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where 1 is the iteration number and
The Jacobian matrix can be written as
where
which are the well‐known expressions for tangent stiffness matrix. The underlined term corresponds to the “initial stress” matrix evaluated in the current configuration as a result of stress rotation defined in (2.5).
Two points should be made here:
1 that in the linear case, a single “iteration” solves the problem exactly
2 that the matrix can be made symmetric by a simple scalar multiplication of the second row (provided KT is itself symmetric).
In practice, it is found that the use of various approximations of the matrix J is advantageous such as, for instance, the use of “secant” updates (see, for instance, Crisfield (1979), Matthies, and Strang (1979) and Zienkiewicz et al (2013).
A particularly economical computation form is given by choosing β2 = 0 and representing matrix M in a diagonal form. This explicit procedure was first used by Leung (1984) and Zienkiewicz et al. (1980a). It is, however, only conditionally stable and is efficient only for phenomena of short duration.
The process of the time‐domain solution of (3.44) can be amended to that of successive separate solutions of the time equations for variables
Special cases of solution are incorporated in the general solution scheme presented here without any modification and indeed without loss of computational efficiency.
Thus, for static or quasi‐static, problems, it is merely necessary to put M = 0 and immediately the transient consolidation equation is available. Here time is still real and we have omitted only the inertia effects (although with implicit schemes, this a priori assumption is not necessary and inertia effects will simply appear as negligible without any substantial increase of computation). In pure statics, the time variable is still retained but is then purely an artificial variable allowing load incrementation.
In static or dynamic undrained analysis, the permeability (and compressibility) matrices are set to zero, i.e. H · f (2) = 0, and usually S = 0 resulting in a zero‐matrix diagonal term in the Jacobian matrix of Equation (3.47).
The matrix to be solved in such a limiting case is identical to that used frequently in the solution of problems of incompressible elasticity or fluid mechanics and, in such studies, places limitations on the approximating functions N u and N p used in (3.19) if the Babuska–Brezzi (Babuska 1971, 1973, Brezzi 1974) convergence conditions or their equivalent (Zienkiewicz et al. 1986b) are to be satisfied. Until now, we have not referred to any particular element form, and, indeed, a wide choice is available to the user if the limiting (undrained) condition is never imposed. Due to the presence of first derivatives in space in all the equations, it is necessary to use “C0‐continuous” interpolation functions and Figure 3.2 shows some elements incorporated in the formulation. The form of most of the elements used satisfies the necessary convergence criteria of the undrained limit (Zienkiewicz 1984). Though the bi‐linear u and p quadrilateral does not, it is, however, useful when the permeability is sufficiently large.
Figure 3.2 Elements used for coupled analysis, displacement (u) and pressure (p) formulation: (a) (i) quadratic for u; (ii) linear for p; (b) (i) biquadratic