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-14.414 -1.4 Td
(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 23 >>BDC 
/T1_0 1 Tf
1 0 Td
[(P)27 (erm)28 (utation)]TJ
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
5.794 0 Td
[(represen)26 (tations)]TJ
/T1_1 1 Tf
( )Tj
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(of)Tj
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
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(groups)Tj
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( )Tj
EMC 
/Lbl <</MCID 24 >>BDC 
/T1_3 1 Tf
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(\262)Tj
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( )Tj
EMC 
/LBody <</MCID 25 >>BDC 
/T1_0 1 Tf
1 0 Td
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/T1_1 1 Tf
( )Tj
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4.944 0 Td
(classes,)Tj
/T1_1 1 Tf
( )Tj
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(the)Tj
/T1_1 1 Tf
( )Tj
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1.723 0 Td
(class)Tj
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
2.344 0 Td
(equation)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Lbl <</MCID 26 >>BDC 
/T1_3 1 Tf
-13.472 -1.4 Td
(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 27 >>BDC 
/T1_0 1 Tf
1 0 Td
(Automorphisms)Tj
/T1_1 1 Tf
( )Tj
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7.264 0 Td
(of)Tj
/T1_1 1 Tf
( )Tj
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(groups)Tj
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( )Tj
EMC 
/Lbl <</MCID 28 >>BDC 
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(\262)Tj
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( )Tj
EMC 
/LBody <</MCID 29 >>BDC 
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1 0 Td
(The)Tj
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
2.055 0 Td
[(Sylo)27 (w)]TJ
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
2.889 0 Td
(Theorems)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Lbl <</MCID 30 >>BDC 
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(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 31 >>BDC 
/T1_0 1 Tf
1 0 Td
[(F)83 (ree)]TJ
/T1_1 1 Tf
( )Tj
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2.184 0 Td
[(ab)-27 (elian)]TJ
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
3.473 0 Td
(groups,)Tj
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
3.508 0 Td
(\257nitely)Tj
/T1_1 1 Tf
( )Tj
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3.361 0 Td
(generated)Tj
/T1_1 1 Tf
( )Tj
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4.559 0 Td
[(ab)-28 (elian)]TJ
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( )Tj
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(groups)Tj
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EMC 
/Lbl <</MCID 32 >>BDC 
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(\(b\))Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 33 >>BDC 
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( )Tj
EMC 
/Lbl <</MCID 34 >>BDC 
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(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 35 >>BDC 
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( )Tj
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[(in)27 (tegral)]TJ
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( )Tj
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(domains,)Tj
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( )Tj
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(division)Tj
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( )Tj
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(rings,)Tj
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( )Tj
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(\257elds)Tj
/T1_1 1 Tf
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EMC 
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EMC 
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( )Tj
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(of)Tj
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( )Tj
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(a)Tj
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( )Tj
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(ring)Tj
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EMC 
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(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 39 >>BDC 
/T1_0 1 Tf
1 0 Td
(Subrings,)Tj
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( )Tj
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4.397 0 Td
(ideals,)Tj
/T1_1 1 Tf
( )Tj
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3.061 0 Td
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/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
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(rings)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Lbl <</MCID 40 >>BDC 
/T1_3 1 Tf
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(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 41 >>BDC 
/T1_0 1 Tf
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(Homomorphisms)Tj
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( )Tj
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(of)Tj
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( )Tj
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(rings,)Tj
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( )Tj
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(isomorphism)Tj
/T1_1 1 Tf
( )Tj
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5.847 0 Td
(theorems)Tj
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EMC 
/Lbl <</MCID 42 >>BDC 
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(\262)Tj
/T1_1 1 Tf
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EMC 
/LBody <</MCID 43 >>BDC 
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(Characterization)Tj
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( )Tj
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(of)Tj
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( )Tj
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(prime)Tj
/T1_1 1 Tf
( )Tj
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(and)Tj
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( )Tj
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(maximal)Tj
/T1_1 1 Tf
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(ideals)Tj
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EMC 
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(\262)Tj
/T1_1 1 Tf
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EMC 
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1 0 Td
(Direct)Tj
/T1_1 1 Tf
( )Tj
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3.044 0 Td
[(pro)-28 (duct)]TJ
/T1_1 1 Tf
( )Tj
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(of)Tj
/T1_1 1 Tf
( )Tj
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(rings)Tj
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EMC 
/Lbl <</MCID 46 >>BDC 
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(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 47 >>BDC 
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1 0 Td
(Principal)Tj
/T1_1 1 Tf
( )Tj
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4.294 0 Td
(ideal)Tj
/T1_1 1 Tf
( )Tj
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(domains,)Tj
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( )Tj
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(unique)Tj
/T1_1 1 Tf
( )Tj
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(factorization)Tj
/T1_1 1 Tf
( )Tj
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(domains,)Tj
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( )Tj
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(Euclidean)Tj
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(domains)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Lbl <</MCID 48 >>BDC 
/T1_0 1 Tf
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(\(c\))Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 49 >>BDC 
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(Linear)Tj
/T1_1 1 Tf
( )Tj
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(Algebra)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Span <</MCID 50 >>BDC 
/T1_3 1 Tf
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(\262)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Span <</MCID 51 >>BDC 
/T1_0 1 Tf
1 0 Td
(The)Tj
/T1_1 1 Tf
( )Tj
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2.013 0 Td
[(con)27 (ten)27 (t)]TJ
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( )Tj
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(of)Tj
/T1_1 1 Tf
( )Tj
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(the)Tj
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( )Tj
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(undergraduate)Tj
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(linear)Tj
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(algebra)Tj
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(course)Tj
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( )Tj
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[(MA)83 (TH)]TJ
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(247,)Tj
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(including)Tj
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(matrix)Tj
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-33.873 -1.2 Td
(algebra,)Tj
/T1_1 1 Tf
( )Tj
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3.701 0 Td
[(v)27 (ector)]TJ
/T1_1 1 Tf
( )Tj
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(spaces,)Tj
/T1_1 1 Tf
( )Tj
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(linear)Tj
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( )Tj
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2.682 0 Td
(transformations,)Tj
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( )Tj
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7.41 0 Td
[(eigen)27 (v)55 (alues)]TJ
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( )Tj
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5.073 0 Td
(and)Tj
/T1_1 1 Tf
( )Tj
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1.846 0 Td
[(eigen)27 (v)28 (ectors,)]TJ
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( )Tj
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5.791 0 Td
[(similarit)27 (y)]TJ
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( )Tj
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(and)Tj
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( )Tj
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(diagonalization)Tj
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(of)Tj
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( )Tj
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(matrices)Tj
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EMC 
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(2.)Tj
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( )Tj
EMC 
/H2 <</MCID 53 >>BDC 
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(References)Tj
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EMC 
/Lbl <</MCID 54 >>BDC 
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(\(a\))Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 55 >>BDC 
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1.777 0 Td
[(Bhattac)26 (hary)28 (a,)]TJ
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( )Tj
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6.517 0 Td
(Jain,)Tj
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( )Tj
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(and)Tj
/T1_1 1 Tf
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(Nagpaul,)Tj
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4.25 0 Td
(Basic)Tj
/T1_1 1 Tf
( )Tj
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2.749 0 Td
[(A)25 (bstr)51 (act)]TJ
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( )Tj
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3.95 0 Td
[(A)25 (lgebr)51 (a)]TJ
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(,)Tj
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
3.846 0 Td
[(Cam)27 (bridge,)]TJ
/T1_1 1 Tf
( )Tj
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5.365 0 Td
(1994)Tj
/T1_1 1 Tf
( )Tj
EMC 
/Lbl <</MCID 56 >>BDC 
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-32.912 -1.599 Td
(\(b\))Tj
/T1_1 1 Tf
( )Tj
EMC 
/LBody <</MCID 57 >>BDC 
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1.832 0 Td
(Dummit)Tj
/T1_1 1 Tf
( )Tj
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3.986 0 Td
(and)Tj
/T1_1 1 Tf
( )Tj
/T1_0 1 Tf
1.945 0 Td
[(F)83 (o)-27 (ote,)]TJ
/T1_1 1 Tf
( )Tj
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3.042 0 Td
[(A)25 (bstr)51 (act)]TJ
/T1_1 1 Tf
( )Tj
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3.949 0 Td
[(A)24 (lgebr)51 (a)]TJ
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(,)Tj
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( )Tj
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0.61 0 Td
[(Pren)26 (tice)]TJ
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( )Tj
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3.934 0 Td
(Hall,)Tj
/T1_1 1 Tf
( )Tj
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(2004)Tj
/T1_1 1 Tf
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EMC 
/Span <</MCID 58 >>BDC 
/T1_0 1 Tf
-24.84 -1.6 Td
(\(c\))Tj
/T1_1 1 Tf
( )Tj
EMC 
/Span <</MCID 59 >>BDC 
/T1_0 1 Tf
1.722 0 Td
[(F)83 (raleigh,)]TJ
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( )Tj
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4.128 0 Td
(A)Tj
/T1_1 1 Tf
( )Tj
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1.1 0 Td
(First)Tj
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(Course)Tj
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3.412 0 Td
(in)Tj
/T1_1 1 Tf
( )Tj
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1.226 0 Td
[(A)24 (bstr)51 (act)]TJ
/T1_1 1 Tf
( )Tj
/T1_4 1 Tf
3.951 0 Td
[(A)25 (lgebr)51 (a)]TJ
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(,)Tj
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( )Tj
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[(Addison-W)83 (esley)83 (,)]TJ
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( )Tj
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(2003)Tj
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EMC 
/Lbl <</MCID 60 >>BDC 
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(\(d\))Tj
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( )Tj
EMC 
/LBody <</MCID 61 >>BDC 
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(Isaacs,)Tj
/T1_1 1 Tf
( )Tj
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[(A)25 (lgebr)51 (a:)]TJ
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( )Tj
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(A)Tj
/T1_1 1 Tf
( )Tj
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[(Gr)50 (aduate)]TJ
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( )Tj
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(Course)Tj
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(,)Tj
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( )Tj
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[(Bro)-27 (oks/Cole,)]TJ
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( )Tj
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(1994)Tj
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EMC 
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(\(e\))Tj
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EMC 
/LBody <</MCID 63 >>BDC 
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(Snaith,)Tj
/T1_1 1 Tf
( )Tj
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3.445 0 Td
[(Gr)50 (oups,)]TJ
/T1_1 1 Tf
( )Tj
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3.776 0 Td
[(R)24 (ings)]TJ
/T1_1 1 Tf
( )Tj
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(and)Tj
/T1_1 1 Tf
( )Tj
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1.941 0 Td
(Galois)Tj
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( )Tj
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3.125 0 Td
[(The)50 (ory)]TJ
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(,)Tj
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( )Tj
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3.666 0 Td
[(W)83 (orld)]TJ
/T1_1 1 Tf
( )Tj
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[(Scien)27 (ti\257c,)]TJ
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( )Tj
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(1998)Tj
/T1_1 1 Tf
( )Tj
EMC 
/P <</MCID 64 >>BDC 
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(Last)Tj
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(revised)Tj
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(5-2007)Tj
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( )Tj
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4.347 0 Td
[(b)34 (y)]TJ
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( )Tj
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(Dr.)Tj
/T1_1 1 Tf
( )Tj
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2.56 0 Td
[(Rob)-35 (ert)]TJ
/T1_1 1 Tf
( )Tj
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4.602 0 Td
[(V)103 (alen)35 (tini)]TJ
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( )Tj
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(and)Tj
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( )Tj
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(Dr.)Tj
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(Will)Tj
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( )Tj
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3.009 0 Td
[(Murra)34 (y)104 (.)]TJ
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( )Tj
EMC 
ET

endstream
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