A new perspective into the locking behavior of LC and ring oscillators is presented. By decomposing a sinusoidal injection current into in-phase and quadrature-phase components, exact expressions for the amplitude and phase of an injection-locked LC oscillator which hold for any injection strength and frequency are derived and confirmed by simulation. The analysis, which can be naturally extended to an arbitrary LC resonator topology, leads to a rigorous understanding of the fundamental physics underlying the locking phenomenon. Furthermore, an investigation of the different necessary and sufficient conditions for injection locking to occur is carried out, leading to a more precise notion of the lock range. The ring oscillator is also analy...
We present a study of dual-band injection locking frequency dividers (ILFDs), based on a nonlinear a...
This paper presents a novel approach to the analysis of oscillator injection locking due to weak ext...
Abstract—Injection locking analysis based on classical Adler’s equation is limited to LC oscillators...
A new perspective into the locking behavior of LC and ring oscillators is presented. By decomposing ...
A number of specialized topics within the theory of injection locking and pulling are addressed. The...
In this paper, behavior of an oscillator under injection of another signal has been investigated. Al...
Abstract — Sub-harmonic injection locking (SHIL) is an interesting phenomenon in nonlinear oscillato...
This paper proposes a novel, all synthesized, Injection Locked Ring Oscillator (ILRO). It employs a ...
A general model of electrical oscillators under the influence of a periodic injection is presented. ...
Abstract—This study presents injection-pulling effects on a local oscillator (LO) for wireless appli...
A digital-friendly approach to implement injection-locked ring oscillators is proposed. We show that...
We propose a digitally controlled injection-locked RF oscillator with an auxiliary loop as an altern...
International audienceOscillating rings are widely used in CMOS logic devices because they are easy ...
For high frequencies of operation, lowering power supplies and shrinking device sizes, prescalers pr...
This work presents an alternative to generate continuous phase shift of sinusoidal signals based on ...
We present a study of dual-band injection locking frequency dividers (ILFDs), based on a nonlinear a...
This paper presents a novel approach to the analysis of oscillator injection locking due to weak ext...
Abstract—Injection locking analysis based on classical Adler’s equation is limited to LC oscillators...
A new perspective into the locking behavior of LC and ring oscillators is presented. By decomposing ...
A number of specialized topics within the theory of injection locking and pulling are addressed. The...
In this paper, behavior of an oscillator under injection of another signal has been investigated. Al...
Abstract — Sub-harmonic injection locking (SHIL) is an interesting phenomenon in nonlinear oscillato...
This paper proposes a novel, all synthesized, Injection Locked Ring Oscillator (ILRO). It employs a ...
A general model of electrical oscillators under the influence of a periodic injection is presented. ...
Abstract—This study presents injection-pulling effects on a local oscillator (LO) for wireless appli...
A digital-friendly approach to implement injection-locked ring oscillators is proposed. We show that...
We propose a digitally controlled injection-locked RF oscillator with an auxiliary loop as an altern...
International audienceOscillating rings are widely used in CMOS logic devices because they are easy ...
For high frequencies of operation, lowering power supplies and shrinking device sizes, prescalers pr...
This work presents an alternative to generate continuous phase shift of sinusoidal signals based on ...
We present a study of dual-band injection locking frequency dividers (ILFDs), based on a nonlinear a...
This paper presents a novel approach to the analysis of oscillator injection locking due to weak ext...
Abstract—Injection locking analysis based on classical Adler’s equation is limited to LC oscillators...