Question

Abstract Algebra Ring Question. see the image and show parts a, b, c, and d please.

36. Let R be a ring with identity. (a) Let u be a unit in R. Define a map ix : R R by Huru". Prove that i, is an automorphism of R. Such an automorphism of R is called an inner automorphism of R. Denote the set of all inner automorphisms of R by Inn(R). (b) Denote the set of all automorphisms of R by Aut(R). Prove that Inn(R) is a normal subgroup of Aut(R). (c) Let U(R) be the group of units in R. Prove that the map 6: U(R) Inn(R) defined by u i, is a homomorphism. Determine the kernel of (d) Compute Aut(Z), Inn(Z), and U (Z).

Answer 1

soln - Let R bearing with identity. To let ze be a n I beline map as unit in R in i R R as italy) = uru-!. . . claim. iu is automocphism of R. I for rs ER Iconsider i (r+5) = u(ots 12-1 . =(urtus) w - by left distribut u rut + usut - by right distributor .. si + is a in kr+5) = lucrstiness. & risor, Liconader in cris) = u(7.5)2-... . = 2(res) (where e is identity) 520 w2i 5) u-1-(:::49.4 = e) = (Urut (usual) Elulo). iurs). . y risar L » iu (8:5)= ín(a). ;;(6) ining ring homomodshism, for one-one let rser consider . luras = 'ucs)

şuru-/= usu- I pre multiply u'q post multiply e on both side. umurunziz ucusunu >> (2-14) r(utu) = (2014) (5) mu. > ere - 'e se i uluse zuery Izņ25. J 'uras = {415) 2=5 13 in is one-one. I for onto for erecy SER (Kodomain} we have to find & Estan rer domani such that E curr) = 5 : → zru- =s pre muttiply utg post mutiply a weget 2? curu) uz ulsu =) ( ulurcanul cursu ga uolsu ER us ER) I for every SER (codomuin) there exist r = nisu G R (domain) such that . 3) 2017) 75 HJER zu is onto in is bijective sing homomodphism T

- Luis autmosphism... o el dr Aut CRJ be the sel of all Inn (R) be the set of 'inner & automocphism automodphism clum AutoR) - Inner) is normal subgroup of Let u er be unit f. ENER- defined as: cucaj - urut A . : for closed under product Joan (2) for aid b į R. ia int for any rer. consider (cooib) (%) = (albob- .acbr67).at -laba (56 fab) r(ab)/ Ainį (r) € Inner This ann (A) is closed under product. : consider loola = lao . aie eis identity which is identity fund Thus innir is closed under inrease Innces is subgroup A Aut (R)

for normal let frau (2) gole in f Iron (G) Then for all i - consider (fo in of) (8) = flinkfl(r)). = f (18" (v) 6-1) = fu [ F.C#*()J[ful] = fous r full afw). ()) = if (2) - Inne) - Inn (R) is normal subgroup of Au(R) ① let u(2) be the group of units in T d.U(R) - Inn (a) defined as a $16)= iu claim dis homomorphism _' for U, V EUR) consider ocu-vo Luv for rar du.v) (8) = lurer) = (2v) & (uu)-T = (22)r(V441) - usurvollut au 12 un inflyer)) zijos

=(.dopo & NER $(un) = dr. . de identing map onr ker & = 34E UIRS | Plu) = 6 JUGUIR / {ua dey. zu 6 UIRI I 4%) = Pers) ar? Vyer alut UCR) / urinar.} ote. EJUE UIRD Tureru y Z(UERJ @ for Autor: A let D. z. 2 he is 4 I since zr has only two lisince 2 is cycloc.). anautomocphism generator Ig 1.1 = $(1) = 1 or dua, are only choices, A 0.23 = ze 4 (21) = -2e are the only autom acphism at of - Autres = 1 4 (2:222 , przsa-zed rear for Imezo from @ ker & = 21-10l .= u(2) Inin (PU) = P12 = zi Vu624 urz Uiz= 1 - sot for