Please submit manuscripts in either of the following two submission systems

    ScholarOne Manuscripts

  • ScholarOne

    • 勤云稿件系统

  • 登录

Search by Issue

  • 2025 Vol.32
  • 2024 Vol.31
  • 2023 Vol.30
  • 2022 Vol.29
  • 2021 Vol.28
  • 2020 Vol.27
  • 2019 Vol.26
  • 2018 Vol.25
  • 2017 Vol.24
  • 2016 vol.23
  • 2015 vol.22
  • 2014 vol.21
  • 2013 vol.20
  • 2012 vol.19
  • 2011 vol.18
  • 2010 vol.17
  • 2009 vol.16
  • No.1
  • No.2

Search by Keywords

  • Search by Title
  • Search by Keywords
  • Search by Abstract
  • Search by Author's Chinese Name
  • Search by Author's English Name
  • Search by Fund

News & AnnouncementMORE

Supervised by Ministry of Industry and Information Technology of The People's Republic of China Sponsored by Harbin Institute of Technology Editor-in-chief Yu Zhou ISSNISSN 1005-9113 CNCN 23-1378/T

期刊网站二维码
微信公众号二维码
Related citation:Chashechkin Yuli Dmitrievich,Ochirov Artem Alexandrovich,Lapshina Kristina Yurevna,Trifonova Ulyana Olegovna.Regular and Singular Components of 2D Periodic Fluid Flows on a Surface of Viscous Stratified Fluid[J].Journal of Harbin Institute Of Technology(New Series),2025,32(6):26-37.DOI:10.11916/j.issn.1005-9113.2025014.
【Print】   【HTML】   【PDF download】   View/Add Comment  Download reader   Close
←Previous|Next→ Back Issue    Advanced Search
This paper has been: browsed 53times   downloaded 11times 本文二维码信息
码上扫一扫!
Shared by: Wechat More
Font:larger+|default|smaller-
Regular and Singular Components of 2D Periodic Fluid Flows on a Surface of Viscous Stratified Fluid
Author NameAffiliation
Chashechkin Yuli Dmitrievich Ishlinsky Institute for Problems in Mechanics of the Russian Academy of Sciences, Moscow 119526, Russia 
Ochirov Artem Alexandrovich Ishlinsky Institute for Problems in Mechanics of the Russian Academy of Sciences, Moscow 119526, Russia 
Lapshina Kristina Yurevna Ishlinsky Institute for Problems in Mechanics of the Russian Academy of Sciences, Moscow 119526, Russia 
Trifonova Ulyana Olegovna Faculty of Physics and Techology,Yaroslavl State University, Yaroslavl 150003, Russia 
Abstract:
The modern definition of the wave concept, which is based on the functional connection between the parameters of the spatial structure of an instantaneous flow pattern and the characteristics of the temporal variability at a given point, is discussed. The dispersion relation for 2D plane periodic perturbations on the surface of viscous stratified fluid is selected as the characteristic function defining the wave motion. Using the theory of singular perturbations, a method for calculating complete solutions to the dispersion relations of periodic flows, including regular wave and singular ligament solutions is presented. Properties of the complete exact solution of the dispersion relation containing regular and singular functions are compared with asymptotic solutions. In limiting cases, obtained dispersion relations are matched with well-known expressions for waves in homogeneous viscous and ideal liquids.
Key words:  Navier-Stokes equation  periodic flows  theory of singular perturbations  asymptotic methods  surface capillary-gravity waves  ligaments  flow structure
DOI:10.11916/j.issn.1005-9113.2025014
Clc Number:O4
Fund:

LINKS

Copyright © The Editorial Department of Journal of Harbin Institute of Technology
Address: 92 West Dazhi Street, Nan Gang District, Harbin, Heilongjiang Province, China Postcode: 150001
(C)2015 JOURNAL OF HIT ALL RIGHTS RESERVED. ICP. 0000423255