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Shafrir, Itai - Department of Mathematics, Technion, Israel Institute of Technology
A nonlocal problem arising in the study of magneto-elastic interactions
ON THE MINIMIZERS OF A GINZBURG-LANDAU TYPE ENERGY WHEN THE BOUNDARY CONDITION HAS ZEROS
ON NEMATICS STABILIZED BY A LARGE EXTERNAL FIELD NELLY ANDR '
An eigenvalue problem related to Hardy's L p inequality
x 2 dx ####### ####### #### :##### #### #### ## #### .##### #### x ## ln(1 + x 2 ) x ff ###### ff ? 0 #### ### ##### :#####
On a class of singular perturbation problems Itai Shafrir
Moser-Trudinger type inequalities for systems in two Itai Shafrir and Gershon Wolansky
Radially symmetric minimizers for a p-Ginzburg Landau type energy in R2
On a minimization problem with a mass constraint involving a potential vanishing on two curves
The logarithmic HLS inequality for systems on compact manifolds
On the distance between homotopy classes of -valued maps in multiply connected domains
On a vector-valued singular perturbation problem on Nelly Andre
EXTREMAL FUNCTIONS FOR HARDY'S INEQUALITY WITH WEIGHT HAIM BREZIS (1);(2) , MOSHE MARCUS (3) AND ITAI SHAFRIR (3)
ON A DISCRETE VARIATIONAL PROBLEM INVOLVING INTERACTING PARTICLES #
Moser-Trudinger and logarithmic HLS inequalities for systems Itai Shafrir and Gershon Wolansky
UNIQUENESS OF POSITIVE SOLUTIONS FOR SINGULAR PROBLEMS INVOLVING THE p-LAPLACIAN
A Weighted Erdos-Mordell Inequality for Polygons Shay Gueron and Itai Shafrir
############ ######### .1 (3 cos 3 x sin 2 x + 5 sin 4 x \Gamma 7 cos 2 x sin x) dx ### ######### ### #####
A Comparison Principle for the p-Laplacian Arkady Poliakovsky and Itai Shafrir
ON A SINGULAR PERTURBATION PROBLEM INVOLVING THE DISTANCE TO A CURVE
ASYMPTOTIC BEHAVIOUR OF MINIMIZING SEQUENCES FOR HARDY'S INEQUALITY
MINIMIZATION OF A GINZBURGLANDAU TYPE FUNCTIONAL WITH BOUNDARY CONDITION
MINIMIZATION OF A GINZBURG-LANDAU TYPE ENERGY WITH POTENTIAL HAVING A ZERO OF INFINITE ORDER
On a singular perturbation problem involving a \circular-well" potential
