Ling-Huang Yu

Ling-Huang Yu

office: Room 423

Phone: (05)2720411#66110

Fax: (05)2720497

Email: mthlhy@ccu.edu.tw / lhyu1225@gmail.com

Specialized Areas

  • Applied Mathematics
  • Perturbation Methods
  • Vibration and Buckling of Structural Members
  • Convection in Porous Media

 

Degree Institution

  • Ph.D. in Mathematics, Michign State University

Rank

  • Associate Professor

Publication 

Journal Articles

  1. Y. Wang and L.H. Yu (2015). Darcy flow through bumpy tubes. Journal of Porous Media, 18, 457-461. (SCI).
  2. H. Yu and C.Y. Wang (2013, Jan). Darcy-brinkman flow through a bumpy channel. Transport in Porous Media, 97(3), 281-294. (SCI). 
  3. H. Yu and C. Y. Wang (2012). Optimum horizontal support for suppression of vibration of a standing plate with simply supported sides. International Journal of Structural Stability and Dynamics, 12 (3), 1250020 (8pages). (SCI). 
  4. H. Yu and C. Y. Wang (2011, Jul). Vibration of a standing plate with simply supported vertical sides and weakened by a horizontal hinge. Thin-Walled Structures, 49, 899-901. (SCI).
  5. H. Yu and C.Y. Wang (2010). Buckling mosaic of a circular plate on a partial elastic foundation. Structural Engineering and Mechanics, 34 ( 1 ) , 135-138. (SCI). 
  6. H. Yu and C. Y. Wang (2009, Sep). Buckling mosaic of concentrically hinged or cracked circular plates on elastic foundation. AIAA Journal, 47, P2253-2255. (SCI). 
  7. H. Yu and C. Y. Wang (2009). Fundamental frequency of a standing heavy plate with vertical simply-supported edges. Journal of Sound and Vibration, 321, p1-7. (SCI). 
  8. H. Yu (2009). Frequencies of a circular plate weakened along an internal concentric circle. International Journal of structural Stability and Dynamics, 9, p179-185. (SCI). 
  9. Y. Yu and C. Y. Wang (2008). Buckling of Rectangular Plates on an Elastic Foundation Using the Levy Method. AIAA Journal. (SCI). NSC 97-2115-M-194-005. 
  10. H. Yu (2007, Mar). A higher order asymptotic approximation for the fundamental. JOURNAL OF SOUND AND VIBRATION, 304 (2007) p.284–p.296. (SCI). 
  11. H. Yu (2004). Fundamental frequency of a circular membrane with a strip of small length. Z. angew. Math. Phys., 55, 539-544. (SCI). 
  12. H. Yu (2003). Fundamental frequency of a doubly connected membrance: a modified perturbation method. IMA J. Appl. Math., 68, 329-354. (SCI). 
  13. H. Yu, C.Y. Wang (2001). Fundamental frequencies of a circular membrane with a centered strip. J. Sound Vib., 239(2), 363-368. (SCI).