Eigenvibration for the Membrane between Two Eccentric Circles
スポンサーリンク
概要
- 論文の詳細を見る
The solutions of the wave equation for a membrane bounded by fixed two eccentric circles are obtained. By the aid of the addition theorem of the Bessel functions, the boundary condition on two circles is reduced to a set of homogeneous simultaneous linear equations, from which eigenvalues and eigenfunctions are obtained in power series of d (the distance between two centers). Some numerical results are obtained to the order of d^G or d^4.
- 社団法人日本物理学会の論文
- 1961-12-05
著者
-
NOMURA Yukichi
Department of Applied Science Tohoku University
-
Harumi Kasaburo
Department Of Applied Science Tohoku University
-
Nomura Yukichi
Department Of Applied Science Faculty Of Engineering Tohoku University
-
Nomura Y.
Department of Applied Science, Tohoku University
関連論文
- Variations on Supersymmetry Breaking and Neutrino Spectra (ニュートリノをめぐって)
- A Method for Computer Diagnosis of the Electrocardiogram
- Diffraction of Electromagnetic Waves by Circular Plate and Circular Hole
- Discrimination of Defects by the Change of Wave Shape : Reflection at Right-Angle Corner : Non-Destructive Testing
- Introduction to Films of Computer Simulation of Elastic Waves in a Solid : Physical Acoustics I
- DETECTION OF HIGH-INTENSITY TRANSIENT SIGNALS (HITS) IN CEREBRAL EMBOLISM
- Numerical Experiment of Edge Waves of Incident Transverse Waves : General Acoustics
- Eigenvibration for the Membrane between Two Eccentric Circles
- Diffraction of Electromagnetic Waves by Ribbon and Slit. I
- Diffraction of Plane Sound Wave by Many Equal Circular Holes Arbitrarily Distributed in an Infinitely Large Rigid Plane Plate
- On the Propagation of the Electromagnetic Waves in an Inhomogeneous Atmosphere
- On the Acoustic Radiation from a Flanged Circular Pipe
- On the Propagation of Elastic Waves in an Isotropic Homogeneous Sphere