GEORGE N. MAKRAKIS
Department of Applied Mathematics
University of Crete, Heraklion
P.O. Box 2208
GR 710 03 Heraklion, Crete Greece
Institute of Applied and Computational Mathematics (IACM)
Foundation for Research & Technology-Hellas (FORTH)
Nikolaou Plastira 100, Vassilika Vouton,
GR 700 13 Heraklion, Crete
Greece Contact info: tel. Dept.Appl. Math., Univ. Crete: +30 2810 393708
tel. IACM-FORTH: +30 2810 391777
fax +30 2810 393701 Email: firstname.lastname@example.org (or email@example.com )
Curriculum vitae (CV)
Mechanics, acoustics, geophysics
Applied partial differential equations
Selection of publications
G.A. Athanassoulis and G.N. Makrakis ,
"A function-theoretic approach to a two-dimensional wave-body interaction problem",
Applicable Analysis, Vol. 54, No. 3-4, pp. 283-303, 1994.
T. Katsaounis, G.T. Kossioris and G.N. Makrakis,
"Computation of high-frequency fields near caustics",
Mathematical Methods and Models in Applied Sciences, Vol. 11, No. 2, pp. 1-30, 2001.
M. Ikehata, G.N. Makrakis and G. Nakamura,
"Inverse boundary value problem in ocean acoustics",
Mathematical Methods in Applied Sciences, Vol. 24, pp. 1-8, 2001.
S. Filippas and G.N. Makrakis,
"Semiclassical Wigner function and geometrical optics",
SIAM MultiscaleModeling & Simulation, Vol. 1, No.4, pp.674-710, 2004.
S. Yu. Dobrokhotov, G. N. Makrakis, V. E. Nazaikinskii and T. Ya. Tudorovskii,
"New formulas for Maslov’s canonical operator in a neighborhood of focal points
and caustics in 2D semiclassical asymptotics",
Theoretical and Mathematical Physics, Vol. 177, No. 3, pp. 1579-1605, 2013.
S. Yu. Dobrokhotov, G.N. Makrakis and V.E.Nazaiksinskii,
"Maslov’s Canonical Operator, Hörmander’s Formula, and
Localization of Berry–Balazs’ Solution in the Theory of Wave Beams",
Theoretical and Mathematical Physics, Vol. 180, No. 3, pp. 162-182, 2014.
E.K. Kalligiannaki and G.N. Makrakis, Perturbation solutions of the semiclassical Wigner equation
P. D. Karageorge and G.N. Makrakis, Asymptotic solutions of the phase space Schrodinger equation:
Anisotropic Gaussian approximation
G.N. Makrakis, Formal asymptotic expansion of the Faddeev-Green function in unbounded domains
1. Graduate course “Applied Functional Analysis 1” (course webpage here)
2. Undergraduate course “Physics 1 (Mechanics)” (course webpage here)
Archimedes Center for Modeling, Analysis and Computation -- (ACMAC)
Applied and Numerical Analysis Seminar
Dept. of Mathematics & Applied Mathematics, University of Crete
Institute of Applied and Computational Mathematics(IACM)
Researchers in semi-classical analysis