Survey of integrated‐circuit‐oscillator phase‐noise analysis

Pankratz, Erik; Sánchez-Sinencio, E.

doi:10.1002/cta.1890

Cited by 35 publications

(28 citation statements)

References 199 publications

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“…Therefore, v trajectory, is subject to rectification 1 Since rectification is local, it is possible(ev limit cycle of vdp oscillator, that the mappi imaging the mapping is piecewise constant. an example for quadratic ) 2 x has no dissipation term, is g equation (6) hould be noted, Ĥ , being em, is by definition a constant 2 ) changes.…”

Section: New Co-ordinate Trans Rectificamentioning

confidence: 99%

“…INTRODUCTION LC/van der pol (vdp) oscillator [1]- [4] hav extensively, due to their popularity in applicatio locked loops. While simple compared to ring/rel in implementation, their phase noise are super analysis are based on linear time invariant (LTI time varying (LPTV) analysis, with nonlinearity describing function [5], [6]. Central to these concept of energy e.g.…”

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confidence: 99%

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Novel dissipative Lagrange-Hamilton formalism for LC/van der pol oscillator with new implication on phase noise dependency on quality factor

Leung

2014

2014 IEEE 57th International Midwest Symposium on Circuits and Systems (MWSCAS)

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A novel method of doing co-ordina for LC/van der pol(vdp) oscillator is proposed. It solved as a conservative system by applyin formulation using calculus of variation. T developed to calculate the constant of integrati concept of energy. Such constant of integration, from energy, has implication on the dependency quality factor Q. This is examined, which shows th dependency on Q is not totally correct.

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Section: New Co-ordinate Trans Rectificamentioning

confidence: 99%

mentioning

confidence: 99%

Novel dissipative Lagrange-Hamilton formalism for LC/van der pol oscillator with new implication on phase noise dependency on quality factor

Leung

2014

2014 IEEE 57th International Midwest Symposium on Circuits and Systems (MWSCAS)

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“…We consider the basis vectors u T 1 (t) = [0, 1], u T 2 (t) = [1, −1] and the covectors v T 1 (t) = [1,1], v T 2 (t) = [1,0]. It is straightforward to derive the relation between polar coordinates and the new phase-amplitude variables, in fact x = x 0 (θ) + Y (θ)R(t) implies ρ = 1 + R and ϕ = 2θ − R. Eq.s (4)-(10) can be similarly computed obtaining…”

Section: Applicationmentioning

confidence: 99%

“…As a consequence, characterizing how noise affects oscillators is crucial for practical applications. A wide variety of modeling techniques, many mainly oriented to circuit design are available: a recent and thorough review can be found in [1].…”

Section: Introductionmentioning

confidence: 99%

Phase and amplitude dynamics of noisy oscillators described by Itô stochastic differential equations

Bonnin

Traversa

Corinto

et al. 2015

2015 IEEE International Symposium on Circuits and Systems (ISCAS)

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We present a novel phase-amplitude model for noisy oscillators described by Itô stochastic differential equations. The model is completely rigorous and it holds for any value of the noise intensity. The phase and amplitude equations depend on the choice of an appropriate set of basis vectors. We show that using Floquet's basis, a phase-amplitude description is obtained analogous to others, previously proposed. We also show how, using moment closure techniques, information on the expected angular frequency, oscillation amplitude and amplitude variance can be obtained from the phase-amplitude model without solving the equations explicitly.

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“…Despite significant advances in recent years, achieving low PN is still a severe challenge [1][2][3][4], especially at high frequency. Despite significant advances in recent years, achieving low PN is still a severe challenge [1][2][3][4], especially at high frequency.…”

Section: Introductionmentioning

confidence: 99%

Analyses and techniques for phase noise reduction in CMOS Hartley oscillator topology

Chlis

Pepe

Zito

2017

Circuit Theory & Apps

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This paper reports the analyses of the inductive degeneration, noise filter, and optimum current density techniques for phase noise reduction in the CMOS Hartley oscillator circuit topology. The design of the circuit topology is carried out in 28 nm bulk CMOS technology in a range of common conditions adopted also for a previous study on the Colpitts topology, so complementing the previous study on Colpitts topology and allowing a direct comparison between the Hartley and Colpitts topologies. The theoretical analyses of the three techniques are carried out and verified by means of circuit simulations. The results obtained for the inductive degeneration and noise filter show the existence of an optimum inductance for minimum phase noise. Moreover, the results obtained for the optimum bias current density technique applied to a Hartley oscillator circuit topology incorporating either inductive degeneration or noise filter provide the demonstration of the existence of an optimum bias current density for minimum phase noise. Moreover, we will go beyond this important result, by investigating for the first time the relationship with the optimum current density for transistor minimum noise figure and other general results reported in the literature. Overall, the analyses show that the adoption of these techniques may lead to a potential phase noise reduction up to 16 dB at a 1 MHz frequency offset for an oscillation frequency of 10 GHz, with respect to the traditional Hartley topology. Lastly, we report a comparison under common conditions between Colpitts and Hartley topologies implementing the aforementioned techniques, which could, from a designer perspective, be useful to acquiring a few key insights about the circuit design opportunities and focus the design efforts toward specific directions for performance optimizations. that the Hartley topology with inductive degeneration can lead potentially to a PN reduction up to 10 dB.Lastly, the results presented in [5] show that the 1/f 3 region of the PN extends above a 1 MHz frequency offset for the Hartley oscillator circuit topology under study. This can be attributed to the adoption of nanoscale CMOS technologies characterized by flicker noise corners of several tens or hundreds of MHz, which lead to flicker noise upconversion being responsible for most of the PN even at large offsets from the carrier frequency. Thereby, the optimum inductance value for the total PN shown in Figure 5 is very close to that given by (7)-(9), because at a 1 MHz offset, thermal noise has a negligible effect on PN. NOISE FILTERIn this section, we will derive the analytical expression for the oscillation frequency (f 0 ) of a Hartley oscillator circuit topology in which we introduced a noise band-stop filter (L 4 , C 4 ) to the source node of M 1 as shown in Figure 7(a). Because of its noise filtering action, it is referred therein [8] as noise filter. Moreover, we will observe that there is an optimum inductance value (L 4 ) for which the Figure 7. (a) Hartley oscillator circuit topology...

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Survey of integrated‐circuit‐oscillator phase‐noise analysis

Cited by 35 publications

References 199 publications

Novel dissipative Lagrange-Hamilton formalism for LC/van der pol oscillator with new implication on phase noise dependency on quality factor

Novel dissipative Lagrange-Hamilton formalism for LC/van der pol oscillator with new implication on phase noise dependency on quality factor

Phase and amplitude dynamics of noisy oscillators described by Itô stochastic differential equations

Analyses and techniques for phase noise reduction in CMOS Hartley oscillator topology

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Survey of integrated‐circuit‐oscillator phase‐noise analysis

Cited by 35 publications

References 199 publications

Novel dissipative Lagrange-Hamilton formalism for LC/van der pol oscillator with new implication on phase noise dependency on quality factor

Novel dissipative Lagrange-Hamilton formalism for LC/van der pol oscillator with new implication on phase noise dependency on quality factor

Phase and amplitude dynamics of noisy oscillators described by It&#x00F4; stochastic differential equations

Analyses and techniques for phase noise reduction in CMOS Hartley oscillator topology

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Phase and amplitude dynamics of noisy oscillators described by Itô stochastic differential equations