<--- Back to Details
First PageDocument Content
Multivariable calculus / Differential geometry / Spectral theory / Victor Isakov / Differential equation / Partial differential equation / Manifold / Ordinary differential equation / Riemannian geometry / Mathematical analysis / Calculus / Mathematics
Date: 2001-07-26 11:29:56
Multivariable calculus
Differential geometry
Spectral theory
Victor Isakov
Differential equation
Partial differential equation
Manifold
Ordinary differential equation
Riemannian geometry
Mathematical analysis
Calculus
Mathematics

I NSTITUTE FOR M ATHEMATICS

Add to Reading List

Source URL: www.ima.umn.edu

Download Document from Source Website

File Size: 120,16 KB

Share Document on Facebook

Similar Documents

Inverse problems / Medical imaging / Electrical impedance tomography / Electrodiagnosis / Tomography / Electrical resistivity and conductivity / Inverse scattering problem / LippmannSchwinger equation / Victor Isakov / Electrical resistivity tomography

IEEE TRANSACTIONS ON MEDICAL IMAGING, VOL. 21, NO. 6, JUNEA Direct Reconstruction Algorithm for Electrical Impedance Tomography

DocID: 1pCMG - View Document

Gunther Uhlmann / Inverse problem / Inverse scattering problem / Victor Isakov / Lassi Pivrinta

CURRICULUM VITAE Gunther Uhlmann Education: Licenciado en Matem´

DocID: 1ooMR - View Document

Differential calculus / Ordinary differential equation / Differential equation / Nonlinear system / Partial differential equation / Boundary value problem / Alexander Dmitrievich Bruno / Victor Isakov / Calculus / Mathematical analysis / Mathematics

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

DocID: nPo0 - View Document

Multivariable calculus / Differential geometry / Spectral theory / Victor Isakov / Differential equation / Partial differential equation / Manifold / Ordinary differential equation / Riemannian geometry / Mathematical analysis / Calculus / Mathematics

I NSTITUTE FOR M ATHEMATICS

DocID: 5aOY - View Document