A deductive construction of third-order time-frequency distributions

In this paper, we present a simple and easily applicable approach to construct some third-order modifications of Newton's method for solving nonlinear equations. It is shown by way of illustration that existing third-order methods can be employed to construct new third-order iterative methods. The p

A class of unstable relay-controlled plants possessing one pole at the origin and two non-zero distinct real poles is studied. Cases corresponding to one or both non-zero poles in the right half-plane are considered. In each case a controller which simultaneously reduces the error and its first and

A time-optimal control that steers the phase point for a third-order linear system to the origin is constructed in an explicit analytical form. It is assumed that the characteristic exponents are zero, and the constraints on the control function are non-symmetric. The system simulates the dynamics o

## Abstract Generating accurate, high‐resolution time‐frequency distributions (TFD) is a critical aspect of dynamic radar scattering analysis. Well‐formed TFD's can be used for target identification, target acquisition in high‐noise environments, or extending the range of radar systems. In this pap

T x lR3 -+ W is continuous, we assume solutions of initial value problems are unique and extend to T. We consider questions of the uniqueness of solutions implying the existence of solutions for conjugate boundary problems on T.