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ÀÏüÀÇ Àڱ⵿Çü»ç»óÀÇ ¼ºÁúÀ» °øºÎÇÏ°í ü¿¡ ÀÛ¿ëÇÏ´Â ±ºÀ¸·Î¼­ Galois ÀÌ·ÐÀ» °øºÎÇÑ´Ù.
Galois ÀÌ·ÐÀº üÀÇ È®´ëü¿Í Àڱ⵿Çü»ç»ó±º°úÀÇ °ü°è¸¦ °øºÎÇÏ´Â °ÍÀÌ¸ç ´ë¼öÀû ¹æÁ¤½ÄÀÇ
°¡Çؼº(Solvability)¿¡ Áß¿äÇÑ ¿µÇâÀ» ÁÖ´Â ÀÌ·ÐÀÌ´Ù. 5Â÷ ´ÙÇ×½ÄÀÇ ºñ°¡Çؼºµµ Ž±¸ÇÑ´Ù.

  ±³Àç ¹× Âü°í¹®Çå
1. ÁÖ±³Àç : A first course in abstract algebra, John B. Fraleigh, Addison-Wesely, 2003
2. ºÎ±³Àç : Abstract algebra, Thomas W. Hungerford, Saunders college publishing, 1990
3. ºÎ±³Àç : Çö´ë´ë¼öÇÐ(Á¦7ÆÇ), J. B. Fraleigh Àú,°­¿µ¿í,°­º´·Ã ¿ª, ÇǾ¿¡µàÄÉÀ̼ÇÄÚ¸®¾Æ, 2009
  ÁÖº° °­ÀÇ¿ä¸ñ(°­Àǹæ¹ý, Æò°¡¹æ¹ý, ±³¼ö ÇнÀÀÚ·á ¹× ±âÀÚÀç, ÀÐÀ»°Å¸® °úÁ¦¸í µî Æ÷ÇÔ)
Á¦ 1 ÁÖ: Review on the groups
Á¦ 2 ÁÖ: Review on the extension fields
Á¦ 3 ÁÖ: Automorphism of fields
Á¦ 4 ÁÖ: The isomorphism extension theorem
Á¦ 5 ÁÖ: Splitting fields
Á¦ 6 ÁÖ: Separable extensions
Á¦ 7 ÁÖ: Totally inseparable extensions
Á¦ 8 ÁÖ: Galois thory I (Áß°£°í»ç)
Á¦ 9 ÁÖ: Galois theory II
Á¦10 ÁÖ: Illustrations of Galois theory
Á¦11 ÁÖ: Cyclotomic extensions
Á¦12 ÁÖ: Insolvability of the Quintic
Á¦13 ÁÖ: Review of the rings
Á¦14 ÁÖ: Review of the fields
Á¦15 ÁÖ: Summary of Algebras (±â¸»°í»ç)
  ¼ºÀû Æò°¡¹æ¹ý(±â¸», ¼ö½Ã½ÃÇè, ·¹Æ÷Æ®, Åä·Ð Âü¼® µî Æ÷ÇÔ)
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