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ACOUSTIC EIGENFREQUENCIES IN CONCENTRIC SPHEROIDAL–SPHERICAL CAVITIES

✍ Scribed by G.C. Kokkorakis; J.A. Roumeliotis

Book ID
102606909
Publisher
Elsevier Science
Year
1997
Tongue
English
Weight
293 KB
Volume
206
Category
Article
ISSN
0022-460X

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✦ Synopsis

The acoustic eigenfrequencies fnsm in concentric spheroidal-spherical cavities are determined for both Dirichlet and Neumann boundary conditions. Two types of cavities are examined, one with spheroidal outer and spherical inner boundary and inversely for the other. The pressure field is expressed in terms of both spherical and spheroidal wave functions, connected with one another by well-known expansion formulas. When the solution is specialized to small values of h = d/(2R2) where d is the interfocal distance of the spheroidal boundary and R2 the half length of its rotation axis, exact closed-form expressions are obtained for the coefficients g (2) nsm and g (4) nsm in the resulting relations fnsm (h) = fns (0) [1 + g (2) nsm h 2 + g (4) nsm h 4 + O(h 6 )]. Numerical results are given for various values of the parameters.

📜 SIMILAR VOLUMES

ACOUSTIC EIGENFREQUENCIES IN CONCENTRIC
ACOUSTIC EIGENFREQUENCIES IN CONCENTRIC SPHEROIDAL–SPHERICAL CAVITIES: CALCULATION BY SHAPE PERTURBATION
✍ G.C. Kokkorakis; J.A. Roumeliotis 📂 Article 📅 1998 🏛 Elsevier Science 🌐 English ⚖ 274 KB

The acoustic eigenfrequencies fnsm in concentric spheroidal-spherical cavities are determined analytically, for both Dirichlet and Neumann boundary conditions, by a shape perturbation method. Two types of cavities are examined, one with spheroidal outer and spherical inner boundary and inversely for

Acoustic eigenfrequencies and modes in a
Acoustic eigenfrequencies and modes in a soft-walled spherical cavity with an eccentric inner small sphere
✍ John A. Roumeliotis; John D. Kanellopoulos 📂 Article 📅 1992 🏛 Elsevier Science 🌐 English ⚖ 479 KB

Analytical expressions are derived for the acoustic eigenfrequencies and modes in a soft-walled spherical cavity with an eccentric inner acoustically small sphere. A straightforward and very simple approach is employed to obtain a first-order perturbation of the cavity eigenfunctions and the corresp