Preface.-Chapter 1: Classical Algebra.-Early roots.-The Greeks.-Al-Khwarizmi.-Cubic and quartic equations.-The cubic and complex numbers.-Algebraic notation: Viète and Descartes.
-The theory of equations and the Fundamental Theorem of Algebra.-Symbolical algebra.-References.-Chapter 2: Group Theory.-Sources of group theory.-Development of 'specialized' theories of groups.-Emergence of abstraction in group theory.-Consolidation of the abstract group concept; dawn of abstract group theory.
Divergence of developments in group theory.-References.-Chapter 3: Ring Theory.-Noncommutative ring theory.-Commutative ring theory.-The abstract definition of a ring.-Emmy Noether and Emil Artin.-Epilogue.
-References.-Chapter 4: Field Theory.-Galois theory.-Algebraic number theory.-Algebraic geometry.-Symbolical algebra.-The abstract definition of a field.-Hensel's p-adic numbers.
-Steinitz.-A glance ahead.-References.-Chapter 5: Linear Algebra.-Linear equations.-Determinants Matrices and linear transformations.-Linear independence, basis, and dimension.-Vector spaces.
-References.-Chapter 6: Emmy Noether and the Advent of Abstract Algebra.-Invariant theory.-Commutative algebra.-Noncommutative algebra and representation theory.-Applications of noncommutative to commutative algebra.-Noether's legacy.-References.
-Chapter 7: A course in abstract algebra inspired by history.-Problem I: Why is (-1)(-1) = 1? .-Problem II: What are the integer solutions of x2 + 2 = y3 ? .-Problem III: Can we trisect a 600 angle using only straightedge and compass?.-Problem IV: Can we solve x5 - 6x + 3 = 0? .-Problem V: 'Papa, can you multiply triples?' .-General remarks on the course.-References.
-Chapter 8: Biographies of Selected Mathematicians.-Cayley.-Invariants.-Groups.-Matrices. Geometry.-Conclusion.-References.
-Dedekind.-Algebraic numbers.-Real numbers.-Natural numbers.-Other works.Conclusion.-References.-Galois.
-Mathematics.-Politics.-The duel.-Testament.-Conclusion.-References.-Gauss.-Number theory.
-Differential geometry, probability, statistics.-The diary.-Conclusion.-References.-Hamilton.-Optics.-Dynamics.-Complex numbers.
-Foundations of algebra.-Quaternions.-Conclusion.-References.-Noether.-Early years.-University studies.-Göttingen.
-Noether as a teacher.-Bryn Mawr.-Conclusion.-References.-Index.-Acknowledgments.