Seminars |
Courses |
Brainstormings and study
groups |
Attended conferences |
Upcoming events |

Seminars:

Seminars in Rome

Seminar
bullettin of the Universities of Rome

Seminar
of Analysis and Dynamical Systems (University of "Roma Tre")

- 30 January 2013 h. 11.30. Emanuele Haus: Dynamics on resonant
clusters for the quintic non linear Schroedinger equation

Abstract: We use normal form techniques in order to construct solutions
to the quintic nonlinear Schroedinger equation on the circle with initial conditions supported on
arbitrarily many different resonant clusters. These solutions
exhibit a beating effect between modes belonging to the same cluster. As a corollary we obtain the existence
of solutions that remain quasi-periodic for long times and for a
large set of frequencies, which is a genuinely nonlinear effect. This is a
sequel of the work by Benoit Grebert and Laurent Thomann.

-21 March 2013 h. 14.30. Massimiliano Berti: Hamiltonian PDEs

Abstract: We present new existence results about existence of
quasi-periodic solutions of autonomous Hamiltonian PDEs.

The approach is based on a combination of Nash-Moser and KAM
techniques. We shall emphasize the construction of an approximate inverse for the linearized
operator.

-4 November 2013 h. 16.00 organized by the University of "RomaTre".
Claudio Procesi: Quasi-periodic
orbits: the non linear Schroedinger
equation

Abstract: The notion of quasi-periodic orbit is among the
fundamental ideas in the theory of dynamical systems and it corresponds
to physical phenomena which happens for perturbation of completely
integrable systems (like the solar system). This theory has been
extended also non non linear PDEs which can be thought of as
perturbation of linear equations describing some kind of waves. The
case of non linear Schroedinger equation, when the space dimension is
>1, presents many problems also from the algebraic, geometric and
combinatoric point of view (the rectangles graph) which will be
discussed in this talk.

-12 December 2013 h. 11.00. Massimiliano Berti: KAM for quasi-linear KdV

Abstract: We prove the existence and the stability of Cantor
families of quasi-periodic, small amplitude solutions for quasi-linear
autonomous Hamiltonian and reversible perturbations of KdV and mKdV.
The results are based on a Nash-Moser and KAM techniques for the
reducibility of the linearized operators along the iteration.

- 25 February 2014 h. 14.30. Marcel Guardia (University Paris 7): Nearly
integrable systems with orbits accumulating to KAM tori

Abstract: The quasi-ergodic hypothesis, proposed by Ehrenfest and
Birkhoff, says that a typical Hamiltonian system of n degrees of
freedom on a typical energy surface has a dense orbit. This question is
wide open. In this talk I will explain a recent result by V. Kaloshin
and myself which can be seen as a weak form of the quasi-ergodic
hypothesis. We prove that a dense set of perturbations of integrable
Hamiltonian systems of two and a half degrees of freedom possess orbits
which accumulate in sets of positive measure. In particular, they
accumulate in prescribed sets of KAM tori.

- 5 June 2014 h. 14.30. Zaher Hani (Courant Institute): Energy cascades and wave turbulence for the cubic Schroedinger equation

Abstract: Out-of-equilibrium dynamics are a characteristic feature of
the long-time behavior of nonlinear dispersive equations (PDEs) on
confined domains. Energy cascades and wave turbulence are main aspects
of such out-of-equilibrium dynamics. In this talk, we will start by
explaining what all those concepts mean, why they arise, and the
mathematical problems involved in studying them. Afterwards, we will
describe two main approaches that were adopted to capture
out-of-equilibrium phenomena. The first approach is based on a relation
between energy cascades and the growth of Sobolev norms of solutions.
The second approach is based on deriving "effective equations" for the
dynamics by taking various limits of the original system (this is the
guiding philosophy of wave turbulence theory). We describe some recent
progress on both approaches in joint works with E. Faou, P. Germain, B.
Pausader, L. Thomann, N. Tzvetkov, and N. Visciglia.

-September 1-11 2014: Roman Summer School and Workshop KAM Theory and Dispersive PDEs

-30 December 2014 h. 12.00, Aula G

Livia Corsi (McMaster University) On the persistence of resonant tori

Abstract: t is well known that resonant tori persist for
quasi-integrable Hamiltonian systems under appropriate
non-degeneracy conditions on the perturbation. However a
long-standing conjecture states that such tori persist for any
perturbation provided that it is sufficiently regular. This conjecture
was proved in the case of co-dimension one. We will discuss
recent partial results on the subject and discuss a possible
strategy.

-14 May 2015 h. 15:30, aula G

Luca Biasco (Unversità di Roma Tre)

On the measure of invariant tori in hamiltonian systems

We discuss the measure of (Lagrangian) invariant tori in
nearly-integrable hamiltonian systems. It is well known in KAM theory
that the measure of the complementary of invariant tori (where chaotic
motions possibly occur) is smaller than the sqare root of ε, ε being
the perturbative parameter. A conjecture by Arnold, Kozlov and
Neishtadt claims that such measure is actually of order ε. We prove
that such conjecture holds true for 'general' mechanical systems
(namely systems of the form: kinetic energy plus potential energy).
Joint work with L. Chierchia.

- 26 May 2015 h. 15 A. Maspero (University of Milan) Freezing of energy of a soliton in an external potential.

Abstract: we study the dynamics of a soliton in the generalized NLS
with a small external potential \eV of Schwartz class. We prove that
there exists an effective mechanical

system describing the dynamics of the soliton and that, for any
positive integer r, the energy of such a mechanical system is almost
conserved up to times of order \e^r. In the rotational

invariant case we deduce that the true orbit of the soliton remains close to the mechanical one up to times of order \e^r.

- 2- December 2015 (In Tor Vergata) Vadim Kaloshin (University of Maryland) Stochastic Arnold diffusion in deterministic systems and celestial mechanics

In 1964, V. Arnold constructed an example of a nearly integrable
deterministic system exhibiting instabilities. In the 1970s, physicist
B. Chirikov coined the term for this phenomenon 'Arnold diffusion',
where diffusion refers to stochastic nature of instability. One of the
most famous examples of stochastic instabilities for nearly integrable
systems is dynamics of Asteroids in Kirkwood gaps in the Asteroid belt.
They were discovered numerically by astronomer J. Wisdom. During the
talk we describe a class of nearly integrable deterministic systems,
where we prove stochastic diffusive behaviour. Namely, we show that
distributions given by deterministic evolution of certain random
initial conditions weakly converge to a diffusion process. This result
is conceptually different from known mathematical results, where
existence of 'diffusing orbits' is shown. This work is based on joint
papers with O. Castejon, M. Guardia, J. Zhang, and K. Zhang.

-19 February 2016 Livia Corsi (Mc Master) An Abstract KAM theorem

Abstract: I'll discuss an abstract KAM result on the existence of
invariant tori for possibly infinite dimensional dynamical systems.

Differently from the classical Moser's approach, I'll show that in
principle there is no need to impose the second Mel'nikov conditions
but only to invert (in some appropriate norm) the linearized operator
in the normal directions: in particular this means that the serious
technical difficulties in small divisors problems are those appearing
in forced cases.The latter statement is commonly believed to be true:
the main purpose is indeed to prove it under the weakest possible
assumptions.

The result is obtained in collaboration with R. Feola and M. Procesi.

-26 April 2016 Michela Procesi (Universita di Roma Tre) Quasi-periodic solutions with beating effects for the NLS on tori

I will discuss the existence and linear stability of classes of
solutions for the NLS on a torus. I will concentrate on quasi-periodic
solutions which arise from the resonances of the NLS normal form and
exhibit a periodic transfer of the Sobolev norm between Fourier modes.
This is a joint work in progress with E. Haus.

- 5 May 2016 Emanuele Haus (Napoli Federico II) Growth of Sobolev norms and beating effects for the NLS on tori

We prove existence of solutions to some NLS on tori
exhibiting different qualitative behavior. On the one hand we
construct solutions which undergo an arbitrarily large growth of the
Sobolev norms for analytic NLS equations on T^2, on the other hand we
construct quasi-periodic solutions with recurrent transfer of energy
between the Fourier modes for the quintic NLS on the circle.

- 18 October 2016 Filippo Giuliani (SISSA) **Quasi-periodic solutions for quasilinear generalized KdV equations **We
prove the existence of Cantor families of small amplitude, linearly
stable, quasi-periodic solutions of quasi-linear autonomous Hamiltonian
generalized KdV equations. We consider the most general quasi-linear
quadratic nonlinearity. The proof is based on an iterative Nash-Moser
algorithm. To initialize this scheme, we need to perform a bifurcation
analysis taking into account the strongly perturbative effects of the
nonlinearity near the origin. In particular, we implement a weak
version of the Birkhoff normal form method. The inversion of the
linearized operators at each step of the iteration is achieved by
pseudo-differential techniques, linear Birkhoff normal form algorithms
and a linear KAM reducibility scheme.

-14 September 2016 Livia Corsi (Georgia Tech) **Locally integrable non-Liouville analytic geodesic flows on T^2 **A
metric on T^2 is said to be ``Liouville" if in some coordinate system
it has the form ds^2 = (g_1(q_1) + g_2(q_2)) (dq_1^2 + dq_2^2); a
``folklore conjecture" states that if a metric is locally integrable
then it is Liouville. I will present a counterexample to this
conjecture.

This is a joint work with V. Kaloshin

-29 September 2016 Massimiliano Berti (SISSA) **Almost global existence of periodic capillarity-gravity waves** We
present long time existence results for the solutions of
gravity-capillary water waves equations with small initial periodic
data. The proof is based on a paradifferential reduction of the
equations and a Birkhoff normal form analysis. Joint work with J.M
Delort.

- 20 December 2016 Livia Corsi (Georgia Tech) Periodic driving at high frequencies of an Impurity in the Isotropic XY chain I'll consider the isotropic XY chain with a transverse magnetic field acting on a single site and analyse the long time behaviour of the time-dependent state of the system when a periodic perturbation drives the impurity. I'll show that for high frequencies the state approaches a periodic orbit synchronised with the forcing and provide the explicit rate of convergence to the asymptotics. This is a joint work with G. Genovese (organized by the math. Phys group)

- 5 April 2017 Nikolaos Karaliolios (Imperial College) **KAM normal form for quasi-periodic cocycles in TxSU(2) and spectral dichotomy.**We
will recall the application of the KAM machinery as it was
applied by H. Eliasson and R. Krikorian (among others) to the
problem of the (almost) reducibility of such systems. We will
subsequently present an (almost) complete classification of the
KAM regime, based on the KAM normal form, and, if time permits,
sketch the proof of spectral dichotomy: a cocycle in the KAM
regime has either pure point spectrum or a maximal component of
singular continuous spectrum in the fibers.

- 19-07-2017 Alessandra Fuse'

Quasiconvexity of the Hamiltonian for non Harmonic or non Keplerian central potentials

In this talk we study the Hamiltonian of the planar central
motion with a real analytic potential. We prove that the corresponding
Hamiltonian, when written in action angle variables, is almost
everywhere quasiconvex, the only exceptions being the Keplerian and the
Harmonic potentials. We underline that this two potentials are
the ones discussed by Bertrand’s theorem.

We also study the spatial central motion problem and deduce a Nekhoroshevtype stability result for the perturbed system.

This is a joint work with D. Bambusi and M. Sansottera.

- 28-09-2017 J.P Marco Integrability and complexity of geodesic
flows on ellipsoids : from the finite dimensional case to the infinite
dimensional one

Starting from the geodesic flow on finite dimensional Euclidean
ellipsoids, for which we will recall the classical constructions of
complete sets of first integrals and describe their singularities and
dynamical complexity, we will examine the possibility of extensions to
the infinite dimensional case. This could possibly make a bridge
between integrability in the finite dimensional Hamiltonian case and
that of Hamiltonian PDE's.

-22-11-2017 - 16:00

Shidi Zhou (Roma tre) An infinite dimensional KAM theorem with application to 2-d completely resonant beam equation

In this talk we shall consider the 2-dimensional completely
resonant beam equation with cubic nonlinearity on Tˆ2. We prove the
existence of the quasi-periodic solutions, which lie in a special
subspace of Lˆ2 (Tˆ2). We view the equation as an infinite dimensional
Hamiltonian system, and write the Hamiltonian of the equation as an
angle-dependent block-diagonal normal form plus a small perturbation
with some regularity. By establishing an abstract KAM theorem, we prove
the existence of a class of invariant tori of this system, which
implies the existence of a class of small-amplitude quasi-periodic
solutions of the equation. In the KAM iteration, the measure estimate
is reached by making use of the regularity of the nonlinearity.

- 6-12-2017 Stefano Pasquali

Dynamics of the nonlinear Klein-Gordon equation in the nonrelativistic limit

We study the the nonlinear Klein-Gordon (NLKG) equation on a
manifold M in the nonrelativistic limit (as the speed of light
coinfty). We consider a higher-order normalized approximation of NLKG
(corresponding to the NLS at order r=1), and prove that when M is a
smooth compact manifold or Rd, the solution of the approximating
equation approximates the solution of the NLKG locally uniformly in
time. When M=Rd, dgeq2, we prove that for rgeq2 small radiation
solutions of the order r normalized equation approximate solutions of
the nonlinear NLKG up to times of order cO(c2(r−1)).

-14 dec 2017 Filippo Giuliani Quasi-periodic solutions for Hamiltonian perturbations of the Degasperis-Procesi equation

I present a new result
on the existence and the stability of small amplitude quasi-periodic
solutions for Hamiltonian perturbations of the Degasperis-Procesi
equation under periodic boundary conditions.

These solutions are constructed by a hard Implicit Function Nash-Moser
Theorem, based on a Newton-type algorithm. The main issue in
implementing this iterative scheme is the inversion of the
linearized operator in a neighborhood of the origin. The analysis of
the linearized operator requires to solve quasi-periodic transport
equations and to exploit some pseudo differential calculus techniques.

To initialize the Nash-Moser scheme we need to perform a bifurcation analysis by means of a Birkhoff normal form procedure.

The Degasperis-Procesi equation presents some non trivial Birkhoff
resonances and we show how to overcome this problem by exploiting the
integrability of the unperturbed system.

This is a joint work with Roberto Feola and Michela Procesi.

-03-07-2018 Roberto Feola (SISSA) Birkhoff Normal Form and long time existence for periodic gravity water waves

We consider the gravity water waves system with a periodic
one-dimensional interface in infinite depth and give a rigorous proof
the conjecture of Zakharov and Dyachenko. More precisely, we provide a
reduction of the equations to Birkhoff normal form and prove the
integrability of the water waves Hamiltonian up to order four. As a
consequence, we also obtain a long-time stability result for periodic
solutions: perturbations of a flat interface that are of size e
in a standard Sobolev space lead to solutions that remain regular
and small up to times of the order e−3.

To our knowledge, this is the first such long-time existence result for
quasilinear systems in the periodic setting.Indeed, despite the absence
of external parameters, our result goes past the natural e−2 scale
which one expects for non-quadratically resonant Hamiltonian systems,
such as gravity water waves.The main difficulties in the proof are the
quasilinear nature of the equations, the presence of small divisors
arising from near (trivial) resonances,and of many non-trivial resonant
four-way interactions, the so-called Benjamin-Feir resonances.

Seminars in Naples

- 20-23 november 2012 Riccardo Montalto (SISSA, Trieste) cycle of seminars on: KAM theory for quasi-linear Hamiltonian equations of KdV type

- 29 November 2012 h. 11.30. Livia Corsi: An upper bound for the growth of higher Sobolev norms for periodic NLS

Abstract: We shall expose a recent result by Colliander-Kwon-Oh on the
growth of higher Sobolev norms for periodic NLS; they prove a bound
which is polynomial in time: in particular they improve the exponents
with respect to those already known in the literature.

- 9 May 2013 h. 14.00. Emanuele Haus: Dynamics on resonant
clusters for the quintic non linear Schroedinger equation

Abstract: We use normal form techniques in order to construct solutions
to the quintic nonlinear Schroedinger equation on the circle with initial conditions supported on
arbitrarily many different resonant clusters. These solutions
exhibit a beating effect between modes belonging to the same cluster. As a corollary we obtain the existence
of solutions that remain quasi-periodic for long times and for a
large set of frequencies, which is a genuinely nonlinear effect. This is a
sequel of the work by Benoit Grebert and Laurent Thomann.

- June 2013 Philippe Bolle (Avignon):

- 26-29 November 2013 Prof. Massimilano Berti (SISSA, Trieste) cycle of seminars on: KAM theory for quasi-linear Hamiltonian equations of KdV type

- 14 May 2014 h. 15. Thierry Paul (Ecole Polytechnique): Quantum singular complete integrability

Abstract: We consider some perturbations of a family of pairwise commuting linear
quantum Hamiltonians on the torus with possibly dense pure point
spectra. We prove that the Rayleigh-Schrï¿½dinger perturbation series converge
near each unperturbed eigenvalue under the form of a convergent quantum
Birkhoff normal form. Moreover the family is jointly diagonalised by a common unitary
operator explicitly constructed by a Newton type algorithm. This
leads to the fact that the spectra of the family remain pure
point. The results are uniform in the Planck constant near zero. The
unperturbed frequencies satisfy a small divisors condition (including
the Diophantine case) and we explicitly estimate how this condition can
bereleased when the family tends to the unperturbed one.

PHD level

PhD Course by
M. and
C. Procesi:
KAM theory and Dynamical
systems.

starting 26 March 2013 every Tuesday h. 11-13 aula B dept.
of math.

Program:

Symplectic formalism and analytical mechanics.

Darboux's theorem.

Classification of quadratic Hamiltonians.

Completely integrable systems.

Liouville-Arnold theorem.

Classic examples.

Near-integrable systems.

Perturbation theory and Birkhoff normal form.

KAM theorem.

n-body problem.

Lower dimensional invariant tori.

Applications to non-linear PDEs.

References:

- Moser-Zehnder, Notes on dynamical systems

- Gallavotti, Meccanica Analitica

- Poeschel, On elliptic lower dimensional tori in Hamiltonian
systems. Math. Z. 202 (1989) 559-608

PhD- Master Course by M. Procesi: ODEs

Program:

Local existence and uniqueness theorems.

Systems of linear equations

Periodic solutions Floquet theory

Perturbation theory and Birkhoff normal form.

Reducibilty

**Master-PhD Course by M. Procesi** Small divisor problems March- July 2017 .

Kam theory for finite dimension. Reducibility. Going to infinite dimensions.

Specialized Mini-courses for phD and post-docs:

Mini-Course by E. Haus: Growth of Sobolev norms for the NLS.

the course consists of six lectures Wednesdays room B 11-13 starting on
April 18, 2013.

Abstract: We consider the defocusing cubic NLS on a
bidimensional
torus. We prove the existence of solutions whose H^s Sobolev norm grows
arbitrarily in time.

We refer to the papers by Guardia-Kaloshin and J. Colliander, M.
Keel, G. Staffilani, H. Takaoka and T. Tao.

Mini-Course by L.
Corsi: An
abstract
Nash-Moser theorem with applications to existence of quasi-periodic
solutions for PDEs on compact homogeneous manifolds. the course
consists of three lectures room G 11-13 starting July 8, 2013.

Abstract: We will present an
abstract Nash-Moser scheme which allows us to find zeros of
functionals on sequence spaces. A fundamental tool is a
multi-scale
method which allows us to give good bounds on the inverse of the
functional linearized at an approximate solution.

Mini-Course by L.
Corsi: The
multiscale Proposition. the course consists of two lectures room
C 11-13 starting November 8, 2013.

Abstract: I will present in
all the details the multiscale Proposition, which allows to deduce
"good bounds" (in high Sobolev norm) of the inverse of a linear
operator from bounds on its L^2 norm and the so-called separation of
the bad sites.

Organized by the University of "Roma Tre": Mini-Course by V.
Kaloshin: Arnol'd Diffusion via
Invariant Cylinders and Mather Variational Methods. 16-17 April
2014.

Abstract: The famous ergodic hypothesis claims that a typical
Hamiltonian dynamics on a typical energy surface is ergodic. However,
KAM theory disproves this. It establishes a persistent set of positive
measure of invariant KAM tori. The (weaker) quasi-ergodic hypothesis,
proposed by Ehrenfest and Birkhoff, says that a typical Hamiltonian
dynamics on a typical energy surface has a dense orbit. This question
is wide open. In early 60th Arnold constructed an example of
instabilities for a nearly integrable Hamiltonian of dimension n > 2
and conjectured that this is a generic phenomenon, nowadays, called
Arnold diffusion. In the last two decades a variety of powerful
techniques to attack this problem were developed. In particular, Mather
discovered a large class of invariant sets and a delicate variational
technique to shadow them. In a series of preprints: one joint with P.
Bernard, K. Zhang and one with K. Zhang and one with M. Guardia we
prove strong form of Arnold's conjecture in dimension n=3.

in Naples: Mini-Course by A. Maiocchi: Stochastic partial differential equations and averaging theorem

Lunedi 20 ore 16-18 (aula E)

Martedi 21 ore 15-17 (aula da definire)

Mercoledi 22 ore 11-13 (aula da definire)

Giovedi 23 ore 10-12 (aula da definire)

Venerdi 24 ore 15-17 (aula da definire).

The first part of the course (6 hours) provides an introduction to
partial differential equations with stochastic forcing: we present some
facts abut the Brownian motion, the convergence of families of
measures, the notions of strong and weak solutions for stochastic PDEs
and the relation between weak solution and the martingale method.

In the second part (4 hours) we show how to get an averaging theorem
for resonant stochastic PDEs, explaining the techniques and the results
through some examples.

** **

Brainstormings and study groups:

- 15 January 2013: First meeting of the study group on: Almost-periodic
solutions for the NLS.

Descriveremo la letteratura nota (tutta riguardante PDE con parametri esterni), e discuteremo quindi alcune idee e possibili strategie per dimostrare l'esistenza di soluzioni almost-periodiche nel caso di PDE senza parametri esterni come per esempio la NLS.

-15/18 January 2013 Study
group (with L. Biasco and M. Berti) Quasi-periodic solutions for
KdV. The purpose is to analyze the recent ideas on quasi-linear PDEs
and in particular possible applications to the DNLW.

- 2-5 July 2013: Informal group meeting and brainstorming in Sabaudia
(LT).

- Sept 2013 (in Naples): Multiscale analysis and quasi-periodic solutions for PDEs. The purpose is to introduce the multiscale methods (as proposed by Berti/Bolle in the Sobole context)

with an eye to generalizations to compact manifolds.

- Oct. 2013 (in Naples): Degenerate Birkoff Normal Forms in Celestial Mechanics. We give an introduction to the problem.

- 24-28 February 2014: Intensive study group (with M. Guardia) on: Growth of Sobolev norms for the NLS. Part I

The project is to generalize the results by the I-Team and Kaloshin Guardia to higher order NLS equations.

- March/April 2014 (with B. Wilson): Normal forms and stability of plane wave solutions for the NLS.

We shall study the recent paper by Erwan Faou, Ludwig Gauckler, Christian Lubich on the stability of plane waves for the NLS with the purpose of generalizing to higer degree.

- April 2014 (with B. Wilson): Introduction
to KAM theory. A brief introduction to the methods of KAM theory thought mainly for team members.

- 10 April 2014: Analytic
solutions for the Degasperis-Procesi equation.

The recent results on
quasi-periodic solutions for quasi-linear PDEs on the circle are up to
now limited to solutions with Sobolev regularity. We propose to study
analytic solutions for a quasi linear first order PDE.

- 3-6 June 2014: Intensive study group (with Z. Hani) on: Weak turbulence and unstable KAM tori for the NLS.

We would like to
generalize the results of the I-team to prove instability not only
close to zero, but also close to other global solutions (say
quasi-periodic ones).

- 12-20 July 2014: Informal group meeting and brainstorming in Sabaudia
(LT).

- 17-21 November 2014: Intensive study group (with M. Guardia) on: Growth of Sobolev norms for the NLS. Part II

The project is to generalize the results by the I-Team and Kaloshin Guardia to higher order NLS equations.

- December 2014: Study group on: Reducibility, KAM theory and quasi-linear PDEs. Part I

We shall discuss the
method proposed by Baldi-Berti and Montalto for existence
and stability of quasi-periodic solutions for PDEs. The idea is to try
to formalize the method in a more abstract way.

- 25-27 February 2015: Intensive study group on: Reducibility, KAM theory and quasi-linear PDEs. Part II

We shall discuss the method proposed by Baldi-Berti and Montalto for existence and stability of quasi-periodic solutions for PDEs. The idea is to try to formalize the method in a more abstract way.

- 27-30 April 2015: Study group on: Secondary tori for the quintic NLS. Part I.

We wish to construct secondary tori where one can see an exchange of energy between modes.

-9-13 November 2015: Study group on: Growth of Sobolev norms for the NLS near a one-dimensional solution, part I

We would like to generalize the results of the I-team to prove instability not only close to zero, but also close to other global solutions (say quasi-periodic ones). The first step is to work on the finite-gap solutions.

-13-23 December 2015: Study group on: Reducibility, KAM theory and quasi-linear PDEs. Part III (with L. Corsi)

We shall discuss the method proposed by Baldi-Berti and Montalto for existence and stability of quasi-periodic solutions for PDEs. The idea is to try to formalize the method in a more abstract way.

-20-22 January 2016: Study group on: Secondary tori for the quintic NLS. Part II

We wish to construct secondary tori where one can see an exchange of energy between modes.

-8-12 February 2016: Study group on: Reducibiliy of the 2 dimensional NLS at a one dimensional solution (with A. Maspero)

We study resonant BNF for the two dimensional NLS close to a one dimensional solution.

-15-23 February 2016 Study group on: Reducibility, KAM theory and quasi-linear PDEs. Part IV (with L. Corsi and R. Feola)

We shall discuss the method
proposed by Baldi-Berti and Montalto for existence and stability of
quasi-periodic solutions for PDEs. The idea is to try to formalize the
method in a more abstract way.

-2-6 May 2016: Study group on: Secondary tori for the quintic NLS. Part III

We wish to construct secondary tori where one can see an exchange of energy between modes.

-20-24 June 2016: Intensive study group: Growth of Sobolev norms for the NLS near a one-dimensional solution, part III (with M.Guardia, Z. Hani and A. Maspero)

We generalize the results of the I-team to prove instability not only close to zero, but also close to other global solutions (say quasi-periodic ones). The first step is to work on the finite-gap solutions.

-30 Aug.- 02 Sept. 2016: Study group Pseudo differential calculus and reducibility on the line (with R. Montalto)

The method proposed by
Baldi-Berti and Montalto for existence and stability of
quasi-periodic solutions for PDEs is taylored for approaching PDEs on
the circle. We wish to understand possible generalizations to the line.

- December 2016: Reducibility, KAM theory and quasi-linear PDEs. Part V (with L. Corsi and R. Feola)

We shall discuss the method
proposed by Baldi-Berti and Montalto for existence and stability of
quasi-periodic solutions for PDEs.

We formalize the
method in a more abstract way and hence prove existence of analytic
solutions. We also discuss the connection between formal and converging
BNF in the context of quasi-linear PDEs.

-7-14 May 2017: Growth of Sobolev norms for the NLS near a one-dimensional solution, part IV (with Z. Hani and E. Haus)

We generalize the results of the I-team to prove instability not only close to zero, but also close to other global solutions (say quasi-periodic ones). The first step is to work on the finite-gap solutions.

-10-14 July 2017 Reducibiliy of the 2 dimensional NLS at a one dimensional solution, part II (with A. Maspero)

We study resonant BNF for the two dimensional NLS close to a one dimensional solution.

-27 sett - 2 ott 2017 Liouville integrability in infinite dimensions (with J.P. Marco).

We discuss the concept of integrability and of infinite dimensional tori from a more geometric viewpoint.

-24-27 ott 2018 the DP equation
(with R. Feola and F. Giuliani). Study group on the construction of
quasi-periodic solutions for the DP equation. We are finally finishing
the paper!

-28-30 ott 2018 Quasi-toplitz matrices and pseudo-differential operators in 2d tori (with
A. Maspero). Up to now there are very few results on reducibility on
higher dimensional tori. We discuss this problem and revisit
quasi-Toplitz matrices in this context.

**Collaborations :**

**-31/1 to 26/2 2015 McMaster Unversity (collaboration with former team member L. Corsi)**

**we worked on the ongoing project regarding an abstract KAM/NashMoser scheme
**

- 20-30 June 2016 IMCCE, Observatoire de Paris (collaboration with ASD group)

discussions over the problem of persistence of Diophantine tori in the context of diffeomorphisms, in any dimension. Part I

This brought to the generalization in any dimension of a seminal
result of Russmann (the theorem of the translated curve, that, so far,
was stated and known only in dimension 2) together with a version,

new in this discrete time frame of the counter-term theorem of Moser (1967).

- 7 July - 5 August 2016 IMCCE, Observatoire de Paris (collaboration with ASD group)

discussions over the problem of persistence of Diophantine tori in the context of diffeomorphisms, in any dimension. part II

- 23-27 Jan 2017 Paris 7 University Denis Diderot (collaboration with B. Fayad)

collaboration over the problem of persistence of invariant tori in
non necessarily Hamiltonian systems under a very general dissipative
effects

(this shall bring to the generalization of known results where both
a Hamiltonian structure and particular dissipative terms are taken into
account) Part 1

- 10/17 April 2017 Georgia Tech (seminar and collaboration with L. Corsi).

We discussed the relation between formal BNF and the convergent one. We started an ongoing project on billiards.

- Zurich ITS-ETH 25-27 April 2017 (seminar and collaboration with R. Montalto and V. Kaloshin)

We discussed recent results on the nonlinear stability of finite-gap solutions in the 2D cubic NLS.

-Université Nice Sophia Antipolis - April 2018 Séminaire de Systèmes Dynamiques.

J. Massetti held a seminar on the topic of almost-periodic solutions for NLS.

-InstitutMathématique de Jussieu PRG - Université Paris 7 et 6, 19-23 March 2018 Séminaire de Systèmes Dynamiques.

J. Massetti held a seminar on the topic of almost-periodic
solutions for NLS + collaboration with B. Fayad over the persistence of
normally hiperbolic tori part 2

- Università degli Studi di Roma Torvergata, december 2017 Seminario di equazioni differenziali

J. Massetti held a seminar on the topic of almost-periodic solutions for NLS

- Imperial College, London, March 2017 invited talk at Aspects of Dynamical Systems conference

J. Massetti held a seminar on the topic of generalization of Russmann translated curve theorem.

**Attended conferences (**both as participants or invited speakers**):**

- "Dynamique et EDP", Marseille (France), November 2012.

- Winter school "Dynamics and PDEs", St. Etienne de Tinee
(France), February 2013.

- "Conference on Dynamics of Differential Equations", Atlanta (Georgia,
USA), March 2013.

- "Conference HANDDY 2013 - Hamiltonian and Dispersive Equations",
Marseille (France), June 2013.

- "Planetary motion, satellite dynamics and Spaceship orbits", Montreal
(Quebec, Canada), July 2013.

- "16th General Meeting of the European Women in Mathematics", Bonn
(Germany), September 2013.

- "CELMEC VI - The Sixth International Meeting on Celestial Mechanics",
Viterbo (Italy), September 2013.

- "Finite and infinite-dimensional Hamiltonian systems", Rome (Italy),
October 2013.

- "Conference on Hamiltonian PDEs: Analysis, Computations and
Applications", Toronto (Ontario, Canada), January 2014.

- Winter school "Dynamics and PDEs", St. Etienne de Tinee (France),
February 2014.

- SPT2014 "Symmetry and Perturbation Theory", Cala Gonone (Italy), May 2014.

- JISD2014 "Jornades d'Interaccio entre Sistemes Dinamicos i Equacions en Derivades Parcials", Barcelona (Spain), June 2014.

- Geometric and Analytic Aspects of Integrable and nearly-Integrable Hamiltonian Systems, University of Milano-Bicocca (Italy), 18-20 June 2014.

- 10th AIMS conference on Dynamical Systems, differential equations and applications. Madrid, spain. July, 7--11.

- International Congess of Mathematicians, Seoul (Korea) Aug. 2014 (team member G. Pinzari is among the invited speakers!).

- Symplectic Techniques in Topology and Dynamics. Colonia, Germany. September, 22-- 26

-Symposium on Mathematical Physics. University of Z\"uric. nov. 10--11.

- Workshop "Dynamics and PDEs", Cargese (Corsica, France) 11-14 November 2014.

- KAM and Dispersive Methods in PDEs, Milano (Italy) 1-5 December 2014.

- Two-day meeting in honor of Antonio Ambrosetti, Venezia (Italy) 14-15 December 2014.

- The Conference on Hamiltonian Dynamical Systems, Fudan University in Shanghai (China), 4-10 January 2015.

- "Sixth Itinerant Meeting in PDEs" Trieste, 14-16 January 2015.

- Winter School "Dynamics and PDEs", Saint Etienne de Tinee (France), 2-6 February 2015.

- Summer school "Normal forms and large time behavior for nonlinear PDE", Nantes (France), 22 June-3 July 2015.

-Minisymposium on "Celestial Mechanics". Equadiff conference. Lyon, July 6-10, 2015.

-St Petersburg Hamiltonian systems and their applications June 3-8, 2015 A. Maspero was a young invited speaker.

-Conference on Dynamical Systems

at ICTP, Trieste, July 27 - August 07, 2015.

-European Women in Mathematics. Cortona. August, 31- sept., 4 2015

-Convegno Umi. Siena, 1Stt. 2015

-Hamiltonian systems and celestial mechanics, Oaxaca, Mexico September 6-11, 2015

BIRS, workshops.

- Summer school "Normal forms and large time behavior for nonlinear PDE", Nantes (France), 22 June-3 July 2015.

-SIAM Converence Analysis and PDEs, Scottsdale (USA), 7-10 Dec 2015

- Dynamics of Evolution Equations, CIRM -Luminy (France) March 21-25, 2016

- The 11th AIMS Conference on Dynamical Systems, Differential Equations and Applications, Orlando, Florida, USA, July 1 - July 5, 2016

- NonLinear Waves 2016 Summer school, 18-29 Luglio 2016

- Hamiltonian Dynamics PDEs and Waves on the Amalfi coast, Maiori, Italy 5-11 Sept. 2016

- Double resonances in Arnold's diffusion, Mini course by V. Kaloshin and J-P. Marco at IHP, Paris, 12-16 december, 2016

- Winter School in Conservative Dynamics, Engelberg, Swizerland, 5-12 February, 2017

- Aspects of Dynamical Systems, Imperial College, London, 16-18 March, 2017

- Dynamics and PDEs St Etienne de Tinee 30 Jan. 3 Feb. 2017

--Analysis and Dynamics, Patù (Lecce) October 2017 (organized by the project)

-ETH-CSF Conference on Hamiltonian Dynamics, November 2017 Conference in memory of John N. Mather. Ascona, Swizerland

-Recent advances in Hamiltonian dynamics and symplectic topology, February 2018 Padova.

- Bekam International Meeting 2018, from May 07th to May 11th 2018 in Cargèse (France).

- Symmetry and Perturbations theory 2018, from June 03 to June 10 in Pula (Sardinia, Italy).

- Perspective in Hamiltonian Dynamics, from June 18 to June 22 in Venice.

-16TH SCHOOL ON INTERACTIONS BETWEEN DYNAMICAL SYSTEMS AND PARTIAL DIFFERENTIAL EQUATIONS, from June 25 to June 29 2018, CRM Barcelona (Spain). M. Procesi held one of the courses.

- Workshop INdAM 2018, Linear and Nonlinear Wave Phenomena:
Stability, propagation of regularity and Turbulence, from September 9
to September 14 in Cortona (Tuscany, Italy).