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Talk:Characteristic subgroup

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I have to argue, the center of the group is not always fully characteristic, there is a group with order 16 as counterexample.

Ooops! Quite right; in fact, let G be the direct product of C₂ and any generalized dihedral group Dih(H), then G forms a counterexample. If we let f:G → G be the endomorphism f(h) = 1 for all h in H, f(g) = g for g not in H, then f(G) is onto the subgroup generated by C₂ and an element of order 2 in Dih(H); this is isomorphic to V₄, so we can apply an automorphism T swapping elements of order 2. Then Tf(Z(G)) is not a subgroup of Z(G).

It is true that the center of a group is strictly characteristic. Chas zzz brown 20:49 Nov 5, 2002 (UTC)

Is strictly characteristic the usual term? I've never seen this term before, but I have seen such subgroups referred to as distinguished subgroups, e.g., in Combinatorial Group Theory (Magnus, Karrass & Solitar). --Zundark 09:07, 7 Oct 2003 (UTC)

It's been over two years since I asked this, and still nobody has provided a reference for "strictly characteristic", so I'm changing it to "distinguished". --Zundark 09:34, 2 November 2005 (UTC)

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aa - ab - af - ak - als - am - an - ang - ar - arc - as - ast - av - ay - az - ba - bar - bat_smg - bcl - be - be_x_old - bg - bh - bi - bm - bn - bo - bpy - br - bs - bug - bxr - ca - cbk_zam - cdo - ce - ceb - ch - cho - chr - chy - co - cr - crh - cs - csb - cu - cv - cy - da - de - diq - dsb - dv - dz - ee - el - eml - en - eo - es - et - eu - ext - fa - ff - fi - fiu_vro - fj - fo - fr - frp - fur - fy - ga - gan - gd - gl - glk - gn - got - gu - gv - ha - hak - haw - he - hi - hif - ho - hr - hsb - ht - hu - hy - hz - ia - id - ie - ig - ii - ik - ilo - io - is - it - iu - ja - jbo - jv - ka - kaa - kab - kg - ki - kj - kk - kl - km - kn - ko - kr - ks - ksh - ku - kv - kw - ky - la - lad - lb - lbe - lg - li - lij - lmo - ln - lo - lt - lv - map_bms - mdf - mg - mh - mi - mk - ml - mn - mo - mr - mt - mus - my - myv - mzn - na - nah - nap - nds - nds_nl - ne - new - ng - nl - nn - no - nov - nrm - nv - ny - oc - om - or - os - pa - pag - pam - pap - pdc - pi - pih - pl - pms - ps - pt - qu - quality - rm - rmy - rn - ro - roa_rup - roa_tara - ru - rw - sa - sah - sc - scn - sco - sd - se - sg - sh - si - simple - sk - sl - sm - sn - so - sr - srn - ss - st - stq - su - sv - sw - szl - ta - te - tet - tg - th - ti - tk - tl - tlh - tn - to - tpi - tr - ts - tt - tum - tw - ty - udm - ug - uk - ur - uz - ve - vec - vi - vls - vo - wa - war - wo - wuu - xal - xh - yi - yo - za - zea - zh - zh_classical - zh_min_nan - zh_yue - zu -

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