- arXiv:math.DG/0408005v131Jul2004 BUNDLE CONSTRUCTIONS OF
- arXiv:math.DG/0412312v27Feb2005 CALIBRATED SUBBUNDLES IN NON-COMPACT
- K-Area, mass and asymptotic geometry March 21, 2002
- Scalar curvature rigidity of certain symmetric spaces Maung Min-Oo
- A LAW OF LARGE NUMBERS FOR THE ZEROES OF HEINE-STIELTJES POLYNOMIALS
- arXiv:math.DG/0509034v12Sep2005 VAFAWITTEN BOUND ON THE COMPLEX PROJECTIVE SPACE
- Deforming Transverse Riemannian Metrics of Miroslav Lovric, Maung Min-Oo, Ernst A. Ruh
- Scalar curvature rigidity of asymptotically hyperbolic spin manifods.
- Multivariate Normal Distributions Parametrized as a Riemannian Symmetric Space
- L2 -Curvature pinching. Min-O, Maung; Ruh, Ernst A.
- Vanishing Theorems and Almost Symmetrie Spaces of Non-Compact Type.
- Smoothing Riemannian Metrics. Bemelmans, Josef; Min-Oo, ; Ruh, Ernst A.
- Vanishing theorems for the basic cohomology of Riemannian foliations.
- The Levy concentration phenomenon for special functions on rank-one symmetric spaces
- Illinois Journal of Mathematics Volume 52, Number 3, Fall 2008, Pages 839865
- CONVERGENCE OF MONTE CARLO ALGORITHMS FOR PRICING AMERICAN OPTIONS
- arXiv:math.DG/0504557v127Apr2005 Cohomogeneity One Special Lagrangian
- arXiv:math.DG/0506340v116Jun2005 Special Lagrangians of cohomogeneity one in the
- ON THE ELECTRODYNAMICS OF MOVING By A. EINSTEIN
- CANADIAN APPLIED MATHEMATICS QUARTERLY
- Assignment #1 Due: Friday, September 23rd, 2011, in class
- Assignment #1 Due: Thursday, September 22nd, 2011 in class
- Practice Questions for Test # 1 1. Find the eigenvalues and the eigenvectors for the Pauli matrices
- What is a vector space? A vector space over a field F is a set V equipped with two binary oper-
- Short answers to assignment #4 1. Suppose that the number of earthquakes per year follows a Poisson distribution with = 3.
- Short answers to Test # 2 # 1. True or False Let X, Y be any two random variables. Then
- Short Answers to Assignment #1 1. Using the angle sum formula for tanh and the approximation tanh(x) x, we have
- Short Answers to Assignment #2 1. A population is divided into three (mutually exclusive and exhaustive) classes according to the
- Short Answers to Assignment #1 1. If three dice are rolled, compute the probability that the sum of the upturned faces equals
- Practice Questions for Test # 2 # 1. Find and classify all the critical (or fixed) points of the system of differential equations (where
- Short answers to assignment #3 1. An urn contains 20 red balls and 30 blue balls.
- Short answers to Assignment #5 1. Let X and Y be uniformly distributed in the interval [0, 1]. Compute the probability that
- Short Answers to Assignment #2 1. Since O is orthogonal, O-1 = OT and B = OT AO, so BT = (OT AO)T = OT AT O = B,
- Short Answers to Assignment #3 (1 -(2xt -t2
- Short answers to assignment #5 1. Solve Laplace's equation
- Short answers to assignment #4 1. Using the definition of Laguerre polynomials by a Rodrigues-type formula
- Short Answers to Test #1 1. If you throw three fair dice what is the probability that
- Short Solutions to Assignment #2 1. Compute the complete Taylor, respectively Laurent series expansion and the region of conver-
- Sort Answers to Assignment #3 1. State and prove Rouche's Theorem.
- Practice Questions for Test # 2 1. Suppose that 40% of all drivers on a highway are speeding. A radar at a speed trap catches 95%
- Short solutions to assignment #1 1. Compute all values of iii