Add to ORKGThe purpose of this paper is to investigate order of contact on real hypersurfaces in ${\mathbb C}^n$ by using Newton polyhedra which are important notion in the study of singularity theory. To be more precise, an equivalence condition for the equality of regular type and singular type is given by using the Newton polyhedron of a defining function for the respective hypersurface. Furthermore, a sufficient condition for this condition, which is more useful, is also given. This sufficient condition is satisfied by many earlier known cases (convex domains, pseudoconvex Reinhardt domains and pseudoconvex domains whose regular types are 4, etc.). Under the above conditions, the values of the types can be directly seen in a simple geometrical inf...
We classify entire positive singular solutions to a family of critical sixth order equations in the ...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
We develop a theory of multiplicities of roots for polynomials over hyperfields and use this to prov...
We establish inequalities relating two measurements of the order of contact of q-dimensional complex...
In this note we calculate the number of crepant valuations of an isolated canonical singularity 0 ∈ ...
The study of the Newton polytope of a parametric hypersurface is currently receiving a lot of attent...
The set of all non-smooth hypersurfaces given by polynomials with the fixed support set A was descri...
The holomorphy conjecture states roughly that Igusa's zeta function associated to a hypersurface and...
This text is the redaction of lectures given in 1971-72 by Monique Lejeune-Jalabert and Bernard Teis...
AbstractViro's construction of real smooth hypersurfaces uses regular (also called convex or coheren...
AbstractWe construct bounded, plurisubharmonic functions with maximally large Hessians near the boun...
We clarify the relationship between the two most standard measurements of the order of contact of q-...
This survey may be seen as an introduction to the use of toric and tropical geometry in the analysis...
Une version française a été publiée dans le Séminaire de Singularités (Paris, 1976/1977), pp. 193--2...
We introduce a general class of symmetric polynomials that have saturated Newton polytope and their ...
We classify entire positive singular solutions to a family of critical sixth order equations in the ...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
We develop a theory of multiplicities of roots for polynomials over hyperfields and use this to prov...
We establish inequalities relating two measurements of the order of contact of q-dimensional complex...
In this note we calculate the number of crepant valuations of an isolated canonical singularity 0 ∈ ...
The study of the Newton polytope of a parametric hypersurface is currently receiving a lot of attent...
The set of all non-smooth hypersurfaces given by polynomials with the fixed support set A was descri...
The holomorphy conjecture states roughly that Igusa's zeta function associated to a hypersurface and...
This text is the redaction of lectures given in 1971-72 by Monique Lejeune-Jalabert and Bernard Teis...
AbstractViro's construction of real smooth hypersurfaces uses regular (also called convex or coheren...
AbstractWe construct bounded, plurisubharmonic functions with maximally large Hessians near the boun...
We clarify the relationship between the two most standard measurements of the order of contact of q-...
This survey may be seen as an introduction to the use of toric and tropical geometry in the analysis...
Une version française a été publiée dans le Séminaire de Singularités (Paris, 1976/1977), pp. 193--2...
We introduce a general class of symmetric polynomials that have saturated Newton polytope and their ...
We classify entire positive singular solutions to a family of critical sixth order equations in the ...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
We develop a theory of multiplicities of roots for polynomials over hyperfields and use this to prov...