Stability and forced oscillations. (English) Zbl 0347.34058
MSC:
34K20 | Stability theory of functional-differential equations |
34K05 | General theory of functional-differential equations |
34D20 | Stability of solutions to ordinary differential equations |
34C25 | Periodic solutions to ordinary differential equations |
94C10 | Switching theory, application of Boolean algebra; Boolean functions (MSC2010) |
References:
[1] | Brayton, R. K., Nonlinear oscillations in a distributed network, Quart. J. Appl. Math., 24, 289-301 (1967) · Zbl 0166.35102 |
[2] | Hale, J. K., Forward and backward continuation for neutral equations, J. Differential Eqs., 9 (1971) · Zbl 0213.36901 |
[3] | Hale, J. K.; Cruz, M. A., Existence, uniqueness and continuous dependence for hereditary systems, Ann. di Mat. Pura, 4, 85 (1970) · Zbl 0194.41002 |
[4] | Hale, J. K.; Cruz, M. A., Stability of neutral equations, J. Differential Eqs., 7 (1970) · Zbl 0191.38901 |
[5] | Hale, J. K.; Lopes, O., Fixed point theorems and dissipatine processes, J. Differential Eq., 13 (1973) · Zbl 0256.34069 |
[6] | O. LopesSIAM J. Appl. Math.; O. LopesSIAM J. Appl. Math. |
[7] | Slemrod, M., Nonexistence of oscillations in a nonlinear distributed network, J. Math. Anal. Appl., 36, 22-40 (1971) · Zbl 0217.29103 |
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