- Problem Set #16 Due: Thursday, February 3
- LINEAR DETERMINANTAL EQUATIONS FOR ALL PROJECTIVE SCHEMES JESSICA SIDMAN AND GREGORY G. SMITH
- Problem Set #2 Due: 21 September 2007
- Problem Set #10 Due: 25 March 2011
- Problem Set #22 Due: Thursday, March 24
- Computational Commutative Algebra Math413/813
- HILBERT FUNCTIONS OF VERONESE ALGEBRAS H E A CAMPBELL, A V GERAMITA, I P HUGHES,
- Problem Set #4 Due: 4 February 2011
- Problem Set #4 Due: Friday, February 2, 2007
- Problem Set #8 Due: 31 October 2008
- Checklist for Project Paper MATH 401/801
- Problem Set #3 Due: 28 January 2011
- Problem Set #8 Due: 11 March 2011
- Problem Set #1 Due: 14 January 2011
- A Taste of Enumerative Geometry Gregory G. Smith
- Problem Set #8 Due: 5 November 2010
- Problem Set #12 Due: 28 November 2008
- Core Algebra I (MATH 893 : 2008)
- Linear Algebra (MATH 110 : 2007)
- JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
- Queen's Algebraic Geometry --Seminar --
- J. reine angew. Math. 571 (2004), 179--212 Journal fur die reine und angewandte Mathematik
- Advanced Calculus (MATH 280: 2010)
- Problem Set #4 Due: 3 October 2008
- Macaulay 2 Worksheet Macaulay 2 is a software system devoted to supporting research in algebraic geometry and com-
- doi:10.1006/jsco.1999.0399 Available online at http://www.idealibrary.com on
- Problem Set #7 Due: 24 October 2008
- Vector Analysis (MATH 227: 2008)
- Problem Set #4 Due: 3 October 2008
- Problem Set #12 Due: 2 December 2010
- Checklist for Project Presentation MATH 413/813
- Review Solutions (Winter) The April exam will emphasize material from the second semester. You are encouraged to
- Problem Set #10 Due: Thursday, November 18
- Problem Set #6 Due: 18 February 2011
- Problem Set #8 Due: 31 October 2008
- Queen's Algebraic Geometry --Seminar --
- Problem Set #3 Due: 26 September 2008
- Journal of Combinatorial Theory, Series A 118 (2011) 396402 Contents lists available at ScienceDirect
- PROJECTIVE TORIC VARIETIES AS FINE MODULI SPACES OF QUIVER REPRESENTATIONS
- Compositio Math. 142 (2006) 14991506 doi:10.1112/S0010437X0600251X
- J. ALGEBRAIC GEOMETRY 14 (2005) 137164
- Monomial Ideals Serkan Hosten and Gregory G. Smith
- Journal of Algebra 240, 744770 (2001) doi:10.1006/jabr.2001.8731, available online at http://www.idealibrary.com on
- Queen's Algebraic Geometry --Seminar --
- Queen's Algebraic Geometry --Seminar --
- Problem Set #2 Due: 21 January 2011
- Problem Set #3 Due: 28 January 2011
- Problem Set #9 Due: 18 March 2011
- Problem Set #12 Due: 8 April 2011
- Graph Theory Math401/801
- Problem Set #5 Due: 11 February 2011
- L'Enseignement Mathmatique Halmos, P. R.
- Imagine Math Day Page April , Instructor's Guide to the Graph Complexity Project
- Problem Set #11 Due: 21 November 2007
- Problem Set #12 Due: 28 November 2008
- "Take-Home" Exam Due: 11 December 2008
- Problem Set #15 Due: 25 January 2008
- Linear Algebra (MATH 312 : 2007)
- Problem Set #7 Due: Friday, March 2, 2007
- MATH 120 200405 Differential and Integral Calculus
- Tutorial #11 1. Let f be the function graphed below. Notice that the graph of f consists of two
- Problem Set #17 Due: Thursday, February 10
- Teaching the Geometry of Schemes Gregory G. Smith and Bernd Sturmfels
- Problem Set #1 Due: 14 January 2011
- Problem Set #13 Due: Thursday, January 13
- Review (Fall) The December exam is comprehensive test (although the material from the last third
- Problem Set #10 Due: 14 November 2007
- Problem Set #8 Due: 11 March 2011
- Problem Set #7 Due: 4 March 2011
- Queen's Algebraic Geometry --Seminar --
- This article appeared in a journal published by Elsevier. The attached copy is furnished to the author for internal non-commercial research
- Problem Set #11 Due: 1 April 2011
- Journal of Pure and Applied Algebra 165 (2001) 291306 www.elsevier.com/locate/jpaa
- Queen's Algebraic Geometry --Seminar --
- Problem Set #5 Due: 11 February 2011
- Problem Set #1 Due: 12 September 2007
- Queen's Algebraic Geometry --Seminar --
- Queen's Algebraic Geometry --Seminar --
- Checklist for Project Paper MATH 401/801
- Queen's Algebraic Geometry --Seminar --
- Problem Set #2 Due: Friday, 23 September 2011
- Solutions #11 1. For the function f(x) :=
- Solutions #4 1. Compute the following limits.
- Solutions #12 1. For the graph below, prove it is nonplanar or provide a planar embedding.
- Solutions #12 1. The graph of f(t) appears below.
- Solutions #9 1. Prove that a tree T has a perfect matching if and only if o(T -v) = 1 for every v V(T).
- Solutions #1 1. There is a useful way of describing the points of the closed interval [a,b]. As usual, we assume
- Solutions #9 1. For some positive constant C, the reaction R of the body, measured as a change in temperature,
- Solutions #5 1. Let G be the Petersen graph. Show that all tree obtained from a breadth-first search of G are
- Queen's Algebraic Geometry --Seminar --
- Solutions #10 1. For positive integers m and n, the Kneser graph KGn,m has one vertex for each m-subset of
- Solutions #8 1. Boyle's Law states that, for a fixed quantity of gas at constant temperature, the pressure P and
- Solutions #10 1. Evaluate the following limits
- Solutions #11 1. (a) Calculate the chromatic polynomial of K1,3 by using the recursion
- Solutions #6 1. If E(v) is the fuel efficiency, measured in kilometres per litre kmL-1
- Solutions #5 1. Assuming that lim
- LOG-CONCAVITY OF ASYMPTOTIC MULTIGRADED HILBERT SERIES ADAM MCCABE AND GREGORY G. SMITH
- Solutions #7 1. Construct counterexamples for the following statements.
- Solutions #3 1. A function f : R R is even if f(x) = f(-x) and odd if f(x) = -f(-x). For example, the
- Solutions #2 1. Find all x R for which
- Solutions #19 1. Reparametrize the curve : R R2 defined by (t) = (t3 +1,t2 -1) with respect to arc length
- Solutions #3 1. Let C(X) be the field of rational functions in one indeterminate and let G be the subgroup of
- Problem Set #2 Due: Thursday, 26 January 2012
- Solutions #17 1. If we think of an electron as a particle, the function P(r) := 1 -(2r2 + 2r + 1)e-2r is the
- Solutions #5 1. Let C be a category which has fibre products. Show that f HomC(X,Y) is a monomorphism if
- Queen's Algebraic Geometry --Seminar --
- Queen's Algebraic Geometry --Seminar --
- Solutions #14 1. (a) Find sin()cos() d.
- Solutions #16 1. Decide which of the following improper integrals converge.
- Solutions #18 1. The catenary y = 1
- Solutions #4 1. A poset is a set P with a binary relation P which is reflexive, transitive and antisymmetric.
- Solutions #2 1. Let x be a complex root of X6 +X3 +1. Find all homomorphisms : Q(x) C.
- Solutions #13 1. Suppose that h is a continuous function, f and g are differentiable functions, and
- Solutions #15 1. Let f be continuous such that
- Solutions #1 1. (a) Determine the degrees of the following extensions by finding basis for them: Q[
- Problem Set #4 Due: Thursday, 9 February 2012
- Problem Set #3 Due: Thursday, 2 February 2012
- Solutions #20 1. Compute the limit of the sequence (an)
