# Nonlinear unsteady supersonic flow analysis for slender bodies of revolution: Theory.

Panayotounakos, D.E.; Markakis, M.

Mathematical Problems in Engineering (1997)

- Volume: 3, Issue: 3, page 217-241
- ISSN: 1024-123X

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topPanayotounakos, D.E., and Markakis, M.. "Nonlinear unsteady supersonic flow analysis for slender bodies of revolution: Theory.." Mathematical Problems in Engineering 3.3 (1997): 217-241. <http://eudml.org/doc/47722>.

@article{Panayotounakos1997,

author = {Panayotounakos, D.E., Markakis, M.},

journal = {Mathematical Problems in Engineering},

keywords = {Monge equation; splitting of time-dependent small perturbation equation; analytical solutions; small amplitude oscillations; three-parameter family of surfaces; right circular cone},

language = {eng},

number = {3},

pages = {217-241},

publisher = {Hindawi Publishing Corporation, New York},

title = {Nonlinear unsteady supersonic flow analysis for slender bodies of revolution: Theory.},

url = {http://eudml.org/doc/47722},

volume = {3},

year = {1997},

}

TY - JOUR

AU - Panayotounakos, D.E.

AU - Markakis, M.

TI - Nonlinear unsteady supersonic flow analysis for slender bodies of revolution: Theory.

JO - Mathematical Problems in Engineering

PY - 1997

PB - Hindawi Publishing Corporation, New York

VL - 3

IS - 3

SP - 217

EP - 241

LA - eng

KW - Monge equation; splitting of time-dependent small perturbation equation; analytical solutions; small amplitude oscillations; three-parameter family of surfaces; right circular cone

UR - http://eudml.org/doc/47722

ER -

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