By John Casey

ISBN-10: 1418169897

ISBN-13: 9781418169893

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**Additional info for A treatise on the analytical geometry of the point, line, circle, and conic sections, containing an account of its most recent extensions, with numerous examples. **

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Sci. Paris 202, 1400–1403. Bredon, G. (1993), Topology and Geometry, Springer–Verlag, New York. , Collected Works, Vol. II, North Holland, Amsterdam, 1976. H. (1962), Cohomology theories, Ann. of Math. 75, 467–484; (1963), and corr. 78, 201. Cairns, S. (1930), The cellular division and approximation of regular spreads, Proc. Nat. Acad. Sci. USA 16, 488–490. Casson, A. and Gottlieb, D. H. (1977), Fibrations with compact fibres, Amer. J. Math. 99, 159–189. ˇ ˇ Cech, E. (1936), Multiplications on a complex, Ann.

Angew. Math. 105, 71-88; Hopf, Selecta, Springer, 1964, pp. 14–37. Hurewicz, W. (1936), Asph¨ arische R¨ aume 39, 215–224. Hurewicz, W. , Dugundji, J. and Dowker, C. (1948), Connectivity groups in terms of limit groups, Ann. of Math. 49, 391–406. M. (1971), Ex–Homotopy Theory I, Ill. J. Math. 15, 324–327. Kan, D. (1958), Adjoint functors, Trans. Amer. Math. Soc. 87, 294–329. S. B. (1972), Applications to stable homotopy theory, Bull. Amer. Math. Soc. 78, 981–987. Knill, R. (1971), On the homology of a fixed point set, Bull.

1930), Topology, Amer. Math. Soc. Coll. Publ. No. 12, Providence, RI. Lefschetz, S. (1942), Algebraic Topology, Amer. Math. Soc. Coll. Publ. No. 27, Providence, RI. Lichnerowicz, A. R. Acad. Sci. Paris 227, 711–712. Lima, E. (1959), The Spanier–Whitehead duality in new homotopy categories, Summa Brasil. Math. 4, 91–148. Massey, W. (1980), Singular Homology Theory, Springer–Verlag, Heidelberg. Massey, W. ), A History of Cohomology Theory, elsewhere in this volume. Milnor and Spanier (1960), Two remarks on fiber homotopy type, Pacific J.

### A treatise on the analytical geometry of the point, line, circle, and conic sections, containing an account of its most recent extensions, with numerous examples. by John Casey

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