Differential geometric modeling of guidance problem for interceptors

Abstract: It is a comparatively convenient technique to investigate the motion of a particle with the help of the differential geometry theory, rather than directly decomposing the motion in the Cartesian coordinates. The new model of three-dimensional (3D) guidance problem for interceptors is presented in this paper, based on the classical differential geometry curve theory. Firstly, the kinematical equations of the line of sight (LOS) are gained by carefully investigating the rotation principle of LOS, the kinematic e… Show more

“…This approach might complicate the description of the relative motion due to the cross-coupling effects and introduce some auxiliary variables to the relative motion analysis. Establishing the kinematic equations in LOS rotating coordinate could ease the complexity in the description of the 3D relative motion [14][15][16][17][18]. The relative motion in the LOS rotating coordinate system can be divided into two decoupled submotions: (1) the relative motion in the instantaneous osculating plane of the missile and the target spanned by the relative position and velocity vectors, which is also called the engagement plane; (2) the rotation of this plane.…”

“…(1) and (2), the reader is referred to Refs. [14][15][16][17][18]. According to (A1)-(A4), the flight trajectories of the missile and the target can be considered as continuous smooth curves in 3D space.…”

“…Li et al [6,9] transformed it into the time domain, without attenuation of the complexity. Li et al [15][16][17][18] proposed the simplified explicit expression of 3D DGGL in the time domain recently, viz.,…”

“…For 3D DGGL, both the expression in the arc-length system proposed by Chiou et al [3] and the expression in the time domain given by Li et al [6] were not intuitive and convenient enough for performance analysis and application to practical interception scenarios. Based on the LOS rotating coordinate system [14], Li et al [15][16][17][18] proposed a simplified 3D DGGL which gave simple and explicit expression of the commanded acceleration in the time domain. Although many studies on 3D DGGL have been conducted, the results were focused on issues such as initial capture conditions, applications to practical engagements, and estimation of target maneuvering acceleration.…”

Performance analysis of three-dimensional differential geometric guidance law against low-speed maneuvering targets

“…This approach might complicate the description of the relative motion due to the cross-coupling effects and introduce some auxiliary variables to the relative motion analysis. Establishing the kinematic equations in LOS rotating coordinate could ease the complexity in the description of the 3D relative motion [14][15][16][17][18]. The relative motion in the LOS rotating coordinate system can be divided into two decoupled submotions: (1) the relative motion in the instantaneous osculating plane of the missile and the target spanned by the relative position and velocity vectors, which is also called the engagement plane; (2) the rotation of this plane.…”

“…(1) and (2), the reader is referred to Refs. [14][15][16][17][18]. According to (A1)-(A4), the flight trajectories of the missile and the target can be considered as continuous smooth curves in 3D space.…”

“…Li et al [6,9] transformed it into the time domain, without attenuation of the complexity. Li et al [15][16][17][18] proposed the simplified explicit expression of 3D DGGL in the time domain recently, viz.,…”

“…For 3D DGGL, both the expression in the arc-length system proposed by Chiou et al [3] and the expression in the time domain given by Li et al [6] were not intuitive and convenient enough for performance analysis and application to practical interception scenarios. Based on the LOS rotating coordinate system [14], Li et al [15][16][17][18] proposed a simplified 3D DGGL which gave simple and explicit expression of the commanded acceleration in the time domain. Although many studies on 3D DGGL have been conducted, the results were focused on issues such as initial capture conditions, applications to practical engagements, and estimation of target maneuvering acceleration.…”

Performance analysis of three-dimensional differential geometric guidance law against low-speed maneuvering targets

“…K.B. Li, et al [10][11][12][13] analyzed DGGC according to the relative kinematic equations established in the line of sight (LOS) rotation reference system, and proposed a new, simplified DGGC formation. The primary contribution of DGGC is the derivation of a new direction of command acceleration, which better controls the LOS rate compared to traditional 3D PPN.…”

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