Silva, T.
and Keller, M.
(2010),
Theory of thermally induced phase noise in spin torque oscillators for a high-symmetry case, IEEE Transactions on Magnetics, [online], https://tsapps.nist.gov/publication/get_pdf.cfm?pub_id=903730
(Accessed April 23, 2024)
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Theory of thermally induced phase noise in spin torque oscillators for a high-symmetry case
Published
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Abstract
We derive equations for the phase noise spectrum of a spin torque oscillator in the macrospin approximation for the highly symmetric geometry where the equilibrium magnetization, applied field, anisotropy, and spin accumulation are all collinear. This particular problem is one that can be solved by analytical methods, but nevertheless illustrates several important general principles for phase noise in spin torque oscillators. In the limit, where the restoring torque is linearly proportional to the deviation of the amplitude from steady-state, the problem reduces to a sum of the Wiener-Lévy (W-L) and Ornstein-Uhlenbeck (O-U) processes familiar from the physics of random walks and Brownian motion. For typical device parameters, the O-U process dominates the phase noise and results in a phase noise spectrum that is nontrivial, with 1/{Ω}2 dependence at low Fourier frequency, and 1/{Ω}4 at high Fourier frequency. The contribution to oscillator line width due to the O-U process in the low temperature limit is independent of anisotropy Hk and it scales as inversely with the damping parameter, whereas in the high temperature limit the oscillator linewidth is independent of the damping parameter and it scales as sqrt(Hk). Numerical integration of the fully nonlinear stochastic differential equations is used to determine the temperature and precession amplitude range over which the presented equations for phase noise and line width are valid. We then expand the theory to include effects of spin torque asymmetry. Given the lack of experimental data for nanopillars in the geometry considered here, we make a rough extrapolation to the case of nanocontacts, with reasonable agreement with published data. The theory does not yield any obvious means to reduce phase noise to levels required for practical applications in the geometry considered here.Citation
IEEE Transactions on Magnetics
Volume
46
Issue
9
Pub Type
Journals
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Keywords
macrospin, spin torque, spin torque oscillator, phase noise, Ornstein-Uhlenbeck, Wiener-Lévy, Langevin equations
Citation
Created September 1, 2010, Updated June 2, 2021