**Title:** A Topologist looks at Sheaf Theory

**Program Website:** Interactions of Homotopy Theory and Algebraic Topology with Physics through Algebra and Geometry

**Speaker:** John Morgan

**Date:** Friday, December 19, 2014

**Time:** 02:45pm – 04:15pm

**Place:** Seminar Room 313, Simons Center

[box, type=”download”]Watch the Video.

[/box]

**Abstract:** Sheaf theory has long been an essential tool in algebraic geometry, algebraic number theory, and complex analysis, but its inspiration comes directly from topology. This lecture course will emphasize these roots, hopefully making sheaf theory seem natural to those with a topological bent. The course will begin by covering the basic topics in sheaf theory describing the objects and the four basic maps of the theory and then will culminate with a discussion of Verdier duality, which generalizes Poincare duality.

This theory will then be applied to define a bordism theory, called duality bordism, whose coefficient group agrees with the Grothendieck group of chain complexes satisfying Poincare duality modulo those that sit as the boundary term in an exact sequence satisfying Lefschetz duality. This bordism group is the Pontryjagin dual homology theory to the cohomology theory associated with surgery theory. This means that a surgery problem is completely classified by evaluating surgery obstructions (signatures, and Arf invariants) of its restrictions to all possible duality bordism elements.

Direct analysis of this bordism theory allows one to identify it at odd primes with real K-theory and at the prime 2 with ordinary homology.

]]>**Title:** A Topologist looks at Sheaf Theory

**Speaker:** John Morgan

**Date:** Friday, November 21, 2014

**Time:** 02:45pm – 04:15pm

**Place:** Seminar Room 313, Simons Center

[box, type=”download”]Watch the Video.

[/box]

**Abstract:** Sheaf theory has long been an essential tool in algebraic geometry, algebraic number theory, and complex analysis, but its inspiration comes directly from topology. This lecture course will emphasize these roots, hopefully making sheaf theory seem natural to those with a topological bent. The course will begin by covering the basic topics in sheaf theory describing the objects and the four basic maps of the theory and then will culminate with a discussion of Verdier duality, which generalizes Poincare duality.

This theory will then be applied to define a bordism theory, called duality bordism, whose coefficient group agrees with the Grothendieck group of chain complexes satisfying Poincare duality modulo those that sit as the boundary term in an exact sequence satisfying Lefschetz duality. This bordism group is the Pontryjagin dual homology theory to the cohomology theory associated with surgery theory. This means that a surgery problem is completely classified by evaluating surgery obstructions (signatures, and Arf invariants) of its restrictions to all possible duality bordism elements.

Direct analysis of this bordism theory allows one to identify it at odd primes with real K-theory and at the prime 2 with ordinary homology.

]]>**Title:** A Topologist looks at Sheaf Theory

**Speaker:** John Morgan

**Date:** Friday, October 31, 2014

**Time:** 02:45pm – 04:15pm

**Place:** Seminar Room 313, Simons Center

[box, type=”download”]Watch the Video.

[/box]

**Abstract:** Sheaf theory has long been an essential tool in algebraic geometry, algebraic number theory, and complex analysis, but its inspiration comes directly from topology. This lecture course will emphasize these roots, hopefully making sheaf theory seem natural to those with a topological bent. The course will begin by covering the basic topics in sheaf theory describing the objects and the four basic maps of the theory and then will culminate with a discussion of Verdier duality, which generalizes Poincare duality.

This theory will then be applied to define a bordism theory, called duality bordism, whose coefficient group agrees with the Grothendieck group of chain complexes satisfying Poincare duality modulo those that sit as the boundary term in an exact sequence satisfying Lefschetz duality. This bordism group is the Pontryjagin dual homology theory to the cohomology theory associated with surgery theory. This means that a surgery problem is completely classified by evaluating surgery obstructions (signatures, and Arf invariants) of its restrictions to all possible duality bordism elements.

Direct analysis of this bordism theory allows one to identify it at odd primes with real K-theory and at the prime 2 with ordinary homology.

]]>**Title:** A Topologist looks at Sheaf Theory

**Speaker:** John Morgan

**Date:** Friday, October 24, 2014

**Time:** 02:45pm – 04:15pm

**Place:** Seminar Room 313, Simons Center

[box, type=”download”]Watch the Video.

[/box]

**Abstract:** Sheaf theory has long been an essential tool in algebraic geometry, algebraic number theory, and complex analysis, but its inspiration comes directly from topology. This lecture course will emphasize these roots, hopefully making sheaf theory seem natural to those with a topological bent. The course will begin by covering the basic topics in sheaf theory describing the objects and the four basic maps of the theory and then will culminate with a discussion of Verdier duality, which generalizes Poincare duality.

**Title:** A Topologist looks at Sheaf Theory

**Speaker:** John Morgan

**Date:** Friday, October 17, 2014

**Time:** 02:45pm – 04:15pm

**Place:** Seminar Room 313, Simons Center

[box, type=”download”]Watch the Video.

[/box]

**Abstract:** Sheaf theory has long been an essential tool in algebraic geometry, algebraic number theory, and complex analysis, but its inspiration comes directly from topology. This lecture course will emphasize these roots, hopefully making sheaf theory seem natural to those with a topological bent. The course will begin by covering the basic topics in sheaf theory describing the objects and the four basic maps of the theory and then will culminate with a discussion of Verdier duality, which generalizes Poincare duality.