stable pairs
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1: 28.17 Stability as
§28.17 Stability as
►If all solutions of (28.2.1) are bounded when along the real axis, then the corresponding pair of parameters is called stable. All other pairs are unstable. ►For example, positive real values of with comprise stable pairs, as do values of and that correspond to real, but noninteger, values of . … ►For real and the stable regions are the open regions indicated in color in Figure 28.17.1. …2: 15.19 Methods of Computation
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►This is because the linear transformations map the pair
onto itself.
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►The relations in §15.5(ii) can be used to compute , provided that care is taken to apply these relations in a stable manner; see §3.6(ii).
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3: 28.33 Physical Applications
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►Hence from §28.17 the corresponding Mathieu equation is stable or unstable according as is in the intersection of with the colored or the uncolored open regions depicted in Figure 28.17.1.
In particular, the equation is stable for all sufficiently large values of .
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4: 17.12 Bailey Pairs
§17.12 Bailey Pairs
… ►Bailey Pairs
… ►When (17.12.5) is iterated the resulting infinite sequence of Bailey pairs is called a Bailey Chain. … ►The Bailey pair that implies the Rogers–Ramanujan identities §17.2(vi) is: … ►The Bailey pair and Bailey chain concepts have been extended considerably. …5: 14.32 Methods of Computation
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►In particular, for small or moderate values of the parameters and the power-series expansions of the various hypergeometric function representations given in §§14.3(i)–14.3(iii), 14.19(ii), and 14.20(i) can be selected in such a way that convergence is stable, and reasonably rapid, especially when the argument of the functions is real.
In other cases recurrence relations (§14.10) provide a powerful method when applied in a stable direction (§3.6); see Olver and Smith (1983) and Gautschi (1967).
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6: 29.9 Stability
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►The Lamé equation (29.2.1) with specified values of is called stable if all of its solutions are bounded on ; otherwise the equation is called unstable.
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7: 33.23 Methods of Computation
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►When numerical values of the Coulomb functions are available for some radii, their values for other radii may be obtained by direct numerical integration of equations (33.2.1) or (33.14.1), provided that the integration is carried out in a stable direction (§3.7).
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►In a similar manner to §33.23(iii) the recurrence relations of §§33.4 or 33.17 can be used for a range of values of the integer , provided that the recurrence is carried out in a stable direction (§3.6).
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8: 1.11 Zeros of Polynomials
§1.11 Zeros of Polynomials
… ►§1.11(v) Stable Polynomials
… ►with real coefficients, is called stable if the real parts of all the zeros are strictly negative. ►Hurwitz Criterion
… ►Then , with , is stable iff ; , ; , .9: 36.14 Other Physical Applications
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►These are the structurally stable focal singularities (envelopes) of families of rays, on which the intensities of the geometrical (ray) theory diverge.
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