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1. 蠕ョ蟆上ム繧、繝昴シ繝ォ縺九i縺ョ謾セ蟆
2. 繝槭け繧ケ繧ヲ繧ァ繝ォ縺ョ譁ケ遞句シ上ョ蟆主コ縺ィ隗」驥
3. 髮サ逎∫阜縺ョ遨榊陦ィ遉コ
4. 髮サ逎∫阜縺ョ遲我セ。螳夂炊
5. 蠅逡梧擅莉カシ檎ォッ轤ケ譚。莉カシ梧叛蟆譚。莉カ
6. 豕「貅舌ョ縺ェ縺譁画ャ。譁ケ遞句シ上ョ隗」
7. 螟画焚蛻髮「縺ォ繧医▲縺ヲ隗」縺代k蠅逡悟、蝠城。
8. 蜊顔┌髯仙ー惹ス捺攸縺ョ蝗樊釜迴セ雎。
9. 蜀遲貞ー惹ス薙↓繧医k蝗樊釜迴セ雎。
Derivation and interpretation of Maxwell's equations, radiation from a dipole, direct integration of the field equations, field equivalence theorem, boundary, edge and radiation conditions, solutions for homogeneous equations, canonical problems sloved by separation of variables and diffraction from a half plane or a cylinder
The objective of this course is to provide the basic methodology in the boundary value problems of electromagnetic waves. Some canonical problems in electromagnetic wave scattering are solved. Important concept of 窶拉ield equivalence theorem窶 is explained. The following topics are included.
01. Radiation from a source.
02. Dipole, Uniqueness, Poynting Theorem, Far field.
03. Linear differential equations.
04. Derivation and interpretation of Maxwell窶冱 equations.
05. Direct integration of the field equations.
06. Field equivalence theorem.
07. Boundary, edge and radiation conditions.
08. Solutions for homogeneous equations.
09. Canonical problems sloved by separation of variables.
10. Diffraction from a half plane.
11. Diffraction from a cylinder.
Lecture note and copies of pages in classical books by Stratton J. A.(1941), Harrington R.G.(1961) and by Segkiguchi T.(1976) are available during the course. Additional references are;
Yamashita E.ed. 窶戡nalysis Methods for Electromagnetic Wave Problems窶 Artech House (1990).
Yamashita E.ed. 窶戡pplication of Electromagnetic Wave Analysis窶, IEICE Japan (1993).
Students should have completed courses of 窶戲lectricity and magnetism 窶 and 窶戲lectromagnetic waves窶 in the undergraduate course or its equivalence. It is also preferable to have finished 窶 electromagnetic wave transmission and the radio law窶.
Grade is based upon examination (about 80%) in the end of term and homework reports (about 20%) during the term.
縲唇ffice hours縲
Students should contact with lecturers in advance by e-mail. The office hour is typically from 16:30 to 18:00 on Tuesdays.