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Document Library: Spruck, J.
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[1.5] |
Eydeland, A. & Spruck, J.
The inverse power method for semilinear elliptic equations
| [1.6] |
Spruck, J.
The elliptic sinh-Gordon equation and the construction of toroidal soap bubbles
| [1.18] |
Caffarelli, L. A., Gidas, B. & Spruck, J.
Asymptotic symmetry and local behavior of semilinear elliptic equations with critical Sobolev growth
| [1.29] |
Eydeland, A., Spruck, J. & Turkington, B.
Multi-constrained variational problems of nonlinear eigenvalue type: new formulations and algorithms
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dvi
abstract
| [1.37] |
Evans, L. C. & Spruck, J.
Motion of level sets by mean curvature I
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dvi
abstract
| [1.38] |
Evans, L. C. & Spruck, J.
Motion of level sets by mean curvature II
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dvi
abstract
| [1.39] |
Caffarelli, L. A. & Spruck, J.
Variational problems with critical Sobolev growth and positive Dirichlet data
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dvi
abstract
| [2.3] |
Evans, L. C. & Spruck, J.
Motion of level sets by mean curvature III
| [2.6] |
Turkington, B., Eydeland, A., Lifschitz, A. & Spruck, J.
Multiconstrained variational problems in magnetohydrodynamics I: equilibrium
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dvi
| [2.7] |
Lifschitz, A., Turkington, B., Spruck, J. & Eydeland, A.
Multiconstrained variational problems in magnetohydrodynamics II: slow evolution
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dvi
| [2.8] |
Hoffman, D., Rosenberg, H. & Spruck, J.
Boundary value problems for surfaces of constant gauss curvature
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dvi
abstract
| [2.9] |
Spruck, J. & Yang, Y.
On multivortices in the electroweak theory I: existence of periodic solutions
| [2.10] |
Spruck, J. & Yang, Y.
On multivortices in the electroweak theory II: existence of Bogomol'nyi solutions in R2
postscript
pdf
dvi
abstract
| [2.13] |
Guan, B. & Spruck, J.
Interior gradient estimates for solutions of prescribed curvature equations of parabolic type
| [2.20] |
Spruck, J. & Yang, Y.
Topological solutions in the self-dual Chern-Simons theory
| [2.21] |
Guan, B. & Spruck, J.
Interior gradient estimates for solutions of prescribed curvature equations of parabolic type
| [2.33] |
Guan, B. & Spruck, J.
Boundary value problems on $S^n$ for surfaces of constant gauss curvature
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© GANG 2001
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