Alessandro Pigati scite author profile

Alessandro Pigati

5Publications

194Citation Statements Received

80Citation Statements Given

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186

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Affiliations

ETH Zurich

Publications

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Minimal submanifolds from the abelian Higgs model

Pigati

Stern

2020

Invent. math.

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Given a Hermitian line bundle $$L\rightarrow M$$ L → M over a closed, oriented Riemannian manifold M, we study the asymptotic behavior, as $$\epsilon \rightarrow 0$$ ϵ → 0 , of couples $$(u_\epsilon ,\nabla _\epsilon )$$ ( u ϵ , ∇ ϵ ) critical for the rescalings $$\begin{aligned} E_\epsilon (u,\nabla )=\int _M\Big (|\nabla u|^2+\epsilon ^2|F_\nabla |^2+\frac{1}{4\epsilon ^2}(1-|u|^2)^2\Big ) \end{aligned}$$ E ϵ ( u , ∇ ) = ∫ M ( | ∇ u | 2 + ϵ 2 | F ∇ | 2 + 1 4 ϵ 2 ( 1 - | u | 2 ) 2 ) of the self-dual Yang–Mills–Higgs energy, where u is a section of L and $$\nabla $$ ∇ is a Hermitian connection on L with curvature $$F_{\nabla }$$ F ∇ . Under the natural assumption $$\limsup _{\epsilon \rightarrow 0}E_\epsilon (u_\epsilon ,\nabla _\epsilon )<\infty $$ lim sup ϵ → 0 E ϵ ( u ϵ , ∇ ϵ ) < ∞ , we show that the energy measures converge subsequentially to (the weight measure $$\mu $$ μ of) a stationary integral $$(n-2)$$ ( n - 2 ) -varifold. Also, we show that the $$(n-2)$$ ( n - 2 ) -currents dual to the curvature forms converge subsequentially to $$2\pi \Gamma $$ 2 π Γ , for an integral $$(n-2)$$ ( n - 2 ) -cycle $$\Gamma $$ Γ with $$|\Gamma |\le \mu $$ | Γ | ≤ μ . Finally, we provide a variational construction of nontrivial critical points $$(u_\epsilon ,\nabla _\epsilon )$$ ( u ϵ , ∇ ϵ ) on arbitrary line bundles, satisfying a uniform energy bound. As a byproduct, we obtain a PDE proof, in codimension two, of Almgren’s existence result for (nontrivial) stationary integral $$(n-2)$$ ( n - 2 ) -varifolds in an arbitrary closed Riemannian manifold.

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Free boundary minimal surfaces: a nonlocal approach

Lio¹,

Pigati²

2020

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The Regularity of Parametrized Integer Stationary Varifolds in Two Dimensions

Pigati

Rivière

2020

Comm Pure Appl Math

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On Tangent Cones to Length Minimizers in Carnot--Carathéodory Spaces

Monti¹,

Pigati²,

Vittone³

2018

SIAM J. Control Optim.

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We give a detailed proof of some facts about the blow-up of horizontal curves in Carnot-Carathéodory spaces.The function h ∈ L ∞ (I; R r ) is called the control of γ. Letting |h|:= (h 2 1 + . . . + h 2 r ) 1/2 , the length of γ is then defined asSince M is connected, by the Chow-Rashevsky theorem (see e.g. [2, 12, 1]) for any pair of points x, y ∈ M there exists a horizontal curve joining x to y. We can therefore define a distance function d : M × M → [0, ∞) letting d(x, y) := inf {L(γ) | γ : [0, T ] → M horizontal with γ(0) = x and γ(T ) = y}. (1.2) 2010 Mathematics Subject Classification. 53C17, 49K30, 28A75.

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A proof of the multiplicity 1 conjecture for min-max minimal surfaces in arbitrary codimension

Pigati

Rivière

2020

Duke Math. J.

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