KANG Sheng-liang. The Method of Multiple Scales Applied to the Nonlinear Stability Problem of a Truncated Shallow Spherical Shell of Variable Thickness With the Large Geometrical Parameter[J]. Applied Mathematics and Mechanics, 2001, (10): 1081-1091.
Citation:
KANG Sheng-liang. The Method of Multiple Scales Applied to the Nonlinear Stability Problem of a Truncated Shallow Spherical Shell of Variable Thickness With the Large Geometrical Parameter[J]. Applied Mathematics and Mechanics, 2001, (10): 1081-1091.
KANG Sheng-liang. The Method of Multiple Scales Applied to the Nonlinear Stability Problem of a Truncated Shallow Spherical Shell of Variable Thickness With the Large Geometrical Parameter[J]. Applied Mathematics and Mechanics, 2001, (10): 1081-1091.
Citation:
KANG Sheng-liang. The Method of Multiple Scales Applied to the Nonlinear Stability Problem of a Truncated Shallow Spherical Shell of Variable Thickness With the Large Geometrical Parameter[J]. Applied Mathematics and Mechanics, 2001, (10): 1081-1091.
The Method of Multiple Scales Applied to the Nonlinear Stability Problem of a Truncated Shallow Spherical Shell of Variable Thickness With the Large Geometrical Parameter
Using the mo difie d method of multiple scales,the no nlinear stability of a truncated shallow spherical shell of variable thicknes swith a nondefor ma ble rigid body at the center under co mpound loads is investigated.When the geometrical parameter kislarger,the uniformly valid as ymptotic solutions of this problem are obtained and the remainder terms are estimated.
DownLoad: