Add to ORKGWe discuss one of Arnold\u27s problems, whether every function is stably equivalent to one which is nondegenerate for its Newton diagram
International audienceIn the Heisenberg group framework, we study rigidity properties for stable sol...
We study nondifferentiability points for a class of continuous functions $f:\mathbb R^N\to\mathbb R$...
We give a definition of Newton non-degeneracy independent of the system of generators defining the v...
We discuss a problem of Arnold, whether every function is stably equivalent to one which is non-dege...
We introduce a minimal generalization of Newton-non-degenerate singularities of hypersurfaces. Rough...
AbstractIn this work the instability of a degenerate equilibrium position is studied through the for...
Newton flows are dynamical systems generated by a continuous, desingularized Newton method for mappi...
AbstractIn this work the instability of a degenerate equilibrium position is studied through the for...
We show that if the equation mapping is 2-regular at a solution in some nonzero direction in the nul...
We show that if the equation mapping is 2-regular at a solution in some nonzero direction in the nul...
We study the conditions under which an algebraic curve can be modeled by a Laurent polynomial that i...
We present an intersection-theoretical approach to the invariants of plane curve singularities µ,ð,r...
We give a list of nonisolated hypersurface singularities of which normalizations are the rational tr...
Abstract. We give some generic properties of non degeneracy for critical points of functionals
isolated zero at 0 (as usual we identify a function-germ with its representatives). In this case f i...
International audienceIn the Heisenberg group framework, we study rigidity properties for stable sol...
We study nondifferentiability points for a class of continuous functions $f:\mathbb R^N\to\mathbb R$...
We give a definition of Newton non-degeneracy independent of the system of generators defining the v...
We discuss a problem of Arnold, whether every function is stably equivalent to one which is non-dege...
We introduce a minimal generalization of Newton-non-degenerate singularities of hypersurfaces. Rough...
AbstractIn this work the instability of a degenerate equilibrium position is studied through the for...
Newton flows are dynamical systems generated by a continuous, desingularized Newton method for mappi...
AbstractIn this work the instability of a degenerate equilibrium position is studied through the for...
We show that if the equation mapping is 2-regular at a solution in some nonzero direction in the nul...
We show that if the equation mapping is 2-regular at a solution in some nonzero direction in the nul...
We study the conditions under which an algebraic curve can be modeled by a Laurent polynomial that i...
We present an intersection-theoretical approach to the invariants of plane curve singularities µ,ð,r...
We give a list of nonisolated hypersurface singularities of which normalizations are the rational tr...
Abstract. We give some generic properties of non degeneracy for critical points of functionals
isolated zero at 0 (as usual we identify a function-germ with its representatives). In this case f i...
International audienceIn the Heisenberg group framework, we study rigidity properties for stable sol...
We study nondifferentiability points for a class of continuous functions $f:\mathbb R^N\to\mathbb R$...
We give a definition of Newton non-degeneracy independent of the system of generators defining the v...