´ THE CALDERON PROBLEM WITH PARTIAL DATA ON MANIFOLDS AND APPLICATIONS CARLOS KENIG AND MIKKO SALO Abstract. We consider Calder´on’s inverse problem with partial

Source URL: www.rni.helsinki.fi

• Partial differential equations
• Torsten Carleman
• Sheaf
• Dirichlet eigenvalue
• Geodesic
• Smooth manifolds
• Mathematical analysis
• Mathematics
• Topology

THE DIRICHLET PROBLEM FOR THE VIBRATING STRING EQUATION D. G. BOURGIN AND R. DUFFIN This note considers the Dirichlet and Neumann type boundary value problem for the simple vibrating string equation. The detailed

Source URL: www.ams.org

• Joseph Fourier
• Integral transforms
• Fourier analysis
• Ordinary differential equations
• Fourier series
• Fourier transform
• Sturm–Liouville theory
• Heat equation
• Mathematical analysis
• Calculus
• Mathematics

Analytic Number Theory Homework #3 (due Tuesday, March 25, 2014) Problem 1: By the functional equation for s − 2s

Source URL: www.math.columbia.edu

• Dirichlet character
• Functional equation
• Riemann zeta function
• Conjectures
• Spectral theory of ordinary differential equations
• Dirichlet L-function
• Mathematical analysis
• Mathematics
• Analytic number theory

Analytic Number Theory Homework #4 (due Thursday, May 8, 2014) Problem 1: Let χ be a Dirichlet character (mod q) for some integer q > 1. Prove that L(1, χ)  log q. Problem 2: Fix a prime p. Show that

Source URL: www.math.columbia.edu

• Number theory
• Analytic number theory
• Modular forms
• Moduli theory
• Dirichlet character
• Coprime
• Root of unity
• Modular curve
• Mathematics
• Abstract algebra
• Mathematical analysis

The Dirichlet problem for the prescribed Ricci curvature equation Artem Pulemotov We will discuss the following question: is it possible to recover the shape of a manifold M from its Ricci curvature? To answer this quest

Source URL: math.caltech.edu

PDF Document

Source URL: www.ias.ac.in

• Potential theory
• Harmonic functions
• Poisson kernel
• Dirichlet problem
• Spectral theory
• Differential equation
• Spectral theory of ordinary differential equations
• Itō diffusion
• Mathematical analysis
• Calculus
• Fourier analysis

Proc. Indian Acad. Sci. (Math. Sci.) Vol. 124, No. 2, May 2014, pp. 175–178. c Indian Academy of Sciences  Dirichlet problem on the upper half space DEWU YANG1 and YUDONG REN2

Source URL: www.ias.ac.in

• Potential theory
• Harmonic functions
• Operator theory
• Poisson kernel
• Dirichlet problem
• Differential equation
• Spectral theory of ordinary differential equations
• Itō diffusion
• Mathematical analysis
• Calculus
• Fourier analysis

QUESTIONNAIRE (*) – mandatory fields * Organization name Organisation acronym * Organization Activity Type (RES - Research, HE University, SME - Small and

Source URL: www.increast.eu

• Partial differential equations
• Multivariable calculus
• Integral
• Dirichlet problem
• Czesław Olech
• Numerical continuation
• Mathematical analysis
• Mathematics
• Calculus

PROBLEM SOLVING MASTERCLASS WEEK[removed]A follow-up to Paul’s problem from last week (Putnam 1982B6): “Let A(a, b, c) be the p area of a triangle with sides a, b, c. Let f (a, b, c) = A(a, b, c). Prove that for any tw

Source URL: math.stanford.edu

• Trigonometry
• Number theory
• Dirichlet eta function
• Mathematics
• Integer sequences
• Combinatorics

ASYMPTOTIC SOLUTIONS OF THE DIRICHLET PROBLEM FOR THE HEAT EQUATION AT A CHARACTERISTIC POINT A. ANTONIOUK, O. KISELEV, V. A. STEPANENKO, AND N. TARKHANOV Abstract. The Dirichlet problem for the heat equation in a bounde

Source URL: www.math.uni-potsdam.de

• Ordinary differential equations
• Abstract algebra
• Linear algebra
• Partial differential equations
• Operator theory
• Heat equation
• Sturm–Liouville theory
• Vector space
• Separation of variables
• Algebra
• Mathematics
• Calculus