Publications

  • Local well-posedness of the equations governing the motion of a fluid-filled elastic solid
    in Res. Math. Sci. 12, (2025) Paper No. 73, 43 pp.. arXiv, ๐Ÿ“–

  • On periodic motions of a harmonic oscillator interacting with incompressible fluids
    with M. Mohebbi, in Phys. D 467, (2024) Paper No. 134259, 9 pp.. arXiv, ๐Ÿ“–

  • Stability and long-time behaviour of a rigid body containing a damper
    with E. Arsenault, in Acta Mech. 234(11), (2023) 5581-5601. arXiv, ๐Ÿ“–

  • Rough sound waves in 3D compressible Euler flow with vorticity
    with M.M. Disconzi, C. Luo C. and J. Speck, in Sel. Math. New Ser. 28 , (2022) Article No.: 41, 153 pp.. ๐Ÿ“–

  • On the free rotations of rigid bodies with a liquid-filled gap
    in J. Math. Anal. Appl. 496(2), (2021) Paper No. 124826, 37 pp.. arXiv, ๐Ÿ“–

  • Nonlinear stability analysis of a spinning top with an interior liquid-filled cavity
    with G.P. Galdi, in Math. Model. Nat. Phenom. 16, (2021) Paper No. 22, 21 pp.. arXiv, ๐Ÿ“–

  • A maximal regularity approach to the study of motion of a rigid body with a fluid-filled cavity
    with J. Prรผss and G. Simonett, in J. Math. Fluid Mech. 21(3), (2019) Article No. 44, 20 pp.. arXiv, ๐Ÿ“–

  • On the motion of a fluid-filled rigid body with Navier boundary conditions
    with J. Prรผss and G. Simonett, in SIAM J. Math. Anal. 51(3), (2019) 1582-1606. arXiv, ๐Ÿ“–

  • On the motion of a liquid-filled heavy body around a fixed point
    with G.P. Galdi and M. Mohebbi, in Quart. Appl. Math. 76(1), (2018) 113-145. ๐Ÿ“–

  • Stability and long-time behavior of a pendulum with an interior cavity filled with a viscous liquid
    with G.P. Galdi, in RIMS Kรดkyรปroku Proceedings No. 2058: Mathematical Analysis of Viscous Incompressible Fluid, (2017) 90-107. arXiv๐Ÿ“–

  • Inertial motions of a rigid body with a cavity filled with a viscous liquid
    with K. Disser, G.P. Galdi and P. Zunino, in Arch. Rational Mech. Anal. 221(1), (2016) 487-526. ๐Ÿ“–

  • On the motion of a pendulum with a cavity entirely filled with a viscous liquid
    with G.P. Galdi, Chapter in Recent progress in the theory of the Euler and Navier-Stokes Equations, London Mathematical Society Lecture Note Series: 430, Cambridge University Press, (2016) 37-56. ResearchGate, ๐Ÿ“–

  • On the motion of a liquid-filled rigid body subject to a time-periodic torque
    with G.P. Galdi and M. Mohebbi, Chapter in Recent Developments of Mathematical Fluid Mechanics, Series: Advances in Mathematical Fluid Mechanics, Springer Basel, (2016) 233-255 . ๐Ÿ“–

  • Inertial motions of a rigid body with a cavity filled with a viscous liquid
    with G.P. Galdi and P. Zunino, in Comptes Rendus Mรฉcanique 341, (2013) 760-765. ๐Ÿ“–

  • On the interpolation of discontinuous functions
    with M. Campiti and C. Tacelli, in J. Approx. Theory 164, (2012) 731-753. arXiv, ๐Ÿ“–

  • Approximation of cosine functions and Rogosinski type operators
    with M. Campiti and C. Tacelli, in Stud. Univ. BabeลŸ-Bolyai Math. 56, (2011) 261-272. ๐Ÿ“–

  • Behavior of bivariate interpolation operators at points of discontinuity of the first kind
    with M. Campiti and C. Tacelli, in Note Mat. 31(1), (2011) 43-66. arXiv, ๐Ÿ“–

Preprints

  • Trace regularity of solutions to the Navier equations
    with J. T. Farin, submitted (2025), 25pp. arXiv

  • Asymptotic stability of solutions to semilinear evolution equations in Banach spaces
    with F. Cellarosi and A. Dutta, submitted (2025), 40 pp. arXiv

  • Rough sound waves in 3D compressible Euler flow with vorticity
    with M.M. Disconzi, C. Luo C. and J. Speck, (2019). arXiv
    This version of our article closely matches the published version, which features some corrections and an abbreviated introduction. As in the published version, here we refer readers to the first arXiv version for an extended introduction that features some additional background material.

  • Inertial motions of a rigid body with a cavity filled with a viscous liquid
    with G.P. Galdi and P. Zunino, (2014). arXiv