Sentence examples for admissible difference from inspiring English sources

The admissible difference is broader in the sequential game.

(For discussion of sufficiency principles, see McKay (1986) and Robertson (1998).) As just noted, no familiar version of essentialism provides a direct argument against absolutely all haecceitistic differences, although strong versions of essentialism will limit the range of admissible haecceitistic differences.

For this reason, a commitment to strong versions of essentialism will constrain the range of admissible haecceitistic differences.

Suppose that (f z)) is an admissible solution of difference equation (1.1) of finite order, where k (≥1) is an integer, (deg _{f}P=p, deg_{f}Q=q), and (d=max{p,q}>0).

We call f an admissible solution of a difference (or differential) equation if all coefficients α of the equation satisfy (T r,alpha)=S r,f)).

It is required to be consistent with the jacobian of the fluxF, to have real eigenvalues, a complete set of eigenvectors and to satisfy the relation: ΔF=A(Ul,Ur) ΔU, whereUlandUrare two admissible states and ΔUtheir difference.

Suppose that (f z)) is an admissible meromorphic solution of difference equation (1.1) of finite order, where (kin mathbb {N}^) and (d=max{ deg_{f}P,deg_{f}Q}=7k).

Suppose that (f z)) is an admissible entire solution of difference equation (1.1) of finite order, where (kin mathbb {N}^) and (d=max{ deg_{f}P,deg_{f}Q}=2k).

When density difference is not admissible, some reduction in the turbulence component velocity appears apparently, as expected in the derivastion of the basic equation.

We say that a meromorphic solution f of a difference equation is admissible if all coefficients of the equation are in (S f)).

A meromorphic solution w of a difference equation is called admissible if all coefficients of the equation are in S ( w ).