Add to ORKGWe extend Gubler--K\"unnemann's theory of $\delta$-forms from algebraic varieties to good Berkovich spaces. This is based on the observation that skeletons in such spaces satisfy a tropical balance condition. Our main result is that complete intersection formal models of cycles give rise to Green $\delta$-forms for their generic fibers. We moreover show that, in certain situations, intersection numbers on formal models are given by the $\star$-product of their Green currents. In this way, we generalize some results for divisor intersection to higher codimension situations. We illustrate the mentioned results in the context of an intersection problem for Lubin--Tate spaces.Comment: 47 page
Cycles. Let X be a nonsingular projective variety over an algebraically closed field C. A k-cycle on...
Intersection theory is an extremely useful tool both in algebraic and tropical enumerative geometry....
We produce an integral model for the modular curve X(Npm) over the ring of integers of a suciently r...
We extend Gubler--K\"unnemann's theory of $\delta$-forms from algebraic varieties to good Berkovich ...
We extend Gubler--K\"unnemann's theory of $\delta$-forms from algebraic varieties to good Berkovich ...
Chambert-Loir and Ducros have recently introduced a theory of real valued differential forms and cur...
We develop a tropical intersection formalism of forms and currents that extends classical tropical i...
We give an explicit formula for the arithmetic intersection number of CM cycles on Lubin-Tate spaces...
We generalize Forman's discrete Morse theory to the context of symmetric $\Delta$-complexes. As an a...
Let $C$ be smooth irreducible projective curve of genus $g \ge 4$. Let $\mathcal{M}_C(r, \delta)$ be...
W E define the intersection form of a 4-manifold, which governs inter-sections of surfaces inside th...
We search for integrable boundary conditions and their geometric interpretation as $D$-branes, in mo...
We develop intersection theory in terms of the B-group of a reduced analytic space. This group was i...
At the end of the eighties, Vladimir G. Berkovich defined a notion of analytic spaces they enjoy pro...
Intersection theory is an extremely useful tool both in algebraic and tropical enumerative geometry....
Cycles. Let X be a nonsingular projective variety over an algebraically closed field C. A k-cycle on...
Intersection theory is an extremely useful tool both in algebraic and tropical enumerative geometry....
We produce an integral model for the modular curve X(Npm) over the ring of integers of a suciently r...
We extend Gubler--K\"unnemann's theory of $\delta$-forms from algebraic varieties to good Berkovich ...
We extend Gubler--K\"unnemann's theory of $\delta$-forms from algebraic varieties to good Berkovich ...
Chambert-Loir and Ducros have recently introduced a theory of real valued differential forms and cur...
We develop a tropical intersection formalism of forms and currents that extends classical tropical i...
We give an explicit formula for the arithmetic intersection number of CM cycles on Lubin-Tate spaces...
We generalize Forman's discrete Morse theory to the context of symmetric $\Delta$-complexes. As an a...
Let $C$ be smooth irreducible projective curve of genus $g \ge 4$. Let $\mathcal{M}_C(r, \delta)$ be...
W E define the intersection form of a 4-manifold, which governs inter-sections of surfaces inside th...
We search for integrable boundary conditions and their geometric interpretation as $D$-branes, in mo...
We develop intersection theory in terms of the B-group of a reduced analytic space. This group was i...
At the end of the eighties, Vladimir G. Berkovich defined a notion of analytic spaces they enjoy pro...
Intersection theory is an extremely useful tool both in algebraic and tropical enumerative geometry....
Cycles. Let X be a nonsingular projective variety over an algebraically closed field C. A k-cycle on...
Intersection theory is an extremely useful tool both in algebraic and tropical enumerative geometry....
We produce an integral model for the modular curve X(Npm) over the ring of integers of a suciently r...