Дэвид С. Ричесон - Жемчужина Эйлера

Brown.

Sachs, H., M. Stiebitz, and R. J. Wilson (1988). An historical note: Euler's Konigsberg letters. Journal of Graph Theory 12 (1), 133-139.

Salzberg, H. W. (1991). From caveman to chemist: Circumstances and achievements. Washington DC: American Chemical Society.

Samelson, H. (1995). Descartes and differential geometry. In Geo metry, topology, & physics, Conf. Proc. Lecture Notes in Geometry and Topology, IV, 323-328. Cambridge, MA: Internat. Press.

---. (1996). In defense of Euler. Enseign. Math. (2) 42 (3-4), 377-382.

Sandifer, E. (2004). How Euler did it: V, E and F, parts 1 and 2. Mathematical Association of America Online. http://www.maa.org/news/howeulerdidit.html.

Sarkaria, K. S. (1999). The topological work of Henri Poincare. In History of topology, 123-167. Amsterdam: North-Holland.

Schechter, B. (1998). My brain is open: The mathematical journeys of Paul Erdos. New York: Touchstone.

Schlafli, L. (1901). Theorie der vielfachen Kontinuitat. Denkschr. Schweiz. naturf. Ges. 38, 1-237.

Scholz, E. (1999). The concept of manifold, 1850-1950. In I. M. James (ed.), History of topology, 25-64. Amsterdam: North-Holland.

Seifert, H. (1934). Uber das Geschlecht von Knotten. Math. Ann. 110, 571-592.

Seifert, H., and W. Threlfall (1980). Seifert and Threlfall: A textbook of topology, vol. 89 of Pure and Applied Mathematics. Translated from the German edition of 1934 by Michael A. Goldman, with a preface by Joan S. Birman. With «Topolo-gy of 3-dimensional fibered spaces» by Seifert, translated from the German by Wolfgang Heil. New York: Academic Press. Harcourt Brace Jovanovich Publishers.

Senechal, M. (1988). A visit to the polyhedron kingdom. In M. Senechal and G. Fleck (eds.), Shaping space: A polyhedral approach, proceedings of 1984 conference held in Northampton, MA, 3-43. Boston, Design Science Collection, Birkhauser Boston.

Shakespeare, W. (1992). Hamlet. New York: Dover.

---. (2002). Twelfth night. Woodbury, CT: Barron's Educational Series.

Simmons, G. F. (1992). Calculus gems: Brief lives and memorable mathematics. With portraits by Maceo Mitchell. New York: McGraw-Hill.

Simpson, J., and E. Weiner (eds.) (1989). Oxford English Dictionary (2nd ed.). Oxford: Clarendon Press.

Sloane, N. J. A. (2007). The online encyclopedia of integer sequences. http://www.research.att.com/~njas/sequences.

Smale, S. (1961). Generalized Poincare's conjecture in dimensions greater than four. Ann. of Math. (2) 74, 391-406.

---. (1990). The story of the higher dimensional Poincare conjecture (what really actually happened on the beaches of Rio). Math. Intelligencer 12 (2), 44-51.

---. (1998). Mathematical problems for the next century. Math. Intelligencer 20 (2), 7-15.

Sommerville, D. M. Y. (1958). An introduction to the geometry of n dimensions. New York: Dover.

Speziali, P. (1973). L'huillier, Simon-Antoine-Jean. In C. C. Gillispie (ed.), Dictionary of scientific biography. Vol. 8, 305-307. New York: Charles Scribner's Sons.

Stallings, J. (1960). Polyhedral homotopy-spheres. Bull. Amer. Math. Soc. 66, 485-488.

Stallings, J. (1962). The piecewise-linear structure of Euclidean space. Proc. Cambridge Philos. Soc. 58, 481-488.

Steiner, J. (1826). Leichter Beweis eines stereometrischen Satzes von Euler. Journal fur die reine und angewandte Mathematik 1, 364-367.

Steinitz, E. (1922). Polyeder und raumeinteilungen. In W. F. Meyer and H. Mohrmann (eds.), Encyclopadie der mathematischen Wissenschaften. Vol. 3 (Geometrie), 1-139. Leipzig: Teubner.

Stillwell, J. (2002). Mathematics and its history (2nd ed.). Undergraduate Texts in Mathematics. New York: Springer-Verlag.

Struik, D. J. (1972). Gergonne, Joseph Diaz. In C. C. Gillispie (ed.), Dictionary of scientific biography. Vol. 5, 367-369. New York: Charles Scribner's Sons.

Tait, P. G. (1883). Johann Benedict Listing. Nature 28, February 1, 316. Also in Scientific Papers of Peter Guthrie Tate, vol. 2, Cambridge: Cambridge University Press, 81-84.

---. (1884). Listing's Topologie. Introductory address to the Edinburgh Mathematical Society, November 9, 1883. Philosophical Magazine 17 (5), January, 30-46.

Taubes, G. (1987). What happens when hubris meets nemesis. Discover 8, July, 66-77.

Taylor, A. E. (1929). Plato: The man and his work. New York: The Dial Press.

---. (1962). A commentary on Plato's Timaeus. London: Oxford University Press.

Terquem, O. (1849). Sur les polygones et les polyedres etoiles, polygones funiculaires. Nouv. Ann. Math. 8, 68-74.

Terrall, M. (1990). The culture of science in Frederick the Great's Berlin. Hist. Sci. 28, 333-364.

Thistlethwaite, M. B. (1987). A spanning tree expansion of the Jones polynomial. Topology 26 (3), 297-309.

Thomassen, C. (1992). The Jordan-Schonflies theorem and the classification of surfaces. Amer. Math. Monthly 99 (2), 116-130.

Thoreau, H. D. (1894). In F. B. Sanborn (ed.), Familiar Letters of Henry David Thoreau. Boston: Houghton, Mifflin and Co.

Thurston, W. P. (1982). Three-dimensional manifolds, Kleinian groups and hyperbolic geometry. Bull. Amer. Math. Soc. (N.S.) 6 (3), 357-381.

---. (1997). Three-dimensional geometry and topology, vol. 1. Princeton, NJ: Princeton Univ. Press.

Tucker, A. W., and F. Nebeker (1990). Lefschetz, Solomon. In C. C. Gillispie (ed.), Dictionary of scientific biography. vol. 18, 534-539. New York: Charles Scribner's Sons.

Turnbull, H. W. (1961). The great mathematicians. New York: New York University Press.

Twain, M. (1894). Tom Sawyer abroad. New York: Jenkins & Mccowan.

van der Waerden, B. L. (1954). Science awakening. English translation by Arnold Dresden. Groningen, Netherlands: P. Noordhoff.

Vanden Eynde, R. (1999). Development of the concept of homotopy. In History of topology, 65-102. Amsterdam: North-Holland.

Vandermonde, A.-T. (1771). Remarques sur les problemes de situation. Memories de l'Academie Royale des Sciences de Paris 15, 566-574.

Varberg, D. E. (1985). Pick's theorem revisited. Amer. Math. Monthly 92 (8), 584-587.

von Fritz, K. (1975). Pythagoras of Samos. In C. C. Gillispie (ed.), Dictionary of scientific biography. Vol. 11, 219-25. New York: Charles Scribner's Sons.

von Staudt, K. G. C. (1847). Geometrie der Lage. Nurnberg: Bauer und Raspe.

Vucinich, A. (1963). Science in Russian culture: A history to 1860. Stanford, CA: Stanford University Press.

Waterhouse,W. C. (1972). The discovery of the regular solids. Arch. Hist. Exact Sci. 9, 212-221.

Weeks, J. R. (2002). The shape of space, 2nd ed. New York: Marcel Dekker.

Weibel, C. A. (1999). History of homological algebra. In History of topology, 797-836. Amsterdam: North-Holland.

Weil, A. (1984). Euler. Amer. Math. Monthly 91 (9), 537-542.

Wells, D. (1990). Are these the most beautiful? Math. Intelligencer 12 (3), 37-41.

Weyl, H. (1989). Symmetry. Reprint of the 1952 original. Princeton Science Library. Princeton, NJ: Princeton University Press.

Wilson, R. J. (1986). An Eulerian trail through Konigsberg. Journal of Graph Theory 10 (3), 265-275.

---. (2002). Four colors suffice: How the map problem was solved. Princeton, NJ: Princeton University Press.

Youschkevitch, A. P. (1971). Euler, Leonhard. In C. C. Gillispie (ed.), Dictionary of scientific biography. Vol. 4, 467-484. New York: Charles Scribner's Sons.

Zeeman, E. C. (1961). The generalised Poincare conjecture. Bull. Amer. Math. Soc. 67, 270.

---. (1962). The Poincare conjecture for n > 5. In Topology of 3-manifolds and related topics (Proc. The Univ. of Georgia Institute, 1961), 198-204. Englewood Cliffs, N. J.: Prentice-Hall.

Книги издательства «ДМК ПРЕСС» можно купить оптом и в розницу в книготорговой компании «Галактика» (представляет интересы --">