Problem of a randomly oriented crack in a box-shaped shell
Вантажиться...
Дата
1998
Науковий керівник
Укладач
Редактор
Назва журналу
ISSN
E-ISSN
Назва тому
Видавець
Kluwer Academic / Plenum Publishers
Анотація
This paper deals with the stress state of a box-shaped shell formed by two semi-infinite plates joined at
a right angle. The plates are homogeneous but have different thicknesses. The shell is weakened by a finite
rectilinear crack of unit length which reaches one edge of the shell. The orientation of the crack and the
load on its edges are arbitrarily chosen. The problem is solved with the assumption that the thickness of
the plates is small compared to the length of the crack, which allows an asymptotic formulation of the
problem. The problem is reduced to a special type of Riemannian vector problem in which the stress-intensity
factor allows matrix factorization in accordance with Khrapkov's scheme. The asymptotes of the
resulting solution and the stress-intensity factor are examined in relation to the thickness of the shell and
the angle formed by the crack and the edge of the shell.
Опис
Ключові слова
box-shaped shell, Asymptotic Formulation, Tensity Factor, Thin Inclusion, Annotate Document, Tile Matrix
Бібліографічний опис
lnternational Applied Mechani cs,