Optimal growth as function of Wo (Re=2000,A=1)

DOI

The data are obtained via an in-house Matlab script (developed by Dr. Baofang Song) to compute the non-modal transient growth of disturbances in pulsatile and oscillatory pipe flows. In this study, a Newtonian fluid driven by pulsatile and oscillatory flow rate flows in a straight pipe. In pulsatile flow, there are three governing parameters: steady Reynolds number (defined by the steady flow component), pulsation amplitude (ratio of oscillatory and steady flow component) and Womersley number (dimensionless pulsation and oscillation frequency). In oscillatory flow, due to vanishment of steady flow component, oscillatory Reynolds number (defined by the oscillation flow component) and Womersley number. The Reynolds number defined by the thickness of Stokes layer is alternatively used for the oscillatory Reynolds number. The study was carried out in a manner that one governing parameter varies while other governing parameters are fixed.The data file 'TG_Wo_A1.dat' shows the dependence of the maximum energy amplification on the Womersley number for the Reynolds number of 2000 and the amplitude of 1.This file includes two columns: the first column indicates the Womersley number; the second column indicates the maximum energy amplification.

(Re,A)=(2000.00,1.00)#t0:initial time; tf:end time;VARIABLES = "Wo", "TG (max at a Wo)"ZONE T="data, classical (k=0,m=1)", I=15, J=1

Identifier
DOI https://doi.org/10.1594/PANGAEA.949203
Metadata Access https://ws.pangaea.de/oai/provider?verb=GetRecord&metadataPrefix=datacite4&identifier=oai:pangaea.de:doi:10.1594/PANGAEA.949203
Provenance
Creator Xu, Duo ORCID logo; Song, Baofang ORCID logo; Avila, Marc ORCID logo
Publisher PANGAEA
Publication Year 2022
Rights Creative Commons Attribution 4.0 International; https://creativecommons.org/licenses/by/4.0/
OpenAccess true
Representation
Resource Type Dataset
Format text/tab-separated-values
Size 90 data points
Discipline Earth System Research