dante Grevino
    Nov 21 at 0:48


















  • Thank you! But I did not understood why this is basis leads to surjectivity?
    – user596269
    Nov 20 at 22:34










  • The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
    – Dante Grevino
    Nov 21 at 0:48
















Thank you! But I did not understood why this is basis leads to surjectivity?
– user596269
Nov 20 at 22:34




Thank you! But I did not understood why this is basis leads to surjectivity?
– user596269
Nov 20 at 22:34












The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
– Dante Grevino
Nov 21 at 0:48




The image of a vector space under a linear function is always a linear subspace. Do you see why? So if you have a generating set in the image this is equivalent to surjectivity.
– Dante Grevino
Nov 21 at 0:48


















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