- MATH 295 -PROBLEMS FOR FINAL The final will be two hours long. It will have six questions. Four of these will be taken
- SPARSE SYSTEMS OF PARAMETERS FOR DETERMINANTAL VARIETIES
- Undergraduate Representation Theory: Exercise Set 9 Professor Karen Smith
- Undergraduate Representation Theory: Exercise Set 6 Professor Karen Smith
- Math 295: Practice with concepts 1. Suppose is a commutative binary operation on a set S and that there exists an element
- Undergraduate Representation Theory: Exercise Set 2 Professor Karen Smith
- Fregularity deforms for QGorenstein rings of Characteristic Zero by Karen E. Smith
- Math 296. Homework 8 (due March 18) Book Problems: page 66: # 2, 3, 7; page 73: #8, 9, 12, 13; page 95: # 1, 5.
- Math 412 First Exam Part I: True or False (Total 20 points: 2 points for correct answer, -1 for incorrect).
- Professor Smith Math 295 Lecture Notes by John Holler
- Math 296. Homework 5 (due Feb 18) Book Problems
- "PROFESSOR" ANDREY MISHCHENKO'S MATH 296 LECTURE NOTES JANUARY 2428, 2011
- Math 296 Worksheet: Cosets and Quotient Groups Fix a group G and let H be a subgroup.
- Undergraduate Representation Theory: Exercise Set 10 Professor Karen Smith
- Math 631: Problem Set 4 Due Friday October 3 , 2008
- FUJITA'S FREENESS CONJECTURE IN TERMS OF LOCAL COHOMOLOGY
- MATH 632: ALGEBRAIC GEOMETRY II Prof. K. Smith 1
- TIGHT CLOSURE AND THE KODAIRA VANISHING THEOREM Craig Huneke and Karen E. Smith
- Math 296. Homework 1 (Due January 14, 2011) The Cantor Problem Set: "...the most astonishing product of mathematical thought, the most beautiful realization
- Math 295. Homework 1 (Due September 17) (1) Let S be a set. Recall that P(S) denotes the power set of S, that is, the set of all subsets of S. Define
- Math 631: Problem Set 5 Due Friday October 10 , 2008
- Professor Smith Math 295 Lecture Notes by John Holler
- Undergraduate Representation Theory: Exercise Set 5 Professor Karen Smith
- THE HODGE CONJECTURE Karen Smith
- Math 295. Homework 3 (Due October 1) (1) Let S be a set. A function f : S S is called an involution provided that f f (s) = s for all s S.
- Undergraduate Representation Theory: Exercise Set 1 Karen Smith
- PROFESSOR SMITH MATH 295 LECTURE NOTES BY JOHN HOLLER
- RATIONAL AND NONRATIONAL ALGEBRAIC VARIETIES: LECTURES OF J '
- VANISHING, SINGULARITIES AND EFFECTIVE BOUNDS VIA PRIME CHARACTERISTIC LOCAL ALGEBRA
- MATH 632: ALGEBRAIC GEOMETRY II: Schemes Assoc. Professor Karen E. Smith
- Math 412 Section 2 REVIEW: TRUE OR FALSE
- MATH 593: Tenth Homework Assignment: More on Rational and Jordan Canonical Form
- ERRATUM TO VANISHING, SINGULARITIES AND EFFECTIVE BOUNDS VIA PRIME CHARACTERISTIC LOCAL ALGEBRA
- THE STRONG TEST IDEAL Nobuo Hara y and Karen E. Smith \Lambda
- Math 631: Algebraic Geometry: Homework Set 1. Due Friday September 12, 2008
- Math 295 Daily Update Here I will list the topics discussed in class each day.
- MATH 295 -PROBLEMS FOR MIDTERM ONE When doing the problems, you may use your notes and your book, but nothing else. This means: when
- Math 295. Homework 2 (Due September 24) (1) Suppose that A and B are nonempty subsets of R. Suppose that for all a A and for all b B we
- Math 631: Algebraic Geometry: Homework Set 2. Due Friday September 19, 2008
- BEHAVIOR OF TEST IDEALS UNDER SMOOTH AND ' HOMOMORPHISMS
- Professor Smith Math 295 Lecture Notes by John Holler
- TIGHT CLOSURE IN GRADED RINGS Karen E. Smith \Lambda
- BASES FOR INFINITE DIMENSIONAL VECTOR SPACES MATH 513 LINEAR ALGEBRA SUPPLEMENT
- Undergraduate Representation Theory: Exercise Set 12 Professor Karen Smith
- Math 295: Logic Practice 1. Express each of the following statements in a formal mathematical way by using "if,
- Math 296. Homework 3 (due Jan 28) 1. Equivalence Classes. Let R be an equivalence relation on a set X. For each x X, consider the subset
- Math 296. Homework 10 Due: Friday April 8.
- Math 295. Homework 9 (Due December 3) (1) Suppose a < b. Let f : [a, b] R be a bounded function. Suppose that f is integrable.
- Undergraduate Representation Theory: Exercise Set 4 Professor Karen Smith
- Undergraduate Representation Theory: Exercise Set 3 Professor Karen Smith
- Summary of Main Facts on Chern Classes Typed up by Uriel Scott from notes of K. Smith
- "Professor" Andrey Mishchenko Math 296 Lecture Notes Nick Wasylyshyn
- Math 296 Worksheet: Groups and their representations Part 1. Fix a line L in Euclidean three-space E, and consider the rigid motion R of E consisting
- "Professor" Andrey Mishenko Math 296 Lecture Notes Nick Wasylyshyn
- "Professor Andrey" Mishchenko Math 296 Lecture Notes Nick Wasylyshyn
- Math 296. Homework 2 (Due January 21, 2011) 1. Prove or disprove: If
- Math 296. Homework 4 (due Feb 11) Book Problems (Hoffman-Kunze, second edition).
- Math 296. Homework 6 (due Feb 25) Book Problems: 1.4: #3, 1.5: #3, 4, 5, 6, 7, 1.6: #5, 6, 9, 2.2 #4, 9
- Math 296. Problems for Exam II Exam I will be in class on Friday March 25. You will be asked to solve 4 of the following 12 problems. In
- Department of Mathematics Syllabus for Math 593: Algebra I.
- Math 593 Exam II Fall 2005 1. (18 points) Prove or disprove the following three statements, where R is a commutative ring.
- Professor Smith Math 295 Lecture Notes by John Holler
- Professor Smith Math 295 Lecture Notes by John Holler
- PROFESSOR SMITH'S MATH 295 LECTURE NOTES BY JOHN HOLLER
- PROFESSOR SMITH MATH 295 LECTURE NOTES BY JOHN HOLLER
- PROFESSOR SMITH MATH 295 LECTURE NOTES BY JOHN HOLLER
- Math 295. Homework 4 (Due October 8) (1) Countable Sets.
- Math 295. Homework 5 (Due October 22) The purpose of this homework set is to prove the fundamental theorem of arithmetic
- Math 295. Homework 6 (Due October 29) (1) Suppose A is a set. If f : A A and g: A A are involutions, is f g an involution?
- Math 295. Homework 8 (Due November 12) (1) Suppose f : X R is a function, where X is a topological space. We say that f is locally constant
- MATH 295 -PROBLEMS FOR MIDTERM TWO When doing the problems, you may use your notes, your book, and all notes and handouts
- Math 295. Homework 10 (Due December 10) (1) The Cauchy-Schwartz inequality. Suppose that f and g are integrable functions on [a, b]. Show that
- EXAM II RESULTS Fall Term 2010
- Undergraduate Representation Theory: Exercise Set 8 Professor Karen Smith
- Undergraduate Representation Theory: Exercise Set 11 Professor Karen Smith
- Math 631: Problem Set 6 Due Friday October 17 , 2008
- Math 631: Problem Set 7 Due Wednesday October 29, 2008
- Math 631: Problem Set 9 Due Friday November 14, 2008
- Math 631: Problem Set 11 Due Monday December 8, 2008
- MATH 593: Eleventh Homework Assignment: Bilinear Forms
- MATH 593: Twelth and Final Homework Assignment: Symmetric and Hermitian Forms
- Syllabus for Math 295 Fall Term 2010
- Math 296. Homework 7 (due March 11) Book Problems: 2.3 # 1, 2, 3, 4, 7, 8, 9, 14 3.1 # 4, 5, 7
- EXAM I RESULTS Fall Term 2010
- Math 296. Homework 11 Due: Friday April 15.
- Math 631: Problem Set 8 Due Wednesday November 5, 2008
- Math 631: Problem Set 10 Due Friday November 21, 2008
- A TIGHT CLOSURE APPROACH TO ARITHMETIC MACAULAYFICATION
- GLOBALLY FREGULAR VARIETIES: APPPLICATIONS TO VANISHING THEOREMS
- Math 296. Homework 9 Due: Friday April 1.
- Math 412 Section 2 Review of Chapter 7 (mostly)
- Math 631: Problem Set 3 Due Friday September 26, 2008
- A Note on Proofs Joe Rabinoff
- Math 412 Second Exam Part I: True or False (Total 20 points: 2 points for correct answer, -1 for incorrect).
- GROUPS AND THEIR REPRESENTATIONS KAREN E. SMITH
- Exercises for Helsinki Algebraic Geometry Mini-Course Professor Karen E Smith
- THE DMODULE STRUCTURE OF FSPLIT RINGS K. E. Smith \Lambda
- "Professor" Andrey Mishchenko Math 296 Lecture Notes Nick Wasylyshyn
- Communications in Algebra , 34: 15911598, 2006
- Professor Smith Math 295 Lecture Notes by John Holler
- A TIGHT CLOSURE PROOF OF FUJITA'S FREENESS CONJECTURE FOR VERY AMPLE LINE BUNDLES
- THE MULTIPLIER IDEAL IS A UNIVERSAL TEST IDEAL Karen E. Smith \Lambda
- Math 296. Problems for Exam I Exam I will be in class on Friday February 4. You will be asked to solve 4 of the following 12 problems. In
- Undergraduate Representation Theory: Exercise Set 7 Professor Karen Smith
- Math 295. Homework 7 (Due November 5) (1) Topological Space structures on finite sets.
- Math 296 Daily Update Here I will list the topics discussed in class each day.
- Syllabus for Math 296 Winter Term 2011
- Fall Term 2011 Classes MWF 23 PM, East Hall 1372
- Math 512 Daily Update Here I will list the topics discussed in class each day.
- Math 512. Exam 2 Results The exam was graded out of 100 points. The median was 77.5, with a range of 21--99.
- Math 512. Cayley Graphs Professor Karen E. Smith
- Math 512: The Automorphism Group of the Quaternion Professor Karen E. Smith
- Dihedral Groups Professor Karen E Smith
- MATH 512 -Exam 2 November 18, 2011
- The Group of rigid motions of Rn Professor Karen E Smith
- Math 512. Exam 1 Results The exam was graded out of 100 points. The median was 77, with a range of 3597.
- The Group of symmetries of a square There are eight symmetries of a square
- Math 512: Orbits and Counting Professor Karen E. Smith
- Math 513. Homework 5 Professor Karen E. Smith
- Math 513. Homework Set 1 Professor Karen E. Smith
- Math 513. Class Worksheet on Jordan Canonical Form. Professor Karen E. Smith
- Math 513. Homework Set 4 Professor Karen E. Smith
- Math 513. Homework Set 2 Professor Karen E. Smith
- Math 513. Homework 6 Professor Karen E. Smith
- Math 513. Exam I Professor Karen E. Smith
- Math 513. Class Worksheet on the proof of Rational Canonical and Jordan Canonical Form.
- Math 513. Homework Set 3 Professor Karen E. Smith
- Math 513. Class Worksheet on Homomorphisms of Free Modules. Professor Karen E. Smith
- MATH 513 Daily Update Professor Karen E Smith
- Math 513. Homework Set 7 Professor Karen E. Smith
