TY  - EJOU
AU  - Yan, Zai You  
AU  - Zhang, Qiang  

TI  - Investigation on the Singularities of Some Singular Integrals
T2  - Computer Modeling in Engineering \& Sciences

PY  - 2011
VL  - 75
IS  - 3&4
SN  - 1526-1506

AB  - In a boundary element method, the treatment of all the possible singular integrals is very important for the correctness and accuracy of the solutions. Generally, the directional derivative of a weakly singular integral is computed by an integral in the sense of Cauchy principal value if the directional derivative of the weakly singular integral kernel is strongly singular or in the sense of Hadamard finite part integral if it is hypersingular. In this paper, we try to discover how the strongly singular and hypersingular integrals are generated and propose an idea to avoid the appearance of such kind of strongly singular and hypersingular integrals. This idea is termed as the 'exact derivation' of the directional derivative of a weakly singular integral. Using some simple examples, we proof that the directional derivative of a weakly singular integral found by this idea can still be a weakly singular integral. That is none strongly or hypersingular integrals are generated in such a process. Therefore, Cauchy principal value and Hadamard finite part integral are not indispensable.
KW  - weakly singular integral
KW  -  strongly singular integral
KW  -  hypersingular integral
KW  -  Cauchy principal value
KW  -  Hadamard finite part
KW  -  improper integral

DO  - 10.3970/cmes.2011.075.205