000 | 01525nmm a2200193Ia 4500 | ||
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008 | 230306s9999||||xx |||||||||||||||||und|| | ||
020 | _a9780821877784 (online) | ||
100 | _aBrumfiel, Gregory W. | ||
245 | 0 | _aSL(2) representations of finitely presented groups | |
260 |
_aProvidence, R.I. : _bAmerican Mathematical Society, _cc1995 |
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300 | _a1 online resource (vii, 196 p. : ill.) | ||
490 |
_aContemporary mathematics _vv. 187 _x10983627 |
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504 | _aIncludes bibliographical references (p. 195196). | ||
505 |
_tIntroduction ; Chapter 1. The Definition and Some Basic Properties of the Algebra _H[\pi ] _ ; Chapter 2. ADecomposition of the Algebra _H[\pi ] _ when _\frac 12\in k _ ; Chapter 3. Structure of the Algebra _H[\pi ] _ for TwoGenerator Groups ; Chapter 4. Absolutely Irreducible _SL(2) _ Representations of TwoGenerator Groups ; Chapter 5. Further Identities in the Algebra _H[\pi ] _ when _\frac 12\in k _ ; Chapter 6. Structure of _H^+[\pi _n] _ for Free Groups _\pi _n _ ; Chapter 7. Quaternion Algebra Localizations of _H[\pi ] _ and Absolutely Irreducible _SL(2) _ Representations ; Chapter 8. AlgebroGeometric Interpretation of SL(2) Representations of Groups ; Chapter 9. The Universal Matrix Representation of the Algebra _H[\pi ] _ ; Chapter 10. Some Knot Invariants Derived from the Algebra _H[\pi ] _ ; Appendix A. Addenda ; Appendix B. Afterword ; Bibliography |
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650 | _aFinite groups | ||
650 | _aRepresentations of groups | ||
700 | _aHilden H M | ||
856 | _uhttp://www.ams.org/conm/187/ | ||
999 |
_c28604 _d28604 |