Responsible Instructor 

Instructor 

Contact Hours / Week x/x/x/x 
x/x/x/x

Education Period 

Start Education 

Exam Period 

Course Language 

Expected prior knowledge 
Calculus (WI1708ET or equivalent) Complex function theory (ET2205D1 or equivalent) Fourier and Laplace transformations (ET2205D2 or equivalent)

Course Contents 
Basic principles of radiation of (dilatational) acoustic waves are derived. Integral representations and integral equations for the scattered wavefields are discussed. The scattered wavefields are analysed, using the first Born approximation. The acoustic reciprocity theorem and its possible applications are briefly discussed. The basic principles of radiation of dilatational and shear elastodynamic waves are developed. Integral representations for the radiated wavefield of an arbitrary source are derived. The RayleighBetti reciprocity theorem and its applications are briefly discussed.

Study Goals 
1. Knowing how to derive the macroscopic basic acoustic and elastodynamic equations from the underlying physical conservation laws. 2. Knowing how to employ integral transformations for the solution of the basic acoustic equations. 3. Knowing how to derive the point source solution (Green's function) in an unbounded medium. 4. Knowing how to solve specific problems using the reciprocity theorem. 5. Knowing how to formulate and solve the scattering problem.

Education Method 
Lectures

Literature and Study Materials 
Lecture notes: A.T. de Hoop, Radiation and Scattering of Acoustic Waves in Fluids, and A.T. de Hoop, Radiation and Scattering of Elastic Waves in Solids (available from the responsible instructor).

Assessment 
Oral, open book

Remarks 
Course is mainly selfstudy. The responsible instructor will be available for explanation of topics and answering of questions at his room (HB14.290). For the first appointment, contact the coordinator. Further appointments will be based on the student’s progress.
