Boundedly Controlled Topology: Foundations of Algebraic by Anderson D.R., Munkholm H.J.

By Anderson D.R., Munkholm H.J.

Show description

Read Online or Download Boundedly Controlled Topology: Foundations of Algebraic Topology and Simple Homotopy Theory PDF

Similar geometry and topology books

Differential Geometry. Proc. conf. Lyngby, 1985

The Nordic summer season tuition 1985 awarded to younger researchers the mathematical elements of the continuing study stemming from the examine of box theories in physics and the differential geometry of fibre bundles in arithmetic. the amount contains papers, usually with unique traces of assault, on twistor tools for harmonic maps, the differential geometric elements of Yang-Mills idea, advanced differential geometry, metric differential geometry and partial differential equations in differential geometry.

Geometric Aspects of Functional Analysis: Israel Seminar (GAFA) 1986–87

This can be the 3rd released quantity of the lawsuits of the Israel Seminar on Geometric facets of practical research. the massive majority of the papers during this quantity are unique examine papers. there has been final 12 months a robust emphasis on classical finite-dimensional convexity idea and its reference to Banach area conception.

Lectures on the geometry of quantization

Those notes are in accordance with a direction entitled "Symplectic Geometry and Geometric Quantization" taught by way of Alan Weinstein on the college of California, Berkeley (fall 1992) and on the Centre Emile Borel (spring 1994). the single prerequisite for the direction wanted is a data of the elemental notions from the speculation of differentiable manifolds (differential varieties, vector fields, transversality, and so forth.

Extra info for Boundedly Controlled Topology: Foundations of Algebraic Topology and Simple Homotopy Theory

Example text

Sci. USA 39, 655–660. Spanier, E. C. (1955), Duality in homotopy theory, Mathematika 2, 56–80. Spanier, E. C. (1957), The theory of carriers and S-theory, Algebraic geometry and topology. A symposium in honor of S. , pp. 330– 360. Steenrod, N. (1936), Universal homology groups, Amer. J. Math. 58, 661–701. Thom, R. (1952), Espaces fibr´ es en sph´ eres et carr´ es de Steenrod, Ann. Ec. Norm. Sup. 69, 109–181. Thom, R. (1954), Quelques propri´ et´ es globales des vari´ et´ es diff´ erentiables, Comment.

Math. Pures Appl. , Gen´ eve, 1981, pp. 23–213). W. D. Thesis, Princeton. Segal, G. (1970), Equivariant stable homotopy theory, Actes du Congres International des Mathematiciens (Nice, 1970), vol. 2, pp. 59–63. Serre, J–P. (1951), Homologie singuli´ ere des espaces fibr´ es, Ann. of Math. 54, 425–505, 24–204). Spanier, E. (1948), Cohomology theory for general spaces, Ann. of Math. 49, 407–427. Spanier, E. (1949), Borsuk’s cohomotopy groups, Ann. of Math. 50, 203–245. Spanier, E. (1959), Function spaces and duality, Ann.

R. Acad. Sci. Paris 115; (also in Oeuvres, vol. VI, pp. 186– 192). Poincar´ e, H. R. Acad. Sci. Paris 117, 144–145; (also in Oeuvres, vol. XI, pp. 6–7). Poincar´ e, H. (1895), Oeuvres, vol. VI, Gauthier–Villars, Paris 1953. Pontrjagin, L. (1934), The general topological theorem of duality for closed sets, Ann. of Math. 35, 904–914. Puppe D. (1958), Homotopiemengen und ihre induzierten Abbildungen I, Math. Z. 69, 299–344. de Rham, G. (1931), Sur l’Analysis Situs des vari´ et` es a ´ n dimensions, J.

Download PDF sample

Rated 4.53 of 5 – based on 11 votes