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Davide Masoero
FCT researcher
Formerly at GFM as:
· Post-doc
Degree: Doutoramento / PhD
Department of Mathematics
Faculty of Sciences
Campo Grande, Edifício C6
PT-1749-016 Lisboa
Portugal
Room: 6.2.36
 
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My Curriculum


Davide Masoero's Curriculum Vitae

Personal information
Name: Davide Masoero
Birthdate: December 29, 1982
Spoken languages: Italian, English, Portuguese, German
Current position
From January 2012, Post Doc, Grupo de Fisica Matematica, Univerdade de Lisboa. Scholarship funded by the Fundacao Para a Ciencia e a Tecnologia.
Research Topics
My main area of expertise is the analytic theory of ODEs in the complex plain. In particular I work on topics related to Quantum and Classical integrable systems. For example, in a recent collaboration with Andrea Raimondo and Daniele Valeri we proved that the Stokes multipliers of meromorphic connections with value in the Langlands dual of an affine Lie algebra are solutions of the Bethe Ansatz equations for the generalised quantum KdV model (ODE/IM correspondence). I have also been working on singularities distributions of solutions of Painleve equations and use the Nevanlinna theory to understand fine details of the inverse monodromy problem that are often overlooked in the literature, i.e. the surjectivity of the Riemann-Hilbert correspondence, non generic points, etc.... My other research interests are the Dubrovin's Universality Conjecture for PDEs and applications of WKB approximation to biological models.
Career
November-December 2011: Research Associate, School of Mathematics and Statistics, The University of Sydney.
November 2010 - October 2011 Post Doc, Grupo de Fisica Matematica, Univerdade de Lisboa.
Visiting Positions
Napoli, Dipartimento di Matematica, April-May 2009
Kyoto, Rims, June 2010
Education
October, 2010: PhD in Mathematics at SISSA (Trieste). Thesis: Essays on the Painlevé First Equation and the Cubic Oscillator
Supervisor: Boris Dubrovin, Examiner: Alexander Its
October, 2006: Laurea Specialistica in Fisica delle Interazioni Fondamentali (Second Level Degree in Fundamental Interactions Physics) at the Universita' di Torino, specialized in theoretical physics, cum laude.
Supervisor: Roberto Tateo
September, 2004: Laurea di Primo Livello in Fisica (First Level Degree in Physics) at the Universita' di Torino, cum laude
September, 2003 - August, 2004: Erasmus student at the Heidelberg University, Heidelberg, Germany
July, 2001: Maturita' Classica at the Liceo Classico "G. Arimondi", Savigliano (Cn)
Grants
1 Year Grant (2016/2017) for the project "ODE/IM Correspondence " in collaboration with Dr A. Raimondo. Funded by INDAM in the Framework "Progetto Giovani"
1 Year Grant (2014/2015) for the project "ODE/IM Correspondence and W algebras" in collaboration with Dr A. Raimondo e Dr. D. Valeri. Funded by INDAM in the Framework "Progetto Giovani"
1 Year Grant (2012-2013) for the Project "Singularities of Solutions of KP Equation in the Dispersionless Limit" in collaboration with A. Raimondo, SISSA. Funded by INDAM in the Framework "Progetto Giovani"
3+3 Post Doc Scholarship funded by the Fundacao Para a Ciencia e a Tecnolgia, starting January 2012.
1 Year Grant (2010-2011) for the Project "Dispersionless Limit of Focusing NLS" in collaboration with A. Raimondo. Gran Funded by INDAM in the framework "Progetto GIovani".
Services
Organizer of the Workshop Contemporary Ways in Integrability , 16-19 May 2012, Lisbon.
Member of the Local Organizng Committee of the Conference GDIS 2011 , 10-16 Septmeber 2011, Lisbon.
Co-organizer of the seminar series "Asymptotic analysis", SISSA, 2009-2010
Co-organizer of the seminar series "PDEs of Mathematical Physics. A modern Introduction", Lisbon, 2013-
Publications
Asymptotic analysis of noisy fitness maximization, applied to metabolism and growth D De Martino and D Masoero JSTAT (2016), no. 12 .. Preprint arXiv:1606.09048
Bethe Ansatz and the Spectral Theory of affine Lie algebra-valued connections II. The non simply-laced case D Masoero, A Raimondo, D Valeri. Communications in Mathematical Physics(2017).Preprint arXiv:1511.00895
Bethe Ansatz and the Spectral Theory of affine Lie algebra-valued connections I. The simply-laced case D Masoero, A Raimondo, D Valeri. Communications in Mathematical Physics, 344 (2016), no. 3 . Preprint arXiv:1501.07421
Critical behaviour for scalar nonlinear waves D Masoero, A Raimondo, P R S Antunes. Physica D (2014) arXiv:1312.3880
A deformation of the method of characteristics and the Cauchy problem for Hamiltonian PDEs in the small dispersion limit D Masoero and A Raimondo D Masoero and A Raimondo. International Mathematics Research Notices (2013).Preprint arXiv:1211.2676
Semiclassical approximations of stochastic epidemiological processes towards parameter estimation using as prime example the SIS system with import L. Mateus, P. Ghaffari, U. Skwara, F. Rocha, M.Aguiar , D. Masoero , N. Stollenwerk To appear on Ecological Complexity.
Semiclassical Approximations of Stochastic Epidemiological Processes towards Parameter Estimation Nico Stollenwerk, Davide Masoero, Urszula Skwara, Filipe Rocha, Peyman Ghaffari, Maira Aguiar Proceedings of the 12th International Conference on Mathematical Methods in Science and Engineering.
Painleve I, Coverings of the Sphere and Belyi Functions D Masoero CONSTRUCTIVE APPROXIMATION (2014) upcoming special issue on Painleve equations. Preprint arXiv:1207.4361
Semiclassical limit for generalized KdV equations before the gradient catastrophe D Masoero and A Raimondo Letters in Mathematical Physics (2013) , Preprint arXiv:1107.0461
Y-System and Deformed Thermodynamic Bethe Ansatz D Masoero Letters in Mathematical Physics, Volume 94, Number 2 (2010), 151-164. DOI: 10.1007/s11005-010-0425-1 . Preprint arXiv:1005.1046
Poles of Integrale Tritronquee and Anharmonic Oscillators. Asymptotic localization from WKB analysis D Masoero 2010 Nonlinearity 23 2501. DOI: http://dx.doi.org/10.1088/0951-7715/23/10/008. Preprint arXiv:1002.1042
Poles of integrale tritronquee and anharmonic oscillators. A WKB approach D Masoero J. Phys. A: Math. Theor. 43 095201. DOI: http://dx.doi.org/10.1088/1751-8113/43/9/095201 . Preprint arXiv:0909.5537
Pseudo-differential equations, and the Bethe ansatz for the classical Lie algebras P Dorey, C Dunning, D Masoero, J Suzuki, R Tateo Nuclear Physics, Section B, 2007. http://dx.doi.org/10.1016/j.nuclphysb.2007.02.029 . arXiv: hep-th/0612298
ABCD and ODEs P Dorey, C Dunning, D Masoero, J Suzuki, R Tateo In "New Trends in Mathematical Physics Selected contributions of the XVth International Congress on Mathematical Physics", Springer, 2009. Preprint arXiv:0704.2109
Preprints
A Laplace's method for series and the semiclassical analysis of epidemiological models D Masoero Preprint arXiv:1403.5532
The Direct Monodromy Problem for Painleve - I D Masoero Preprint arXiv:1007.1554
Non-scientific publications
Lo sgombero dei "nomadi" non fa onore al sindaco Lettera a "La Fedeltà"
Talks
The Painlevé first equation, at Department of mathematics of Napoli, 2009.
WKB analysis of poles of solutions to the Painlevé first equation, at "Nonlinear Waves and Integrable Systems", Rome, 2009.
Painlevé first equation, anharmonic oscillators and coverings of the sphere, at "Winter meeting in Lattice Gauge Theories and Integrable Models", Torino, 2009.
Painlevé I, anharmonic oscillators, WKB analysis and Deformed TBA, at "Numerical Solution of Painlevé equations", Edinburgh, 2010.
Painlevé I and the Cubic Oscillator, at "Integrable Systems in Pure and Applied Mathematics", Alghero, 2010.
Poles of integrale tritronquee and cubic oscillators, RIMS, Kyoto, 2010.
Geometry of Monodromy Data and Deformed TBA, Department of Theoretical Physics, Shizuoka, 2010.
Geometry of Monodromy Data and Deformed TBA, at "Recent Developments in Resurgence Theory and Related Topics", Kyoto, 2010.
Y-system and Deformed TBA, at "Einstein", Trieste, 2010.
The (Un)reasonable Effectiveness of the Complex WKB Method, at "Function Theory and Dynamical Systems", UCL, London, 2010.
Painlevé I and the Cubic Oscillator, at Universidade de Lisboa, 2010.
Some results concerning the semiclassical limit of KdV before the gradient catastrophe, at " Completely Integrable Systems and Applications", Vienna, 2011.
Some results concerning the semiclassical limit of KdV before the gradient catastrophe, at "GDIS", Sintra, 2011.
Dispersive shock waves in 1+1 dimension, conjectures and preliminary results, at Universidade de Lisboa, 2011.
Dispersive shock waves in 1+1 dimension, conjectures and preliminary results, at School of Mathematics, Sydney University, 2011.
Dispersive shock waves in 1+1 dimension, conjectures and preliminary results, at "ANZIAM NSW-ACT Meeting", Murramarang Beachfront Nature Resort, New South Wales, Australia, 2011.
Monodromy Data of Painleve I and Nevanlinna Theory, at School of Mathematics, Sydney University, 2011.
Some results concerning the semiclassical limit of (Generalized) KdV before the gradient catastrophe, at "Dispersive Shocks", SISSA, 2012.
Painleve, Nevanlinna and Riemann, at Dipartimento di Fisica Teorica, Torino, 2012.
Painleve, Nevanlinna and Riemann, at "Workshop on Geometric and Analytic Aspects of Integrable Systems", Milano Bicocca, 2012.
Poles of solutions of Painleve I and Belyi functions, at "Frontiers of Nevanlinna Theory 4: Nevanlinna theory and number theory", University College of London, 2012
Painlevé I, (Branched) Coverings of the Sphere and Belyi Functions, at Centre de recherches mathematiques, Montreal, 2012
A deformation of the method of characteristics and the Cauchy problem for Hamiltonian PDEs in the small dispersion limit, at "Nonlinear Waves and Integrable Systems 2013", SISSA, 2013
What is a Hamiltonian Equation?, Lisbon, 2013
KdV as a Completely Integrable Hamiltonian System, Lisbon, 2013
String Equation and Scalar PDEs in the Semiclassical Regime, at "Hamiltonian PDEs, Frobenius Manifolds and Deligne Mumford Moduli Spaces", SISSA, 2013
Universality for Partial Differential Equations, CFTC, Lisbon, 2013
Universality for Partial Differential Equations, CENTRA, Lisbon, 2013. Link to the recorded seminar
Phase Transitions of Nonlinear PDEs and Emerging Integrability, Dip. Matematica, Milano-Bicocca, 2013
Laplace's method for sums and semiclassical population dynamics, at "Fifth Workshop Dynamical Systems Applied to Biology and Natural Sciences s", Lisbon, 2014
Hamilton-Jacobi equation from epidemiological models, at "Workshop on Geometric and Analytic Aspects of Integrable and nearly-Integrable Hamiltonian Systems ", Milano Bicocca, 2014
Universality for Scalar Nonlinear Waves, at "Advances in Mathematical Fluid Mechanics, Stochastic and Deterministic Methods ", Lisbon, 2014
Bethe Ansatz and the Spectral Theory of Affine Lie algebra-valued connections, at Complexo Interdisciplinar, Lisbon, 2015
Bethe Ansatz and the Spectral Theory of Affine Lie algebra-valued connections, at Australian National University, Canberra, 2015
Quantum Anharmonic Oscillators, at The University of Sydney, 2015
Poles of Solutions of Painleve I and II, at The University of Sydney, 2015
Bethe Ansatz and the Spectral Theory of Affine Lie algebra-valued connections, at Integrable Systems 2015, The University of Sydney, 2015
Bethe Ansatz and the Spectral Theory of Affine Lie algebra-valued connections, at Algebra and geometry in integrable systems, The University of Kent, 2015
Bethe Ansatz and Affine Lie algebra-valued connections, at SIDE12 Conference, S. Adele, Quebec, 2016
Algebraic aspects of the ODE/IM correspondenceInstitute Henri Poincare, Paris, 2016
Affine Opers and Bethe Ansatz,, at 3rd Christmas Workshop in Genova, Genova, 2016
Computing the growth rate distribution from metabolism, in E. Coli,at Physics Department of Turin University, 2016
Rational solutions of Painlevé IV, at Asymptotic and computational aspects of complex differential equations, PISA (2017)
Affine Opers with one irregular singularity and the Bethe Ansatz, at Irregular Connections, Character Varieties and Physics Paris VII, 2017
Seminars at Sissa
Type II factors and the Jones' polynomials
Central extensions of loop groups
Finite-gap solutions of the focusing non-linear Schrödinger equation: construction thereof, reality and regularity conditions
Introduction to the Bethe Ansatz for mathematicians: properties of the ground states of the XXZ Heisenberg spin chains
Lee-Yang's circle theorem and the phase transitions of the Ising model (after Ruelle)
Connection formulas for WKB functions
The Cauchy problem with highly oscillating initial data for time-dependent Schrödinger equation
The Riemann-Hilbert Problem for the Focusing NLS

Last updated : March, 2017