New aspects for the generalization of the Sokhotski-Plemelj formulae for the solution of finite-part singular integrals used in fracture mechanics

 
This item is provided by the institution :

Repository :
Digital Library of National Technical University of Athens | Dspace@NTUA
see the original item page
in the repository's web site and access all digital files if the item*
share



Semantic enrichment by EKT
Journal part (EN)
Scientific article (EN)
1992 (EN)
New aspects for the generalization of the Sokhotski-Plemelj formulae for the solution of finite-part singular integrals used in fracture mechanics (EN)
Ladopoulos, EG (EN)
New aspects for the generalization of the Sokhotski-Plemelj formulae are investigated, in order to show the behaviour of the limiting values of the finite-part singular integrals, defined over a smooth closed or open contour. The new formulae are more complicated when some corner points are further included in the contour. Beyond the above, when the contour is infinite, then the limiting values of the finite-part singular integrals are calculated by using an additional method. An application of two-dimensional fracture mechanics is finally given, to the determination of the stress intensity factors near a straight crack in a bimaterial infinite and isotropic solid under antiplane shear. © 1992 Kluwer Academic Publishers. (EN)
journalArticle (EN)
Fracture Mechanic (EN)
Singular Integral (EN)
Mechanics (EN)
EQUATIONS (EN)
Stress Intensity Factor (EN)
National Technical University of Athens
Digital Library of National Technical University of Athens | Dspace@NTUA
Κεντρική Βιβλιοθήκη Ε.Μ.Π.
Ιδρυματικό Αποθετήριο
Δημοσιεύσεις μελών Δ.Ε.Π. σε περιοδικά
International Journal of Fracture (EN)
English
1992 (EN)
http://hdl.handle.net/123456789/10749
10.1007/BF00035106 (EN)
4 (EN)
ISI:A1992HX40300002 (EN)
317 (EN)
328 (EN)
0376-9429 (EN)
54 (EN)
Kluwer Academic Publishers (EN)



*Institutions are responsible for keeping their URLs functional (digital file, item page in repository site)