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2. Symplectic capacities of domains close to the ball and Banach-Mazur geodesics in the space of contact forms

Author

Abbondandolo, Alberto, Benedetti, Gabriele, and Edtmair, Oliver

Subjects
Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, Mathematics - Dynamical Systems, 53Dxx (Primary) 37Jxx (Secondary)
Abstract

We prove that all normalized symplectic capacities coincide on smooth domains in $\mathbb C^n$ which are $C^2$-close to the Euclidean ball, whereas this fails for some smooth domains which are just $C^1$-close to the ball. We also prove that all symplectic capacities whose value on ellipsoids agrees with that of the $n$-th Ekeland-Hofer capacity coincide in a $C^2$-neighborhood of the Euclidean ball of $\mathbb C^n$. These results are deduced from a general theorem about contact forms which are $C^2$-close to Zoll ones, saying that these contact forms can be pulled back to suitable "quasi-invariant" contact forms. We relate all this to the question of the existence of minimizing geodesics in the space of contact forms equipped with a Banach-Mazur pseudo-metric. Using some new spectral invariants for contact forms, we prove the existence of minimizing geodesics from a Zoll contact form to any contact form which is $C^2$-close to it. This paper also contains an appendix in which we review the construction of exotic ellipsoids by the Anosov-Katok conjugation method, as these are related to the above mentioned pseudo-metric., Comment: 70 pages, comments welcome

Published
2023

3. Symplectic capacities of disc cotangent bundles of flat tori

Author

Benedetti, Gabriele, Bimmermann, Johanna, and Zehmisch, Kai

Subjects
Mathematics - Symplectic Geometry, 53D35
Abstract

We show that on the unit disc cotangent bundle of flat Riemannian tori, all normalized capacities coincide with twice the systole. The same result holds for flat, reversible Finsler tori and normalized capacities that are greater than or equal to the Hofer-Zehnder capacity., Comment: 6 pages. Comments are welcome! Fixed some typos. To appear in Proceedings of the AMS

Published
2023

4. Zoll magnetic systems on the two-torus: a Nash-Moser construction

Author

Asselle, Luca, Benedetti, Gabriele, and Berti, Massimiliano

Subjects
Mathematics - Differential Geometry, Mathematics - Analysis of PDEs, Mathematics - Symplectic Geometry, 70H12 (Primary) 58E10, 44A12, 58J40 (Secondary)
Abstract

We construct an infinite-dimensional family of smooth integrable magnetic systems on the two-torus which are Zoll, meaning that all the unit-speed magnetic geodesics are periodic. The metric and the magnetic field of such systems are arbitrarily close to the flat metric and to a given constant magnetic field. This extends to the magnetic setting a famous result by Guillemin on the two-sphere. We characterize Zoll magnetic systems as zeros of a suitable action functional $S$, and then look for its zeros by means of a Nash-Moser implicit function theorem. This requires showing the right-invertibility of the linearized operator $\mathrm{d} S$ in a neighborhood of the flat metric and constant magnetic field, and establishing tame estimates for the right inverse. As key step we prove the invertibility of the normal operator $\mathrm{d} S\circ \mathrm{d} S^*$ which, unlike in Guillemin's case, is pseudo-differential only at the highest order. We overcome this difficulty noting that, by the asymptotic properties of Bessel functions, the lower order expansion of $\mathrm{d} S \circ \mathrm{d}S^*$ is a sum of Fourier integral operators. We then use a resolvent identity decomposition which reduces the problem to the invertibility of $\mathrm{d} S \circ \mathrm{d} S^*$ restricted to the subspace of functions corresponding to high Fourier modes. The inversion of such a restricted operator is finally achieved by making the crucial observation that lower order Fourier integral operators satisfy asymmetric tame estimates., Comment: 25 pages; added references and improved exposition in the introduction; fixed minor inaccuracies following referee's report

Published
2023

5. Lorentz-Finsler metrics on symplectic and contact transformation groups

Author

Abbondandolo, Alberto, Benedetti, Gabriele, and Polterovich, Leonid

Subjects
Mathematics - Symplectic Geometry, Mathematical Physics, 53DXX (Primary) 53C50, 22E65 (Secondary)
Abstract

In these notes we discuss Lorentz-Finsler metrics, a notion originated in relativity theory, on certain groups of symplectic and contact transformations. Some basic geometric questions arising in this context concerning distance, geodesics and their conjugate points, and existence of a time function, turn out to be related to a variety of subjects including the contact systolic problem, group quasi-morphisms, the Monge-Amp\`ere equation, and a subtle interplay between symplectic rigidity and flexibility. We discuss these interrelations, providing necessary preliminaries, and formulate a number of open questions., Comment: 103 pages, 2 figures

Published
2022

7. First steps into the world of systolic inequalities: From Riemannian to symplectic geometry

Author

Benedetti, Gabriele

Subjects
Mathematics - Differential Geometry, Mathematics - Symplectic Geometry, 58E10, 37J46
Abstract

Our aim is to give a friendly introduction for students to systolic inequalities. We will stress the relationships between the classical formulation for Riemannian metrics and more recent developments related to symplectic measurements and the Viterbo conjecture. This will give us a perfect excuse to introduce the reader to some important ideas in Riemannian and symplectic geometry., Comment: acknowledgements updated, 31 pages, 9 figures, these notes are an expanded version of two talks given at the Dutsch Differential Topology and Geometry Seminar on November 27, 2020

Published
2021

8. Relative Hofer-Zehnder capacity and positive symplectic homology

Author

Benedetti, Gabriele and Kang, Jungsoo

Subjects
Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, 53D40, 37J46, 53D25, 58E10
Abstract

We study the relationship between a homological capacity $c_{\mathrm{SH}^+}(W)$ for Liouville domains $W$ defined using positive symplectic homology and the existence of periodic orbits for Hamiltonian systems on $W$: If the positive symplectic homology of $W$ is non-zero, then the capacity yields a finite upper bound to the $\pi_1$-sensitive Hofer-Zehnder capacity of $W$ relative to its skeleton and a certain class of Hamiltonian diffeomorphisms of $W$ has infinitely many non-trivial contractible periodic points. En passant, we give an upper bound for the spectral capacity of $W$ in terms of the homological capacity $c_{\mathrm{SH}}(W)$ defined using the full symplectic homology. Applications of these statements to cotangent bundles are discussed and use a result by Abbondandolo and Mazzucchelli in the appendix, where the monotonicity of systoles of convex Riemannian two-spheres in $\mathbb R^3$ is proved., Comment: 30 pages, 1 figure, appendix by Alberto Abbondandolo and Marco Mazzucchelli, comments welcome! Corrected an inconsistency in our convention pointed out by Pierre-Alexandre Mailhot and Egor Shelukhin

Published
2020

9. Normal forms for strong magnetic systems on surfaces: Trapping regions and rigidity of Zoll systems

Author

Asselle, Luca and Benedetti, Gabriele

Subjects
Mathematics - Dynamical Systems, Mathematics - Differential Geometry, Mathematics - Symplectic Geometry, 37J99, 58E10
Abstract

We prove a normal form for strong magnetic fields on a closed, oriented surface and use it to derive two dynamical results for the associated flow. First, we show the existence of KAM tori and trapping regions provided a natural non-resonance condition holds. Second, we prove that the flow cannot be Zoll unless (i) the Riemannian metric has constant curvature and the magnetic function is constant, or (ii) the magnetic function vanishes and the metric is Zoll. We complement the second result by exhibiting an exotic magnetic field on a flat two-torus yielding a Zoll flow for arbitrarily small rescalings., Comment: 19 pages, final version to appear in ETDS, several typos corrected, funding acknowledgments updated. Comments are very welcome!

Published
2020

11. On the local systolic optimality of Zoll contact forms

Author

Abbondandolo, Alberto and Benedetti, Gabriele

Subjects
Mathematics - Symplectic Geometry
Abstract

We prove a normal form for contact forms close to a Zoll one and deduce that Zoll contact forms on any closed manifold are local maximizers of the systolic ratio. Corollaries of this result are: (i) sharp local systolic inequalities for Riemannian and Finsler metrics close to Zoll ones, (ii) the perturbative case of a conjecture of Viterbo on the symplectic capacity of convex bodies, (iii) a generalization of Gromov's non-squeezing theorem in the intermediate dimensions for symplectomorphisms that are close to linear ones., Comment: 63 pages; v3: perturbative version of the Viterbo conjecture now proven for arbitrary symplectic capacities, added more properties to the normal form, added a statement on the local rigidity of Zoll contact forms

Published
2019

12. Integrable magnetic flows on the two-torus: Zoll examples and systolic inequalities

Author

Asselle, Luca and Benedetti, Gabriele

Subjects
Mathematics - Dynamical Systems, Mathematics - Symplectic Geometry
Abstract

In this paper we study some aspects of integrable magnetic systems on the two-torus. On the one hand, we construct the first non-trivial examples with the property that all magnetic geodesics with unit speed are closed. On the other hand, we show that those integrable magnetic systems admitting a global surface of section satisfy a sharp systolic inequality., Comment: 11 pages, 2 figures

Published
2019

13. On a local systolic inequality for odd-symplectic forms

Author

Benedetti, Gabriele and Kang, Jungsoo

Subjects
Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, 53D05, 53D10, 37J45
Abstract

The aim of this paper is to formulate a local systolic inequality for odd-symplectic forms (also known as Hamiltonian structures) and to establish it in some basic cases. Let $\Omega$ be an odd-symplectic form on an oriented closed manifold $\Sigma$ of odd dimension. We say that $\Omega$ is Zoll if the trajectories of the flow given by $\Omega$ are the orbits of a free $S^1$-action. After defining the volume of $\Omega$ and the action of its periodic orbits, we prove that the volume and the action satisfy a polynomial equation, provided $\Omega$ is Zoll. This builds the equality case of a conjectural systolic inequality for odd-symplectic forms close to a Zoll one. We prove the conjecture when the $S^1$-action yields a flat $S^1$-bundle or $\Omega$ is quasi-autonomous. In particular the conjecture is established in dimension three. This new inequality recovers the contact systolic inequality as well as the inequality between the minimal action and the Calabi invariant for Hamiltonian isotopies $C^1$-close to the identity on a closed symplectic manifold. Applications to the study of periodic magnetic geodesics on closed orientable surfaces is given in the companion paper available at arXiv:1902.01262., Comment: 52 pages, a revised version of Part II in "A local systolic-diastolic inequality in contact and symplectic geometry" arXiv:1801.00539 (now withdrawn)

Published
2019

14. On a systolic inequality for closed magnetic geodesics on surfaces

Author

Benedetti, Gabriele and Kang, Jungsoo

Subjects
Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, 58E10, 53D05, 53D10, 37J45
Abstract

We apply a local systolic-diastolic inequality for contact forms and odd-symplectic forms on three-manifolds to bound the magnetic length of closed curves with prescribed geodesic curvature (also known as magnetic geodesics) on an oriented closed surface. Our results hold when the prescribed curvature is either close to a Zoll one or large enough., Comment: 26 pages, a revised version of Part III in "A local systolic-diastolic inequality in contact and symplectic geometry" arXiv:1801.00539 (now withdrawn)

Published
2019

15. A local contact systolic inequality in dimension three

Author

Benedetti, Gabriele and Kang, Jungsoo

Subjects
Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, 53D10, 53D05, 37J45
Abstract

Let $\alpha$ be a contact form on a connected closed three-manifold $\Sigma$. The systolic ratio of $\alpha$ is defined as $\rho_{\mathrm{sys}}(\alpha):=\tfrac{1}{\mathrm{Vol}(\alpha)}T_{\min}(\alpha)^2$, where $T_{\min}(\alpha)$ and $\mathrm{Vol}(\alpha)$ denote the minimal period of periodic Reeb orbits and the contact volume. The form $\alpha$ is said to be Zoll if its Reeb flow generates a free $S^1$-action on $\Sigma$. We prove that the set of Zoll contact forms on $\Sigma$ locally maximises the systolic ratio in the $C^3$-topology. More precisely, we show that every Zoll form $\alpha_*$ admits a $C^3$-neighbourhood $\mathcal U$ in the space of contact forms such that, for every $\alpha\in\mathcal U$, there holds $\rho_{\mathrm{sys}}(\alpha)\leq \rho_{\mathrm{sys}}(\alpha_*)$ with equality if and only if $\alpha$ is Zoll., Comment: 42 pages, a revised version of Part I in "A local systolic-diastolic inequality in contact and symplectic geometry" arXiv:1801.00539 (now withdrawn), accepted for publication in JEMS

Published
2019

17. Invariance of symplectic cohomology and twisted cotangent bundles over surfaces

Author

Benedetti, Gabriele and Ritter, Alexander F.

Subjects
Mathematics - Symplectic Geometry, 53D40, 53D25, 37J45
Abstract

We prove that symplectic cohomology for open convex symplectic manifolds is invariant when the symplectic form undergoes deformations which may be non-exact and non-compactly supported, provided one uses the correct local system of coefficients in Floer theory. As a sample application beyond the Liouville setup, we describe in detail the symplectic cohomology for disc bundles in the twisted cotangent bundle of surfaces, and we deduce existence results for periodic magnetic geodesics on surfaces. In particular, we show the existence of geometrically distinct orbits by exploiting properties of the BV-operator on symplectic cohomology., Comment: 48 pages, 1 figure. Results are unchanged. Additional details were added in the Introduction and in the proof of Prop.3.9. To appear in: International Journal of Mathematics

Published
2018
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18. The contact property for magnetic flows on surfaces

Author

Benedetti, Gabriele

Subjects
Mathematics - Symplectic Geometry, 37J05, 37J27, 53D25
Abstract

This is the author's PhD Thesis (University of Cambridge, 2014) in its original form. In the first part, using an invariance result, we compute the symplectic homology of contact-type energy levels for magnetic systems on surfaces, provided the energy is very large or very small. In the second part, which is partially contained in the later paper (Benedetti, Ergod. Theory Dynam. Syst., 2016), we discuss some rotationally symmetric examples and establish dynamical convexity for symplectic magnetic flows on low energy levels., Comment: 132 pages. The proof of Proposition 4.20 contains a gap, but the statement of that proposition is still true

Published
2018

19. A local systolic-diastolic inequality in contact and symplectic geometry

Author

Benedetti, Gabriele and Kang, Jungsoo

Subjects
Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, Mathematics - Dynamical Systems
Abstract

Let $\Sigma$ be a connected closed three-manifold, and let $t_\Sigma$ be the order of the torsion subgroup of $H_1(\Sigma;\mathbb Z)$. For a contact form $\alpha$ on $\Sigma$, we denote by $\mathrm{Volume}(\alpha)$ the contact volume of $\alpha$, and by $T_{\min}(\alpha)$ and $T_{\max}(\alpha)$ the minimal period and the maximal period of prime periodic orbits of the Reeb flow of $\alpha$ respectively. We say that $\alpha$ is Zoll if its Reeb flow generates a free $S^1$-action on $\Sigma$. We prove that every Zoll contact form $\alpha_*$ on $\Sigma$ admits a $C^3$-neighbourhood $\mathcal U$ in the space of contact forms such that \[ t_\Sigma T_{\min}(\alpha)^2\leq \mathrm{Volume}(\alpha)\leq t_\Sigma T_{\max}(\alpha)^2,\qquad \forall\,\alpha\in\mathcal U, \] and any of the equalities holds if and only if $\alpha$ is Zoll. We extend the above picture to odd-symplectic forms $\Omega$ on $\Sigma$ of arbitrary odd dimension. We define the volume of $\Omega$, which generalises both the contact volume and the Calabi invariant of Hamiltonian functions, and the action of closed characteristics of $\Omega$, which generalises both the period of periodic Reeb orbits and the action of fixed points of Hamiltonian diffeomorphisms. We say that $\Omega$ is Zoll if its characteristics are the orbits of a free $S^1$-action on $\Sigma$. We prove that the volume and the action of a Zoll odd-symplectic form satisfy a certain polynomial equation. This builds the equality case of a conjectural local systolic-diastolic inequality for odd-symplectic forms, which we establish in some cases. This inequality recovers the inequality between the minimal action and the Calabi invariant of Hamiltonian isotopies $C^1$-close to the identity on a closed symplectic manifold, as well as the local contact systolic-diastolic inequality above. Finally, applications to magnetic geodesics are discussed., Comment: The contents of the article is now divided into three articles available at arXiv:1902.01249, arXiv:1902.01261, and arXiv:1902.01262

Published
2018

20. Minimal boundaries in Tonelli Lagrangian systems

Author

Asselle, Luca, Benedetti, Gabriele, and Mazzucchelli, Marco

Subjects
Mathematics - Dynamical Systems, Mathematics - Differential Geometry, Mathematics - Symplectic Geometry, 37J45, 58E05
Abstract

We prove several new results concerning action minimizing periodic orbits of Tonelli Lagrangian systems on an oriented closed surface $M$. More specifically, we show that for every energy larger than the maximal energy of a constant orbit and smaller than or equal to the Ma\~n\'e critical value of the universal abelian cover, the Lagrangian system admits a minimal boundary, i.e. a global minimizer of the Lagrangian action on the space of smooth boundaries of open sets of $M$. We also extend the celebrated graph theorem of Mather in this context: in the tangent bundle $TM$, the union of the supports of all lifted minimal boundaries with a given energy projects injectively to the base $M$. Finally, we prove the existence of action minimizing simple periodic orbits on energies just above the Ma\~n\'e critical value of the universal abelian cover. This provides in particular a class of non-reversible Finsler metrics on the 2-sphere possessing infinitely many closed geodesics., Comment: 31 pages, 4 figures. This version also incorporates the results of arXiv:1702.08815 (the preprint arXiv:1702.08815 has been withdrawn from the arXiv, and will not be submitted for publication)

Published
2017
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21. Symplectic capacities of disc cotangent bundles of flat tori.

Author

Benedetti, Gabriele, Bimmermann, Johanna, and Zehmisch, Kai

Subjects
*TORUS
Abstract

We show that on the unit disc cotangent bundle of flat Riemannian tori, all normalized capacities coincide with twice the systole. The same result holds for flat, reversible Finsler tori and normalized capacities that are greater than or equal to the Hofer–Zehnder capacity. [ABSTRACT FROM AUTHOR]

Published
2024
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22. Infinitely many periodic orbits just above the Ma\~n\'e critical value on the 2-sphere

Author

Benedetti, Gabriele and Mazzucchelli, Marco

Subjects
Mathematics - Dynamical Systems, Mathematics - Differential Geometry, Mathematics - Symplectic Geometry, 37J45, 58E05
Abstract

We introduce a new critical value $c_\infty(L)$ for Tonelli Lagrangians $L$ on the tangent bundle of the 2-sphere without minimizing measures supported on a point. We show that $c_\infty(L)$ is strictly larger than the Ma\~n\'e critical value $c(L)$, and on every energy level $e\in(c(L),c_\infty(L))$ there exist infinitely many periodic orbits of the Lagrangian system of $L$, one of which is a local minimizer of the free-period action functional. This has applications to Finsler metrics of Randers type on the 2-sphere. We show that, under a suitable criticality assumption on a given Randers metric, after rescaling its magnetic part with a sufficiently large multiplicative constant, the new metric admits infinitely many closed geodesics, one of which is a waist. Examples of critical Randers metrics include the celebrated Katok metric., Comment: The results in this preprint are now incorporated in our work arXiv:1705.02488 with Luca Asselle. This preprint will not be submitted for publication

Published
2017

23. The multiplicity problem for periodic orbits of magnetic flows on the 2-sphere

Author

Abbondandolo, Alberto, Asselle, Luca, Benedetti, Gabriele, Mazzucchelli, Marco, and Taimanov, Iskander A.

Subjects
Mathematics - Dynamical Systems, Mathematics - Symplectic Geometry, 37J45, 58E05
Abstract

We consider magnetic Tonelli Hamiltonian systems on the cotangent bundle of the 2-sphere, where the magnetic form is not necessarily exact. It is known that, on very low and on high energy levels, these systems may have only finitely many periodic orbits. Our main result asserts that almost all energy levels in a precisely characterized intermediate range $(e_0,e_1)$ possess infinitely many periodic orbits. Such a range of energies is non-empty, for instance, in the physically relevant case where the Tonelli Lagrangian is a kinetic energy and the magnetic form is oscillating (in which case, $e_0=0$ is the minimal energy of the system)., Comment: 17 pages, 1 figure

Published
2016
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24. Lecture notes on closed orbits for twisted autonomous Tonelli Lagrangian flows

Author

Benedetti, Gabriele

Subjects
Mathematics - Dynamical Systems, Mathematics - Symplectic Geometry, 37J45, 58E05
Abstract

These notes were prepared in occasion of a mini-course given by the author at the "CIMPA Research School - Hamiltonian and Lagrangian Dynamics" (10-19 March 2015 - Salto, Uruguay). The talks were meant as an introduction to the problem of finding periodic orbits of prescribed energy for autonomous Tonelli Lagrangian systems on the twisted cotangent bundle of a closed manifold. In the first part of the lecture notes, we put together in a general theorem old and new results on the subject. In the second part, we focus on an important class of examples: magnetic flows on surfaces. For such systems, we discuss a special method, originally due to Taimanov, to find periodic orbits with low energy and we study in detail the stability properties of the energy levels., Comment: One figure. To appear in a special issue of "Publicaciones Matem\'aticas del Uruguay" dedicated to Ricardo Ma\~n\'e. Comments are welcome

Published
2016

25. On the periodic motions of a charged particle in an oscillating magnetic field on the two-torus

Author

Asselle, Luca and Benedetti, Gabriele

Subjects
Mathematics - Dynamical Systems, Mathematics - Symplectic Geometry, 37J45, 58E05
Abstract

Let $(\mathbb T^2,g)$ be a Riemannian two-torus and let $\sigma$ be an oscillating $2$-form on $\mathbb T^2$. We show that for almost every small positive number $k$ the magnetic flow of the pair $(g,\sigma)$ has infinitely many periodic orbits with energy $k$. This result complements the analogous statement for closed surfaces of genus at least $2$ [Asselle and Benedetti, Calc. Var. Partial Differential Equations, 2015] and at the same time extends the main theorem in [Abbondandolo, Macarini, Mazzucchelli, and Paternain, J. Eur. Math. Soc. (JEMS), to appear] to the non-exact oscillating case., Comment: 15 pages. Revised version incorporating the precious comments of the referee and the notion of essential family suggested to us by M. Mazzucchelli. Comments are very welcome. To appear in Mathematische Zeitschrift

Published
2015
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26. Magnetic Katok Examples on the two-sphere

Author

Benedetti, Gabriele

Subjects
Mathematics - Symplectic Geometry, Mathematics - Dynamical Systems, 37J45, 53D25
Abstract

We show that there exist non-exact magnetic flows on the two-sphere having an energy level whose double cover is strictly contactomorphic to an irrational ellipsoid in $\mathbb C^2$. Our construction generalizes the examples of integrable Finsler metrics on the two-sphere with only two closed geodesics due to A. Katok., Comment: 13 pages. Second version. We have added a sharper example in the larger class of Lagrangians attaining a Morse-Bott non-degenerate minimum at the zero section. Comments, questions, and suggestions are very welcome. To appear in the Bulletin of the London Mathematical Society

Published
2015
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27. On the existence of periodic orbits for magnetic systems on the two-sphere

Author

Benedetti, Gabriele and Zehmisch, Kai

Subjects
Mathematics - Symplectic Geometry, Mathematics - Dynamical Systems, 37J45, 53D40
Abstract

We prove that there exist periodic orbits on almost all compact regular energy levels of a Hamiltonian function defined on a twisted cotangent bundle over the two-sphere. As a corollary, given any Riemannian two-sphere and a magnetic field on it, there exists a closed magnetic geodesic for almost all kinetic energy levels., Comment: New title and abstract; same content; to appear in J. Mod. Dyn

Published
2015
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29. The Lusternik-Fet theorem for autonomous Tonelli Hamiltonian systems on twisted cotangent bundles

Author

Asselle, Luca and Benedetti, Gabriele

Subjects
Mathematics - Symplectic Geometry, Mathematics - Dynamical Systems, 37J45, 58E05
Abstract

Let $M$ be a closed manifold and consider the Hamiltonian flow associated to an autonomous Tonelli Hamiltonian $H:T^*M\rightarrow \mathbb R$ and a twisted symplectic form. In this paper we study the existence of contractible periodic orbits for such a flow. Our main result asserts that if $M$ is not aspherical, then contractible periodic orbits exist for almost all energies above the maximum critical value of $H$., Comment: 21 pages. We have generalized the results of the previous version to a larger class of manifolds and of energy values. Remarks and comments are very welcome. To appear on Journal of Topology and Analysis

Published
2014
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30. Infinitely many periodic orbits in non-exact oscillating magnetic fields on surfaces with genus at least two for almost every low energy level

Author

Asselle, Luca and Benedetti, Gabriele

Subjects
Mathematics - Symplectic Geometry, Mathematics - Dynamical Systems, 37J45 (Primary), 58E05 (Secondary)
Abstract

In this paper we consider oscillating non-exact magnetic fields on surfaces with genus at least two and show that for almost every energy level $k$ below a certain value $\tau_+^*(g,\sigma)$ less than or equal to the "Ma\~n\'e critical value of the universal cover" there are infinitely many closed magnetic geodesics with energy $k$., Comment: In this version we corrected some minor inaccuracies and we improved the exposition following the precious suggestions of the anonymous referee. Accepted for publication in "Calculus of Variations and Partial Differential Equations". Comments are very welcome. arXiv admin note: text overlap with arXiv:1404.7641 by other authors

Published
2014
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31. Hydrogeological parameterisation of the Daruvar thermal aquifer: integration of fracture network analysis and well testing

Author

Kosović, Ivan, Matoš, Bojan, Casiraghi, Stefano, Benedetti, Gabriele, Frangen, Tihomir, Urumović, Kosta, Pavičić, Ivica, Bistacchi, Andrea, Mittempergher, Silvia, Pola, Marco, Borović, Staša, Kosović, Ivan, Matoš, Bojan, Casiraghi, Stefano, Benedetti, Gabriele, Frangen, Tihomir, Urumović, Kosta, Pavičić, Ivica, Bistacchi, Andrea, Mittempergher, Silvia, Pola, Marco, and Borović, Staša

Abstract

Highly fractured Mesozoic carbonate rocks are the main reservoir of many geothermal resources in northern Croatia, being of environmental, cultural, and economic value for the local and regional communities. The Daruvar thermal springs (temperatures < 50°C) represent the outflow area of an intermediate scale, tectonically controlled, hydrothermal system hosted in Triassic carbonate rocks. Several investigations have been conducted in the Daruvar area detailing the architecture of regional and local fracture networks and quantifying the hydrogeological parameters of the thermal aquifer. In this work, an integrated approach based on structural and hydrogeological investigations was employed to model the network of fractures in the reservoir and quantify its impact on the hydraulic properties. Structural investigations were conducted in the Batinjska Rijeka quarry, considered as an outcrop analogue of the thermal aquifer, employing both a classical field approach and the virtual quantitative analysis of a 3D digital outcrop model. Structural analysis of the digital outcrop model allowed identification of two sub-vertical systems of discontinuities, dipping to the NW and the WSW respectively, in accordance with the data collected through direct field measurements. The main geometric features of the discontinuity network and their statistical distributions were employed to construct discrete fracture network models at both the outcrop scale (approximately 100 m) and the aquifer scale in Daruvar (approximately 700 m). Calibration of the input parameters allowed modelling of porosity and permeability values that reproduce the field values assessed through pumping tests, well tests, and well logging. This work highlights the importance of integrating geological and hydrogeological investigations to obtain a more reliable reconstruction and quantification of the processes driving the fluid flow in fractured aquifers and affecting the spatial distribution of their hydraulic p

Published
2024

32. Hydrogeological parameterisation of the Daruvar thermal aquifer: integration of fracture network analysis and well testing

Author

Kosović, I, Null, N, Matoš, B, Casiraghi, S, Benedetti, G, Frangen, T, Urumović, K, Pavičić, I, Bistacchi, A, Mittempergher, S, Pola, M, Borović, S, Kosović, Ivan, null, null, Matoš, Bojan, Casiraghi, Stefano, Benedetti, Gabriele, Frangen, Tihomir, Urumović, Kosta, Pavičić, Ivica, Bistacchi, Andrea, Mittempergher, Silvia, Pola, Marco, Borović, Staša, Kosović, I, Null, N, Matoš, B, Casiraghi, S, Benedetti, G, Frangen, T, Urumović, K, Pavičić, I, Bistacchi, A, Mittempergher, S, Pola, M, Borović, S, Kosović, Ivan, null, null, Matoš, Bojan, Casiraghi, Stefano, Benedetti, Gabriele, Frangen, Tihomir, Urumović, Kosta, Pavičić, Ivica, Bistacchi, Andrea, Mittempergher, Silvia, Pola, Marco, and Borović, Staša

Abstract

Highly fractured Mesozoic carbonate rocks are the main reservoir of many geothermal resources in northern Croatia, being of environmental, cultural, and economic value for the local and regional communities. The Daruvar thermal springs (temperatures < 50°C) represent the outflow area of an intermediate scale, tectonically controlled, hydrothermal system hosted in Triassic carbonate rocks. Several investigations have been conducted in the Daruvar area detailing the architecture of regional and local fracture networks and quantifying the hydrogeological parameters of the thermal aquifer. In this work, an integrated approach based on structural and hydrogeological investigations was employed to model the network of fractures in the reservoir and quantify its impact on the hydraulic properties. Structural investigations were conducted in the Batinjska Rijeka quarry, considered as an outcrop analogue of the thermal aquifer, employing both a classical field approach and the virtual quantitative analysis of a 3D digital outcrop model. Structural analysis of the digital outcrop model allowed identification of two sub-vertical systems of discontinuities, dipping to the NW and the WSW respectively, in accordance with the data collected through direct field measurements. The main geometric features of the discontinuity network and their statistical distributions were employed to construct discrete fracture network models at both the outcrop scale (approximately 100 m) and the aquifer scale in Daruvar (approximately 700 m). Calibration of the input parameters allowed modelling of porosity and permeability values that reproduce the field values assessed through pumping tests, well tests, and well logging. This work highlights the importance of integrating geological and hydrogeological investigations to obtain a more reliable reconstruction and quantification of the processes driving the fluid flow in fractured aquifers and affecting the spatial distribution of their hydrauli

Published
2024

33. The contact property for nowhere vanishing magnetic fields on the two-sphere

Author

Benedetti, Gabriele

Subjects
Mathematics - Dynamical Systems, Mathematics - Symplectic Geometry, 37J05 (Primary), 53D05, 53D10 (Secondary)
Abstract

In this paper we give some positive and negative results about the contact property for the energy levels $\Sigma_c$ of a symplectic magnetic field on $S^2$. In the first part we focus on the case of the area form on a surface of revolution. We state a sufficient condition for an energy level to be of contact type and give an example where the contact property fails. If the magnetic curvature is positive, the dynamics and the action of invariant measures can be numerically computed. This hints at the conjecture that an energy level of a symplectic magnetic field with positive magnetic curvature should be of contact type. In the second part we show that, for small energies, there exists a convex hypersurface $N_c$ in $\mathbb C^2$ and a covering map $p_c:N_c \rightarrow \Sigma_c$ such that the pull-back via $p_c$ of the characteristic distribution on $\Sigma_c$ is the standard characteristic distribution on $N_c$. As a corollary we prove that there are either two or infinitely many periodic orbits on $\Sigma_c$. The second alternative holds if there exists a contractible prime periodic orbit., Comment: 31 pages, 1 figure. Minor typos corrected. Published online in "Ergodic Theory and Dynamical Systems"

Published
2013
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34. The contact property for magnetic flows on surfaces

Author

Benedetti, Gabriele

Subjects
516.3, Magnetic flows, Symplectic geometry, Periodic orbits
Abstract

This work investigates the dynamics of magnetic flows on closed orientable Riemannian surfaces. These flows are determined by triples (M, g, σ), where M is the surface, g is the metric and σ is a 2-form on M . Such dynamical systems are described by the Hamiltonian equations of a function E on the tangent bundle TM endowed with a symplectic form ω_σ, where E is the kinetic energy. Our main goal is to prove existence results for a) periodic orbits, and b) Poincare sections for motions on a fixed energy level Σ_m := {E = m^2/2} ⊂ T M . We tackle this problem by studying the contact geometry of the level set Σ_m . This will allow us to a) count periodic orbits using algebraic invariants such as the Symplectic Cohomology SH of the sublevels ({E ≤ m^2/2}, ω_σ ); b) find Poincare sections starting from pseudo-holomorphic foliations, using the techniques developed by Hofer, Wysocki and Zehnder in 1998. In Chapter 3 we give a proof of the invariance of SH under deformation in an abstract setting, suitable for the applications. In Chapter 4 we present some new results on the energy values of contact type. First, we give explicit examples of exact magnetic systems on T^2 which are of contact type at the strict critical value. Then, we analyse the case of non-exact systems on M different from T^2 and prove that, for large m and for small m with symplectic σ, Σ_m is of contact type. Finally, we compute SH in all cases where Σ_m is convex. On the other hand, we are also interested in non-exact examples where the contact property fails. While for surfaces of genus at least two, there is always a level not of contact type for topological reasons, this is not true anymore for S^2 . In Chapter 5, after developing the theory of magnetic flows on surfaces of revolution, we exhibit the first example on S^2 of an energy level not of contact type. We also give a numerical algorithm to check the contact property when the level has positive magnetic curvature. In Chapter 7 we restrict the attention to low energy levels on S^2 with a symplectic σ and we show that these levels are of dynamically convex contact type. Hence, we prove that, in the non-degenerate case, there exists a Poincare section of disc-type and at least an elliptic periodic orbit. In the general case, we show that there are either 2 or infinitely many periodic orbits on Σ_m and that we can divide the periodic orbits in two distinguished classes, short and long, depending on their period. Then, we look at the case of surfaces of revolution, where we give a sufficient condition for the existence of infinitely many periodic orbits. Finally, we discuss a generalisation of dynamical convexity introduced recently by Abreu and Macarini, which applies also to surfaces with genus at least two.

Published
2015
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39. On a systolic inequality for closed magnetic geodesics on surfaces

Author

Benedetti, Gabriele, Kang, Jungsoo, Benedetti, Gabriele, and Kang, Jungsoo

Abstract

We apply a local systolic-diastolic inequality for contact forms and odd-symplectic forms on three-manifolds to bound the magnetic length of closed curves with prescribed geodesic curvature (also known as magnetic geodesics) on an oriented closed surface. Our results hold when the prescribed curvature is either close to a Zoll one or large enough.

Published
2022
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41. Full Coupling Studies at ALBA

Author

Martí, Zeus, Benedetti, Gabriele, Carlà, Michele, Iriso, Ubaldo, and Torino, Laura

Subjects
MC5: Beam Dynamics and EM Fields, Physics::Accelerator Physics, Accelerator Physics
Abstract

As other low emittance machine upgrades ALBA-II proposal considers operating in full coupling. In such configuration the horizontal emittance is further reduced while the lifetime is increased at the price of working close to equal fractional tunes. This mode of operation has not been adopted by any existing light source to date, and it presents a few disadvantages, like the optics degradation, injection efficiency reduction and beam size stability. In this paper the above mentioned difficulties are studied for the present ALBA storage ring in full coupling conditions., Proceedings of the 13th International Particle Accelerator Conference, IPAC2022, Bangkok, Thailand

Published
2022
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42. Photon Polarization Switch at ALBA

Author

Torino, Laura, Benedetti, Gabriele, Fernández, Ferran, Iriso, Ubaldo, Martí, Zeus, Moldes, Jairo, and Yépez, David

Subjects
08 Feedback Systems and Beam Stability, Accelerator Physics
Abstract

The polarization of the synchrotron radiation produced by a bending magnet can be selected by properly choosing the vertical emission angle. At beamlines this can be done by moving a slit to cut out unwanted polarization: this method is time consuming and not very reproducible. Another option is to fix the slit position and generate a local bump with the electron beam, and vary the emission angle at the source point such that the slit is illuminated with the desired polarization. At ALBA, we have implemented this option within the Fast Orbit Feedback, which allows to perform the angle switch in less than one minute without affecting the other beamlines. This report describes the implementation of this technique for the dipole beamline MISTRAL at the ALBA Synchrotron., Proceedings of the 11th International Beam Instrumentation Conference, IBIC2022, Kraków, Poland

Published
2022
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43. A Double Dipole Kicker for Off and On-Axis Injection for ALBA-II

Author

Benedetti, Gabriele, Carlà, Michele, and Pont, Montserrat

Subjects
Physics::Accelerator Physics, MC2: Photon Sources and Electron Accelerators, Accelerator Physics
Abstract

Injection into the ALBA-II storage ring will be performed off-axis in a 4 meters straight section with a single multipole kicker. We present a novel topology for the coils of the injection kicker, named double dipole kicker (DDK). The resulting magnetic field is the superposition of two opposite dipoles, generated by four inner and four outer conductor rods. When the eight rods are powered, the dipole term cancels and the remaining multipole field is used for off-axis injection. Alternatively, when the four inner rods are switched off, an almost pure dipole is produced, that is useful for on-axis injection during the commissioning. A prototype of DDK is presently under design to be installed and tested in the existing ALBA storage ring. The positioning of the rods is calculated in order to maximise the kick efficiency in mrad/kA and minimise the disturbance to the orbit and the emittance of the stored beam. A metallic coating with optimised thickness along the inner ceramic vacuum chamber should provide compensation for the eddy currents induced field in order to minimize the disturbance to the stored beam while ensuring sufficiently low heat dissipation by the beam image currents., Proceedings of the 13th International Particle Accelerator Conference, IPAC2022, Bangkok, Thailand

Published
2022
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45. Inverse Orbit Response Matrix Measurements: A Possible On-Line Tool for Optics Control in Storage Rings

Author

Martí, Zeus, Benedetti, Gabriele, Iriso, Ubaldo, and Morales, Emilio

Subjects
Accelerator Physics, MC6: Beam Instrumentation, Controls, Feedback and Operational Aspects
Abstract

We propose a novel technique to measure the linear optics in storage rings based on the acquisition of the inverse orbit response matrix (iORM). The iORM consists in the orbit correctors magnets (OCM) strength changes needed to produce a local orbit variation in each beam position monitor (BPM). This measurement can be implemented by introducing sequentially small changes in the BPM offsets and logging the OCM setting variations when the orbit correction is running. Very high precision and accuracy in the OCM set-points is required which poses a considerable challenge. Since the orbit feedback (FOFB) is kept running, the iORM could potentially be acquired in parallel to users storage ring operation. Since the iORM is very linear and local, optics perturbations could be easily diagnosed online. This paper introduces the iORM measurement concept and presents the progress of these studies at ALBA, where the implementation of this technique is limited by hysteresis effects in the OCM and the FOFB performance., Proceedings of the 12th International Particle Accelerator Conference, IPAC2021, Campinas, SP, Brazil

Published
2021
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46. A Distributed Sextupoles Lattice for the ALBA Low Emittance Upgrade

Author

Benedetti, Gabriele, Carlà, Michele, Iriso, Ubaldo, Martí, Zeus, and Pérez, Francis

Subjects
Physics::Accelerator Physics, MC2: Photon Sources and Electron Accelerators, Accelerator Physics
Abstract

The first lattice studied in 2019 for the ALBA upgrade was a 7BA lattice with two dispersion bumps, for localised chromatic correction. That lattice had limited dynamic aperture and momentum acceptance. In 2020 we started to explore a different approach to find an MBA lattice with distributed chromatic correction that meets the same emittance goal with larger dynamic aperture and momentum acceptance. The choice of the number of bendings per cell, as well as the tuning of the magnet gradients, is carried out by developing a light weight solver that performs both the emittance and chromaticity optimisation of the arcs and the matching of the linear optics in the straight sections. We present the status of the storage ring upgrade studies, the performance of the new developed lattice, together with the issues related with the injection scheme., Proceedings of the 12th International Particle Accelerator Conference, IPAC2021, Campinas, SP, Brazil

Published
2021
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48. Normal forms for strong magnetic systems on surfaces: trapping regions and rigidity of Zoll systems.

Author

ASSELLE, LUCA and BENEDETTI, GABRIELE

Abstract

We prove a normal form for strong magnetic fields on a closed, oriented surface and use it to derive two dynamical results for the associated flow. First, we show the existence of invariant tori and trapping regions provided a natural non-resonance condition holds. Second, we prove that the flow cannot be Zoll unless (i) the Riemannian metric has constant curvature and the magnetic function is constant, or (ii) the magnetic function vanishes and the metric is Zoll. We complement the second result by exhibiting an exotic magnetic field on a flat two-torus yielding a Zoll flow for arbitrarily weak rescalings. [ABSTRACT FROM AUTHOR]

Published
2022
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