Perturbation Methods in Fluid Mechanics

E572377

Perturbation Methods in Fluid Mechanics is a classic graduate-level text that systematically develops asymptotic and perturbation techniques for analyzing complex fluid flow problems.

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Perturbation Methods in Fluid Mechanics canonical 2

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Predicate Object
instanceOf book
graduate-level textbook
appliesTo Euler equations NERFINISHED
Navier–Stokes equations NERFINISHED
compressible flows
incompressible flows
laminar flows
nonlinear differential equations
covers asymptotic matching techniques
asymptotic solution of partial differential equations
inner and outer expansions
nonlinear oscillations in fluids
slender-body theory in fluids
small parameter expansions
wave–mean flow interaction
field fluid mechanics
focusesOn asymptotic expansions
boundary layer theory
high Reynolds number flows
low Reynolds number flows
matched asymptotic expansions
multiple scales analysis
nonlinear wave problems
regular perturbation methods
singular perturbation methods
stability analysis
viscous-inviscid interaction
intendedAudience applied mathematicians
graduate students in fluid mechanics
researchers in fluid mechanics
level graduate
pedagogicalApproach emphasis on physical interpretation of asymptotic results
systematic development of perturbation techniques
worked examples of fluid flow problems
status classic text in fluid mechanics
standard reference on asymptotic methods in fluid mechanics
subject applied mathematics
asymptotic methods
perturbation methods
use analysis of complex fluid flow problems
derivation of approximate analytical solutions

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Milton Van Dyke notableWork Perturbation Methods in Fluid Mechanics
Milton Van Dyke hasWrittenWork Perturbation Methods in Fluid Mechanics