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Waves in fluids
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One-dimensional waves in fluids as discussed by the authors were used to describe sound waves and water waves in the literature, as well as the internal wave and the water wave in fluids, and they can be classified into three classes: sound wave, water wave, and internal wave.Abstract:
Preface Prologue 1. Sound waves 2. One-dimensional waves in fluids 3. Water waves 4. Internal waves Epilogue Bibliography Notation list Author index Subject index.read more
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Journal ArticleDOI
Determining Gravity Wave Sources and Propagation in the Southern Hemisphere by Ray-Tracing AIRS Measurements
Jon A. Perrett,Corwin J. Wright,Neil P. Hindley,Lars Hoffmann,Nicholas J. Mitchell,Peter Preusse,Cornelia Strube,Stephen D. Eckermann +7 more
Journal ArticleDOI
Using infrasound waves from eruption video to explain ground deformation preceding the eruption of Suwanosejima volcano, Japan
TL;DR: In this article, combined video, infrasound and seismic observations were conducted at Suwanosejima volcano in August 2005, and the processes producing Infrasound radiation at the onset of an eruption were examined based on the results of the observations.
Journal ArticleDOI
Gravity waves and Rayleigh-Taylor instability on a Jeffrey-fluid
Arild Saasen,Ole Hassager +1 more
TL;DR: In this paper, a theory for linear surface gravity waves on a semi-infinite layer of viscoelastic fluid described by a Jeffrey model is presented, and results for the decay rate and the phase velocity as a function of the parameters of the fluid are given.
Journal ArticleDOI
On particle trajectories in linear deep-water waves
TL;DR: In this article, the phase portrait of a Hamiltonian system of equations describing the motion of the particles in linear deep-water waves was determined, where the particles experience in each period a forward drift which decreases with greater depth.
Book ChapterDOI
Small-Amplitude Finite-Rate Waves in Fluids having both Positive and Negative Nonlinearity
TL;DR: In this article, weakly nonlinear progressive waves in which the local value of the fundamental derivative Γ changes sign are dealt with, where the unperturbed medium is taken to be at rest aucl in a state such that r is small and of the order of the wave amplitude.