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200 10$aSalinity and tides in alluvial estuaries$b[electronic resource] /$fby Hubert H.G. Savenije
205   $a1st ed.
210   $aAmsterdam $cElsevier$d2005
215   $a1 online resource (212 p.)
300   $aDescription based upon print version of record.
311   $a0-444-52107-0 
320   $aIncludes bibliographical references (p. 185-190) and index.
327   $aSalinity and tides in alluvial estuaries; Salinity and tides in alluvial estuaries; Contents; Preface; Notation; 1 Introduction: description and classification of alluvial estuaries; 1.1 Importance of estuaries to mankind; 1.2 Classification of estuaries; 1.3 Estuary numbers; 1.4 Alluvial estuaries and their characteristics; 1.4.1 The shape of alluvial estuaries; 1.4.2 Dominant mixing processes; 1.4.3 How the tide propagates; 1.4.4 How the salt intrudes; 1.5 What will follow; 2 Tide and estuary shape; 2.1 Hydraulic equations; 2.1.1 Basic equations; 2.1.2 The seventh equation
327   $a2.1.3 The one-dimensional equations for depth and velocity2.1.4 The effect of density differences and tide; 2.2 The shape of alluvial estuaries; 2.2.1 Classification on estuary shape; 2.2.2 Assumptions on the shape of alluvial estuary in coastal plains The assumptions of an ideal estuary; 2.2.3 Assumptions on estuary shape in short estuaries; 2.3 Relating tide to shape; 2.3.1 Why look for relations between tide and shape?; 2.3.2 Theoretical derivations; 3 Tidal dynamics; 3.1 Tidal movement and amplification; 3.1.1 Why is the tidal wave amplified or damped?
327   $a3.1.2 Derivation of the tidal damping equation3.1.3 Application of the derived formula to observations; 3.1.4 Conclusions; 3.2 Tidal wave propagation; 3.2.1 The relation between tidal damping and wave celerity; 3.2.2 Theory of wave propagation; 3.2.3 Empirical verification in the Schelde and Incomati estuaries; 3.2.4 The wave celerity according to Mazure; 3.2.5 Conclusion; 3.3 Effect of river discharge and other higher order effects on tidal damping; 3.3.1 Which higher order effects are important; 3.3.2 Incorporating river discharge into the derivation of the Celerity equation
327   $a3.3.3 Incorporating river discharge into the derivation of the Damping equation3.3.4 Application to the Schelde-estuary; 3.3.5 Conclusion; 3.4 The influence of climate change and human interference on estuaries; 4 Mixing in alluvial estuaries; 4.1 Types of mixing, their relative importance, and interaction; 4.2 Gravitational circulation; 4.3 Mixing by the tide; 4.4 Residual circulation through flood and ebb channels; 4.5 The decomposition method and why it is not very useful; 4.6 Longitudinal effective dispersion; 4.7 Van den burgh's equation; 4.7.1 The physical meaning of Van den Burgh's K
327   $a4.7.2 Correspondence with other methods4.8 General equation for longitudinal dispersion; 5 Salt intrusion in alluvial estuaries; 5.1 Types of salt intrusion and shapes of salt intrusion curves; 5.2 Salt balance equations; 5.3 Influence of rainfall and evaporation; 5.4 Time scales and conditions for steady state; 5.5 Predictive model for steady state; 5.5.1 Expressions for HWS, LWS, and TA; 5.5.2 Empirical relations for the predictive model; 5.5.3 The predictive model compared to other methods; 5.6 Unsteady state model; 5.6.1 System response time; 5.6.2 Unsteady state dispersion
327   $a5.6.3 Application of the unsteady state model
330   $aThe book describes an integrated theory that links estuary shape to tidal hydraulics, tidal mixing and salt intrusion. The shape of an alluvial estuary is characterised by exponentially varying width and the absence of bottom slope. This topography is closely related to tidal parameters, hydraulic parameters and parameters that describe 1-dimensional mixing and salt intrusion. Starting from the fundamental equations for conservation of mass and momentum, analytical equations are derived that relate the topography to tidal parameters (tidal excursion, phase lag, tidal damping, tidal amplificati
606   $aEstuaries$xMathematical models
606   $aHydrodynamics$xMathematical models
606   $aSaltwater encroachment$xMathematical models
606   $aTides$xMathematical models
615  0$aEstuaries$xMathematical models.
615  0$aHydrodynamics$xMathematical models.
615  0$aSaltwater encroachment$xMathematical models.
615  0$aTides$xMathematical models.
676   $a551.46/18
676   $a551.466418
700   $aSavenije$b H. H. G$g(Hubert H. G.)$01687255
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910815435703321
996   $aSalinity and tides in alluvial estuaries$94060604
997   $aUNINA