| Description |
vii, 69 leaves : illustrations ; 29 cm |
| Summary |
"The bounded input-bounded output stability is investigated for networks containing uniformly distributed LRGC, LRC, GRC and G([omega])RC elements. The region of stability in the W plane (W = e to the power of the square root of (s² + bs + c), [theta] plane ([theta] = the square root of (s² + bs + c), and S plane (S = s²+bs+c) is found in each case so that if the poles of a transfer function rational in W, [theta] or S lie within this region the system is stable. After obtaining a desired transfer function rational in W = e to the power of the square root of (s² + bs + c), state-variable synthesis methods are applied to obtain a model with transfer functions of the form 1/W. A circuit is then given to obtain an approximate 1/W block along with the resulting error analysis. Examples are presented to illustrate the synthesis methods. The stability regions in the W, [theta] and s planes for the distributed RC case are given along with the open-circuit and short-circuit relative errors as a means of comparing the different forms of distributed networks"--Abstract, leaf ii. |
|
