We establish inequalities relating two measurements of the order of contact of q-dimensional complex varieties with a real hypersurface.Comment: 18 pages; accepted at the Journal of Geometric Analysis; see arXiv:1102.0356 for the origin of this investigatio
The purpose of this paper is to investigate order of contact on real hypersurfaces in ${\mathbb C}^n...
In this paper, we prove a Clifford type inequality for the curve $X_{2,2,2,4}$, which is the interse...
It is known that projective minimal models satisfy the celebrated Miyaoka-Yau inequalities. In this ...
We clarify the relationship between the two most standard measurements of the order of contact of q-...
In 1979 J.J. Kohn gave an indirect argument via the Diederich-Forn\ae ss Theorem showing that finite...
Given a rational dominant map $\phi: Y \dashrightarrow X$ between two generic hypersurfaces $Y,X \su...
We consider Kohn’s method to generate subelliptic multipliers for the ∂¯-Neumann problem. For a doma...
Ball quotients, hyperelliptic varieties, and projective spaces are characterized by their Chern clas...
On a smooth, bounded pseudoconvex domain $\Omega$ in $\mathbb{C}^n$, to verify that Catlin's Propert...
In this article, we introduce the notion of global adelic space of an arithmetic variety over an ade...
Consider a smooth irreducible Hodge generic curve $S$ defined over $\bar{\Q}$ in the Torelli locus $...
In this article, we consider a modified version of minimal $L^2$ integrals on sublevel sets of pluri...
In this paper, we establish second main theorems for holomorphic maps with finite growth index on co...
AbstractWe construct bounded, plurisubharmonic functions with maximally large Hessians near the boun...
Building on work of Brenner and Monsky from 2010 and on a Hilbert-Kunz calculation of Monsky from 19...
The purpose of this paper is to investigate order of contact on real hypersurfaces in ${\mathbb C}^n...
In this paper, we prove a Clifford type inequality for the curve $X_{2,2,2,4}$, which is the interse...
It is known that projective minimal models satisfy the celebrated Miyaoka-Yau inequalities. In this ...
We clarify the relationship between the two most standard measurements of the order of contact of q-...
In 1979 J.J. Kohn gave an indirect argument via the Diederich-Forn\ae ss Theorem showing that finite...
Given a rational dominant map $\phi: Y \dashrightarrow X$ between two generic hypersurfaces $Y,X \su...
We consider Kohn’s method to generate subelliptic multipliers for the ∂¯-Neumann problem. For a doma...
Ball quotients, hyperelliptic varieties, and projective spaces are characterized by their Chern clas...
On a smooth, bounded pseudoconvex domain $\Omega$ in $\mathbb{C}^n$, to verify that Catlin's Propert...
In this article, we introduce the notion of global adelic space of an arithmetic variety over an ade...
Consider a smooth irreducible Hodge generic curve $S$ defined over $\bar{\Q}$ in the Torelli locus $...
In this article, we consider a modified version of minimal $L^2$ integrals on sublevel sets of pluri...
In this paper, we establish second main theorems for holomorphic maps with finite growth index on co...
AbstractWe construct bounded, plurisubharmonic functions with maximally large Hessians near the boun...
Building on work of Brenner and Monsky from 2010 and on a Hilbert-Kunz calculation of Monsky from 19...
The purpose of this paper is to investigate order of contact on real hypersurfaces in ${\mathbb C}^n...
In this paper, we prove a Clifford type inequality for the curve $X_{2,2,2,4}$, which is the interse...
It is known that projective minimal models satisfy the celebrated Miyaoka-Yau inequalities. In this ...
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