Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Lewicka, Marta - School of Mathematics, University of Minnesota
METRIC-INDUCED MORPHOGENESIS AND NON-EUCLIDEAN ELASTICITY: SCALING LAWS AND THIN FILM MODELS
BRANCHES OF FORCED OSCILLATIONS IN DEGENERATE SYSTEMS OF SECOND ORDER ODEs
WELL POSEDNESS OF SYSTEMS OF CONSERVATION LAWS NEAR SOLUTIONS CONTAINING TWO
SPECTRAL STABILITY CONDITIONS FOR SHOCK WAVE MARTA LEWICKA AND KEVIN ZUMBRUN
THE UNIFORM KORN -POINCARE INEQUALITY IN THIN DOMAINS
THE MATCHING PROPERTY OF INFINITESIMAL ISOMETRIES ON ELLIPTIC SURFACES
SCALING LAWS FOR NON-EUCLIDEAN PLATES AND THE W2,2 ISOMETRIC IMMERSIONS OF RIEMANNIAN METRICS
THE INFINITE HIERARCHY OF ELASTIC SHELL MODELS: SOME RECENT RESULTS AND A CONJECTURE
SHELL THEORIES ARISING AS LOW ENERGY -LIMIT OF 3D NONLINEAR ELASTICITY
EXISTENCE OF TRAVELING WAVES IN THE STOKES-BOUSSINESQ SYSTEM FOR REACTIVE FLOWS
TRAVELING WAVES IN 2D REACTIVE BOUSSINESQ SYSTEMS WITH NO-SLIP BOUNDARY CONDITIONS
Existence and stability of viscoelastic shock profiles Blake Barker
STABILITY CONDITIONS FOR STRONG RAREFACTION WAVES
STABILITY CONDITIONS FOR PATTERNS OF NONINTERACTING LARGE SHOCK WAVES
STABILITY OF PATTERNS OF NON-INTERACTING LARGE SHOCK WAVES
Shift Differentials of Maps in BV Spaces. Alberto Bressan and Marta Lewicka
A REMARK ON THE GENERICITY OF MULTIPLICITY RESULTS FOR FORCED OSCILLATIONS ON MANIFOLDS
ON THE GENERICITY OF THE MULTIPLICITY RESULTS FOR FORCED OSCILLATIONS ON COMPACT MANIFOLDS
Locally Lipschitzian Guiding Function Method Marta Lewicka
LYAPUNOV FUNCTIONAL FOR SOLUTIONS OF SYSTEMS OF CONSERVATION LAWS CONTAINING A STRONG
ON THE EXISTENCE OF TRAVELING WAVES IN THE 3D BOUSSINESQ SYSTEM
The Foppl-von Karman equations for plates with incompatible strains
REDUCED THEORIES IN NONLINEAR ELASTICITY MARTA LEWICKA
ON THE WELL POSEDNESS OF A SYSTEM OF BALANCE LAWS WITH L
A Uniqueness Condition for Hyperbolic Systems of Conservation Laws
A NOTE ON CONVERGENCE OF LOW ENERGY CRITICAL POINTS OF NONLINEAR ELASTICITY FUNCTIONALS,
ON THE WELL POSEDNESS FOR HYPERBOLIC SYSTEMS OF CONSERVATION LAWS WITH LARGE BV DATA
