Why does the integral domain “being trapped between a finite field extension” implies that it is a field?












3












$begingroup$


The following is an exercise from Qing Liu's Algebraic Geometry and Arithmetic Curves.




Exercise 1.2.



Let ϕ : A → B be a homomorphism of finitely generated algebras over a field. Show that the image of a closed point under Spec ϕ is a closed point.




The following is the solution from Cihan Bahran. http://www-users.math.umn.edu/~bahra004/alg-geo/liu-soln.pdf.




Write $k$ for the underlying field. Let’s parse the statement. A closed point in $operatorname{Spec} B$ means a maximal ideal $n$ of $B$. And $operatorname{Spec}(ϕ)(n) = ϕ^{−1}(n)$. So we want to show that $p := ϕ{−1}(n)$ is a maximal ideal in $A$. First of all, $p$ is definitely a prime ideal of $A$ and $ϕ$ descends to an injective $k$-algebra homomorphism $ψ : A/p to B/n$. But the map $k to B/n$ defines a finite field extension of $k$ by Corollary 1.12. So the integral domain $A/p$ is trapped between a finite field extension. Such domains are necessarily fields, thus $p$ is maximal in $A$.




In the second last sentence, the writer says that the integral domain $A/p$ is trapped between a finite field extension. I don't exactly know what it means, but I think it means that there are two injective ring homomorphisms $f:kto A/p$ and $g:A/pto B/n$ such that $gcirc f$ makes $B/n$ a finite field extension of $k$. But why does it imply that $A/p$ is a field?










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$endgroup$

















    3












    $begingroup$


    The following is an exercise from Qing Liu's Algebraic Geometry and Arithmetic Curves.




    Exercise 1.2.



    Let ϕ : A → B be a homomorphism of finitely generated algebras over a field. Show that the image of a closed point under Spec ϕ is a closed point.




    The following is the solution from Cihan Bahran. http://www-users.math.umn.edu/~bahra004/alg-geo/liu-soln.pdf.




    Write $k$ for the underlying field. Let’s parse the statement. A closed point in $operatorname{Spec} B$ means a maximal ideal $n$ of $B$. And $operatorname{Spec}(ϕ)(n) = ϕ^{−1}(n)$. So we want to show that $p := ϕ{−1}(n)$ is a maximal ideal in $A$. First of all, $p$ is definitely a prime ideal of $A$ and $ϕ$ descends to an injective $k$-algebra homomorphism $ψ : A/p to B/n$. But the map $k to B/n$ defines a finite field extension of $k$ by Corollary 1.12. So the integral domain $A/p$ is trapped between a finite field extension. Such domains are necessarily fields, thus $p$ is maximal in $A$.




    In the second last sentence, the writer says that the integral domain $A/p$ is trapped between a finite field extension. I don't exactly know what it means, but I think it means that there are two injective ring homomorphisms $f:kto A/p$ and $g:A/pto B/n$ such that $gcirc f$ makes $B/n$ a finite field extension of $k$. But why does it imply that $A/p$ is a field?










    share|cite|improve this question









    $endgroup$















      3












      3








      3


      1



      $begingroup$


      The following is an exercise from Qing Liu's Algebraic Geometry and Arithmetic Curves.




      Exercise 1.2.



      Let ϕ : A → B be a homomorphism of finitely generated algebras over a field. Show that the image of a closed point under Spec ϕ is a closed point.




      The following is the solution from Cihan Bahran. http://www-users.math.umn.edu/~bahra004/alg-geo/liu-soln.pdf.




      Write $k$ for the underlying field. Let’s parse the statement. A closed point in $operatorname{Spec} B$ means a maximal ideal $n$ of $B$. And $operatorname{Spec}(ϕ)(n) = ϕ^{−1}(n)$. So we want to show that $p := ϕ{−1}(n)$ is a maximal ideal in $A$. First of all, $p$ is definitely a prime ideal of $A$ and $ϕ$ descends to an injective $k$-algebra homomorphism $ψ : A/p to B/n$. But the map $k to B/n$ defines a finite field extension of $k$ by Corollary 1.12. So the integral domain $A/p$ is trapped between a finite field extension. Such domains are necessarily fields, thus $p$ is maximal in $A$.




      In the second last sentence, the writer says that the integral domain $A/p$ is trapped between a finite field extension. I don't exactly know what it means, but I think it means that there are two injective ring homomorphisms $f:kto A/p$ and $g:A/pto B/n$ such that $gcirc f$ makes $B/n$ a finite field extension of $k$. But why does it imply that $A/p$ is a field?










      share|cite|improve this question









      $endgroup$




      The following is an exercise from Qing Liu's Algebraic Geometry and Arithmetic Curves.




      Exercise 1.2.



      Let ϕ : A → B be a homomorphism of finitely generated algebras over a field. Show that the image of a closed point under Spec ϕ is a closed point.




      The following is the solution from Cihan Bahran. http://www-users.math.umn.edu/~bahra004/alg-geo/liu-soln.pdf.




      Write $k$ for the underlying field. Let’s parse the statement. A closed point in $operatorname{Spec} B$ means a maximal ideal $n$ of $B$. And $operatorname{Spec}(ϕ)(n) = ϕ^{−1}(n)$. So we want to show that $p := ϕ{−1}(n)$ is a maximal ideal in $A$. First of all, $p$ is definitely a prime ideal of $A$ and $ϕ$ descends to an injective $k$-algebra homomorphism $ψ : A/p to B/n$. But the map $k to B/n$ defines a finite field extension of $k$ by Corollary 1.12. So the integral domain $A/p$ is trapped between a finite field extension. Such domains are necessarily fields, thus $p$ is maximal in $A$.




      In the second last sentence, the writer says that the integral domain $A/p$ is trapped between a finite field extension. I don't exactly know what it means, but I think it means that there are two injective ring homomorphisms $f:kto A/p$ and $g:A/pto B/n$ such that $gcirc f$ makes $B/n$ a finite field extension of $k$. But why does it imply that $A/p$ is a field?







      abstract-algebra algebraic-geometry commutative-algebra






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          $begingroup$


          Theorem 1. Let $K$ be a field. Let $R$ and $L$ be two $K$-algebras such that $L$ is a finite-dimensional $K$-vector space and $R$ is an integral domain. Let $g : R to L$ be an injective $K$-linear map. Then, $R$ is a field.




          Proof of Theorem 1. Since the $K$-linear map $g : R to L$ is injective, we have $dim R leq dim L$, where "$dim$" refers to the dimension of a $K$-vector space. But $dim L < infty$, since $L$ is finite-dimensional. Hence, $dim R leq dim L < infty$; thus, $R$ is a finite-dimensional $K$-vector space. Therefore, any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces (according to a well-known fact from linear algebra).



          Now, let $a in R$ be nonzero. Let $M_a$ denote the map $R to R, r mapsto ar$. This map $M_a : R to R$ is $K$-linear and has kernel $0$ (because every $r in R$ satisfying $ar = 0$ must satisfy $r = 0$ (since $R$ is an integral domain and $a$ is nonzero)); thus, it is injective. Hence, it is an isomorphism of $K$-vector spaces (since any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces). Thus, it is surjective. Therefore, there exists some $s in R$ such that $M_aleft(sright) = 1$. Consider this $s$. Now, the definition of $M_a$ yields $M_aleft(sright) = as$, so that $as = M_aleft(sright) = 1$. In other words, $s$ is a (multiplicative) inverse of $a$. Hence, $a$ has an inverse.



          We have thus proven that every nonzero $a in R$ has an inverse. In other words, the ring $R$ is an integral domain. This proves Theorem 1. $blacksquare$



          In your situation, you should apply Theorem 1 to $K = k$, $R = A/p$, $L = B/n$ and $g = psi$.






          share|cite|improve this answer









          $endgroup$





















            2












            $begingroup$

            Suppose $F$ is any field, $E$ is a finite extension field of $F$, and $D$ is an integral domain such that



            $F subset D subset E; tag 1$



            since



            $[E:F] = n < infty, tag 2$



            every element of $D$ is algebraic over $F$; thus



            $0 ne d in D tag 3$



            satisfies some



            $p(x) in F[x]; tag 4$



            that is,



            $p(d) = 0; tag 5$



            we may write



            $p(x) = displaystyle sum_0^{deg p} p_j x^j, ; p_j in F; tag 6$



            then



            $displaystyle sum_0^{deg p} p_j d^j = p(d) = 0; tag 7$



            furthermore, we may assume $p(x)$ is of minimal degree of all polynomials in $F[x]$ satisfied by $d$. In this case, we must have



            $p_0 ne 0; tag 8$



            if not, then



            $p(x) = displaystyle sum_1^{deg p} p_jx^j = x sum_1^{deg p} p_j x^{j - 1}; tag 9$



            thus



            $d displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{10}$



            and via (4) this forces



            $displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{11}$



            since $D$ is an integral domain; but this asserts that $d$ satisfies the polynomial



            $displaystyle sum_1^{deg p} p_ x^{j - 1} in F[x] tag{12}$



            of degree $deg p - 1$, which contradicts the minimality of the degree of $p(x)$; therefore (8) binds and we may write



            $displaystyle sum_1^{deg p}p_j d^j = -p_0, tag{13}$



            or



            $d left( -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} right ) = 1, tag{14}$



            which shows that



            $d^{-1} = -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} in D; tag{15}$



            since every $0 ne d in D$ has in iverse in $D$ by (15), $D$ is indeed a field.






            share|cite|improve this answer









            $endgroup$













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              $begingroup$


              Theorem 1. Let $K$ be a field. Let $R$ and $L$ be two $K$-algebras such that $L$ is a finite-dimensional $K$-vector space and $R$ is an integral domain. Let $g : R to L$ be an injective $K$-linear map. Then, $R$ is a field.




              Proof of Theorem 1. Since the $K$-linear map $g : R to L$ is injective, we have $dim R leq dim L$, where "$dim$" refers to the dimension of a $K$-vector space. But $dim L < infty$, since $L$ is finite-dimensional. Hence, $dim R leq dim L < infty$; thus, $R$ is a finite-dimensional $K$-vector space. Therefore, any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces (according to a well-known fact from linear algebra).



              Now, let $a in R$ be nonzero. Let $M_a$ denote the map $R to R, r mapsto ar$. This map $M_a : R to R$ is $K$-linear and has kernel $0$ (because every $r in R$ satisfying $ar = 0$ must satisfy $r = 0$ (since $R$ is an integral domain and $a$ is nonzero)); thus, it is injective. Hence, it is an isomorphism of $K$-vector spaces (since any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces). Thus, it is surjective. Therefore, there exists some $s in R$ such that $M_aleft(sright) = 1$. Consider this $s$. Now, the definition of $M_a$ yields $M_aleft(sright) = as$, so that $as = M_aleft(sright) = 1$. In other words, $s$ is a (multiplicative) inverse of $a$. Hence, $a$ has an inverse.



              We have thus proven that every nonzero $a in R$ has an inverse. In other words, the ring $R$ is an integral domain. This proves Theorem 1. $blacksquare$



              In your situation, you should apply Theorem 1 to $K = k$, $R = A/p$, $L = B/n$ and $g = psi$.






              share|cite|improve this answer









              $endgroup$


















                3












                $begingroup$


                Theorem 1. Let $K$ be a field. Let $R$ and $L$ be two $K$-algebras such that $L$ is a finite-dimensional $K$-vector space and $R$ is an integral domain. Let $g : R to L$ be an injective $K$-linear map. Then, $R$ is a field.




                Proof of Theorem 1. Since the $K$-linear map $g : R to L$ is injective, we have $dim R leq dim L$, where "$dim$" refers to the dimension of a $K$-vector space. But $dim L < infty$, since $L$ is finite-dimensional. Hence, $dim R leq dim L < infty$; thus, $R$ is a finite-dimensional $K$-vector space. Therefore, any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces (according to a well-known fact from linear algebra).



                Now, let $a in R$ be nonzero. Let $M_a$ denote the map $R to R, r mapsto ar$. This map $M_a : R to R$ is $K$-linear and has kernel $0$ (because every $r in R$ satisfying $ar = 0$ must satisfy $r = 0$ (since $R$ is an integral domain and $a$ is nonzero)); thus, it is injective. Hence, it is an isomorphism of $K$-vector spaces (since any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces). Thus, it is surjective. Therefore, there exists some $s in R$ such that $M_aleft(sright) = 1$. Consider this $s$. Now, the definition of $M_a$ yields $M_aleft(sright) = as$, so that $as = M_aleft(sright) = 1$. In other words, $s$ is a (multiplicative) inverse of $a$. Hence, $a$ has an inverse.



                We have thus proven that every nonzero $a in R$ has an inverse. In other words, the ring $R$ is an integral domain. This proves Theorem 1. $blacksquare$



                In your situation, you should apply Theorem 1 to $K = k$, $R = A/p$, $L = B/n$ and $g = psi$.






                share|cite|improve this answer









                $endgroup$
















                  3












                  3








                  3





                  $begingroup$


                  Theorem 1. Let $K$ be a field. Let $R$ and $L$ be two $K$-algebras such that $L$ is a finite-dimensional $K$-vector space and $R$ is an integral domain. Let $g : R to L$ be an injective $K$-linear map. Then, $R$ is a field.




                  Proof of Theorem 1. Since the $K$-linear map $g : R to L$ is injective, we have $dim R leq dim L$, where "$dim$" refers to the dimension of a $K$-vector space. But $dim L < infty$, since $L$ is finite-dimensional. Hence, $dim R leq dim L < infty$; thus, $R$ is a finite-dimensional $K$-vector space. Therefore, any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces (according to a well-known fact from linear algebra).



                  Now, let $a in R$ be nonzero. Let $M_a$ denote the map $R to R, r mapsto ar$. This map $M_a : R to R$ is $K$-linear and has kernel $0$ (because every $r in R$ satisfying $ar = 0$ must satisfy $r = 0$ (since $R$ is an integral domain and $a$ is nonzero)); thus, it is injective. Hence, it is an isomorphism of $K$-vector spaces (since any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces). Thus, it is surjective. Therefore, there exists some $s in R$ such that $M_aleft(sright) = 1$. Consider this $s$. Now, the definition of $M_a$ yields $M_aleft(sright) = as$, so that $as = M_aleft(sright) = 1$. In other words, $s$ is a (multiplicative) inverse of $a$. Hence, $a$ has an inverse.



                  We have thus proven that every nonzero $a in R$ has an inverse. In other words, the ring $R$ is an integral domain. This proves Theorem 1. $blacksquare$



                  In your situation, you should apply Theorem 1 to $K = k$, $R = A/p$, $L = B/n$ and $g = psi$.






                  share|cite|improve this answer









                  $endgroup$




                  Theorem 1. Let $K$ be a field. Let $R$ and $L$ be two $K$-algebras such that $L$ is a finite-dimensional $K$-vector space and $R$ is an integral domain. Let $g : R to L$ be an injective $K$-linear map. Then, $R$ is a field.




                  Proof of Theorem 1. Since the $K$-linear map $g : R to L$ is injective, we have $dim R leq dim L$, where "$dim$" refers to the dimension of a $K$-vector space. But $dim L < infty$, since $L$ is finite-dimensional. Hence, $dim R leq dim L < infty$; thus, $R$ is a finite-dimensional $K$-vector space. Therefore, any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces (according to a well-known fact from linear algebra).



                  Now, let $a in R$ be nonzero. Let $M_a$ denote the map $R to R, r mapsto ar$. This map $M_a : R to R$ is $K$-linear and has kernel $0$ (because every $r in R$ satisfying $ar = 0$ must satisfy $r = 0$ (since $R$ is an integral domain and $a$ is nonzero)); thus, it is injective. Hence, it is an isomorphism of $K$-vector spaces (since any injective $K$-linear map $f : R to R$ is an isomorphism of $K$-vector spaces). Thus, it is surjective. Therefore, there exists some $s in R$ such that $M_aleft(sright) = 1$. Consider this $s$. Now, the definition of $M_a$ yields $M_aleft(sright) = as$, so that $as = M_aleft(sright) = 1$. In other words, $s$ is a (multiplicative) inverse of $a$. Hence, $a$ has an inverse.



                  We have thus proven that every nonzero $a in R$ has an inverse. In other words, the ring $R$ is an integral domain. This proves Theorem 1. $blacksquare$



                  In your situation, you should apply Theorem 1 to $K = k$, $R = A/p$, $L = B/n$ and $g = psi$.







                  share|cite|improve this answer












                  share|cite|improve this answer



                  share|cite|improve this answer










                  answered 39 mins ago









                  darij grinbergdarij grinberg

                  11.3k33167




                  11.3k33167























                      2












                      $begingroup$

                      Suppose $F$ is any field, $E$ is a finite extension field of $F$, and $D$ is an integral domain such that



                      $F subset D subset E; tag 1$



                      since



                      $[E:F] = n < infty, tag 2$



                      every element of $D$ is algebraic over $F$; thus



                      $0 ne d in D tag 3$



                      satisfies some



                      $p(x) in F[x]; tag 4$



                      that is,



                      $p(d) = 0; tag 5$



                      we may write



                      $p(x) = displaystyle sum_0^{deg p} p_j x^j, ; p_j in F; tag 6$



                      then



                      $displaystyle sum_0^{deg p} p_j d^j = p(d) = 0; tag 7$



                      furthermore, we may assume $p(x)$ is of minimal degree of all polynomials in $F[x]$ satisfied by $d$. In this case, we must have



                      $p_0 ne 0; tag 8$



                      if not, then



                      $p(x) = displaystyle sum_1^{deg p} p_jx^j = x sum_1^{deg p} p_j x^{j - 1}; tag 9$



                      thus



                      $d displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{10}$



                      and via (4) this forces



                      $displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{11}$



                      since $D$ is an integral domain; but this asserts that $d$ satisfies the polynomial



                      $displaystyle sum_1^{deg p} p_ x^{j - 1} in F[x] tag{12}$



                      of degree $deg p - 1$, which contradicts the minimality of the degree of $p(x)$; therefore (8) binds and we may write



                      $displaystyle sum_1^{deg p}p_j d^j = -p_0, tag{13}$



                      or



                      $d left( -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} right ) = 1, tag{14}$



                      which shows that



                      $d^{-1} = -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} in D; tag{15}$



                      since every $0 ne d in D$ has in iverse in $D$ by (15), $D$ is indeed a field.






                      share|cite|improve this answer









                      $endgroup$


















                        2












                        $begingroup$

                        Suppose $F$ is any field, $E$ is a finite extension field of $F$, and $D$ is an integral domain such that



                        $F subset D subset E; tag 1$



                        since



                        $[E:F] = n < infty, tag 2$



                        every element of $D$ is algebraic over $F$; thus



                        $0 ne d in D tag 3$



                        satisfies some



                        $p(x) in F[x]; tag 4$



                        that is,



                        $p(d) = 0; tag 5$



                        we may write



                        $p(x) = displaystyle sum_0^{deg p} p_j x^j, ; p_j in F; tag 6$



                        then



                        $displaystyle sum_0^{deg p} p_j d^j = p(d) = 0; tag 7$



                        furthermore, we may assume $p(x)$ is of minimal degree of all polynomials in $F[x]$ satisfied by $d$. In this case, we must have



                        $p_0 ne 0; tag 8$



                        if not, then



                        $p(x) = displaystyle sum_1^{deg p} p_jx^j = x sum_1^{deg p} p_j x^{j - 1}; tag 9$



                        thus



                        $d displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{10}$



                        and via (4) this forces



                        $displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{11}$



                        since $D$ is an integral domain; but this asserts that $d$ satisfies the polynomial



                        $displaystyle sum_1^{deg p} p_ x^{j - 1} in F[x] tag{12}$



                        of degree $deg p - 1$, which contradicts the minimality of the degree of $p(x)$; therefore (8) binds and we may write



                        $displaystyle sum_1^{deg p}p_j d^j = -p_0, tag{13}$



                        or



                        $d left( -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} right ) = 1, tag{14}$



                        which shows that



                        $d^{-1} = -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} in D; tag{15}$



                        since every $0 ne d in D$ has in iverse in $D$ by (15), $D$ is indeed a field.






                        share|cite|improve this answer









                        $endgroup$
















                          2












                          2








                          2





                          $begingroup$

                          Suppose $F$ is any field, $E$ is a finite extension field of $F$, and $D$ is an integral domain such that



                          $F subset D subset E; tag 1$



                          since



                          $[E:F] = n < infty, tag 2$



                          every element of $D$ is algebraic over $F$; thus



                          $0 ne d in D tag 3$



                          satisfies some



                          $p(x) in F[x]; tag 4$



                          that is,



                          $p(d) = 0; tag 5$



                          we may write



                          $p(x) = displaystyle sum_0^{deg p} p_j x^j, ; p_j in F; tag 6$



                          then



                          $displaystyle sum_0^{deg p} p_j d^j = p(d) = 0; tag 7$



                          furthermore, we may assume $p(x)$ is of minimal degree of all polynomials in $F[x]$ satisfied by $d$. In this case, we must have



                          $p_0 ne 0; tag 8$



                          if not, then



                          $p(x) = displaystyle sum_1^{deg p} p_jx^j = x sum_1^{deg p} p_j x^{j - 1}; tag 9$



                          thus



                          $d displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{10}$



                          and via (4) this forces



                          $displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{11}$



                          since $D$ is an integral domain; but this asserts that $d$ satisfies the polynomial



                          $displaystyle sum_1^{deg p} p_ x^{j - 1} in F[x] tag{12}$



                          of degree $deg p - 1$, which contradicts the minimality of the degree of $p(x)$; therefore (8) binds and we may write



                          $displaystyle sum_1^{deg p}p_j d^j = -p_0, tag{13}$



                          or



                          $d left( -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} right ) = 1, tag{14}$



                          which shows that



                          $d^{-1} = -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} in D; tag{15}$



                          since every $0 ne d in D$ has in iverse in $D$ by (15), $D$ is indeed a field.






                          share|cite|improve this answer









                          $endgroup$



                          Suppose $F$ is any field, $E$ is a finite extension field of $F$, and $D$ is an integral domain such that



                          $F subset D subset E; tag 1$



                          since



                          $[E:F] = n < infty, tag 2$



                          every element of $D$ is algebraic over $F$; thus



                          $0 ne d in D tag 3$



                          satisfies some



                          $p(x) in F[x]; tag 4$



                          that is,



                          $p(d) = 0; tag 5$



                          we may write



                          $p(x) = displaystyle sum_0^{deg p} p_j x^j, ; p_j in F; tag 6$



                          then



                          $displaystyle sum_0^{deg p} p_j d^j = p(d) = 0; tag 7$



                          furthermore, we may assume $p(x)$ is of minimal degree of all polynomials in $F[x]$ satisfied by $d$. In this case, we must have



                          $p_0 ne 0; tag 8$



                          if not, then



                          $p(x) = displaystyle sum_1^{deg p} p_jx^j = x sum_1^{deg p} p_j x^{j - 1}; tag 9$



                          thus



                          $d displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{10}$



                          and via (4) this forces



                          $displaystyle sum_1^{deg p} p_j d^{j - 1} = 0, tag{11}$



                          since $D$ is an integral domain; but this asserts that $d$ satisfies the polynomial



                          $displaystyle sum_1^{deg p} p_ x^{j - 1} in F[x] tag{12}$



                          of degree $deg p - 1$, which contradicts the minimality of the degree of $p(x)$; therefore (8) binds and we may write



                          $displaystyle sum_1^{deg p}p_j d^j = -p_0, tag{13}$



                          or



                          $d left( -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} right ) = 1, tag{14}$



                          which shows that



                          $d^{-1} = -p_0^{-1}displaystyle sum_1^{deg p} p_j d^{j- 1} in D; tag{15}$



                          since every $0 ne d in D$ has in iverse in $D$ by (15), $D$ is indeed a field.







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                          answered 35 mins ago









                          Robert LewisRobert Lewis

                          48.3k23167




                          48.3k23167






























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