- PROBLEM SET 7 due Wednesday, November 4
- PROBLEM SET 2 Due Wednesday 2/10
- Severi varieties and the moduli space of curves A dissertation presented
- PROBLEM SET 11 Problem 1 (AM, Ex.1.22). Let R be any ring. Show that the following statements
- SCHEMES: A BRIEF DICTIONARY MAKSYM FEDORCHUK
- PROBLEM SET 1 Due Wednesday 9/16
- Alternate Compactifications of Moduli Spaces of Curves Maksym Fedorchuk and David Ishii Smyth
- PROBLEM SET 1 Due Wednesday 2/3
- PROBLEM SET 5 due Wednesday, October 21
- PROBLEM SET 8 SOLUTIONS Assigned problems
- PROBLEM SET 3 SOLUTIONS ATANAS ATANASOV AND MAKSYM FEDORCHUK
- Modern Algebra I Math W4041, Spring 2011
- Cyclic covering morphisms on M0,n Maksym Fedorchuk
- Algebraic Number Theory Math W4043, Fall 2011
- PROBLEM SET 8 Due Monday 5/3
- Math W4041 Problem Set 1 due Thursday, January 27, 2011
- PROBLEM SET 10 due Monday, December 14
- PROBLEM SET 6 due Wednesday, October 28
- Math V2020 Problem Set 1 due Thursday, January 27, 2011
- PROBLEM SET 3 Due Wednesday 9/30
- PROBLEM SET 8 Due Monday 11/16
- PROBLEM SET 4 Due Wednesday 10/07
- PROBLEM SET 3 Due Wednesday 2/24
- Math W4041 Problem Set 2 due Thursday, February 3, 2011
- PROBLEM SET 5 SOLUTIONS Exercise 1 (Sheaf of differentials on a nodal curve). Let B = A[x, y]/(xy).
- Honors Linear Algebra Math V2020, Spring 2011
- PROBLEM SET 2 Due Wednesday 9/23
- PROBLEM SET 7 Due Wednesday 4/21
- PROBLEM SET 4 Due Wednesday 3/101
- COMMUTATIVE ALGEBRA AND ALGEBRAIC GEOMETRY 1. Lecture 1: Rings and Ideals 1
- SINGULARITIES WITH Gm-ACTION AND THE LOG MINIMAL MODEL PROGRAM FOR Mg
- PROBLEM SET 6 Due Wednesday 4/14
- PROBLEM SET 9 Due Monday 11/23
- Math V2020 Problem Set 2 due Thursday, February 3, 2011
- MODULI OF WEIGHTED POINTED STABLE CURVES AND LOG CANONICAL MODELS OF Mg,n
- Stacks Project Version 75c8ce8, compiled on Sep 16, 2011.
- PROBLEM SET 8 Due Monday 5/3
- PROBLEM SET 6 SOLUTIONS Exercise 1 (Smooth vs. regular in positive characteristic, Hartshorne, Ex.III.10.1).
- PROBLEM SET 5 Due Wednesday 3/31
- FINITE HILBERT STABILITY OF CANONICAL CURVES, II. THE EVEN-GENUS CASE
- STABILITY OF 2nd HILBERT POINTS OF CANONICAL MAKSYM FEDORCHUK AND DAVID JENSEN
- Curriculum Vit Maksym Fedorchuk
- TYPE A LEVEL ONE CONFORMAL BLOCKS DIVISORS MAKSYM FEDORCHUK
- MODULI SPACES OF HYPERELLIPTIC CURVES WITH A AND D SINGULARITIES
- FINITE HILBERT STABILITY OF (BI)CANONICAL CURVES JAROD ALPER, MAKSYM FEDORCHUK, AND DAVID ISHII SMYTH*
- lecture notes by Maksym Fedorchuk 1 Algebraic number fields and their rings of integers are the main objects of
- lecture notes by Maksym Fedorchuk 5 2. Week 2: Modules over PID. Integrality.
- Alternate Compactifications of Moduli Spaces of Curves Maksym Fedorchuk and David Ishii Smyth
- THE FINAL LOG CANONICAL MODEL OF THE MODULI SPACE OF STABLE CURVES OF GENUS FOUR
- FINITE HILBERT STABILITY OF (BI)CANONICAL CURVES JAROD ALPER, MAKSYM FEDORCHUK, AND DAVID ISHII SMYTH*
- 1. (10 points) Let P be the point in the plane given in rectangular coordinates by (-6, -6 Find the polar coordinates (r, ) of P (express in radians).
- Calculus III Midterm 1 Monday, February 22, 2010 Instructor: Maksym Fedorchuk
- Calculus III, Practice Midterm Instructor: Maksym Fedorchuk
- CALCULUS III: MIDTERM 1 PREPARATION Instructor: Maksym Fedorchuk
- Curriculum Vit Maksym Fedorchuk
- CALCULUS III PRACTICE MIDTERM 1 SOLUTIONS SOLUTIONS BY ZHENGYU XIANG
- Calculus III Practice Midterm 1 Instructor: Maksym Fedorchuk
- 1. (10 points) Let P be the point in the plane given in rectangular coordinates by (-6, -6 Find the polar coordinates (r, ) of P (express in radians).
- CALCULUS III: MIDTERM 2 PREPARATION Instructor: Maksym Fedorchuk
