Thermodynamic costs in implementing Kalman-Bucy filters
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[1] Touchette,et al. Information-theoretic limits of control , 1999, Physical review letters.
[2] R. E. Mortensen,et al. Filtering for stochastic processes with applications to guidance , 1972 .
[3] A. Schaft. Port-Hamiltonian systems: an introductory survey , 2006 .
[4] Brian D. O. Anderson,et al. Network Analysis and Synthesis: A Modern Systems Theory Approach , 2006 .
[5] Henrik Sandberg,et al. On Lossless Approximations, the Fluctuation- Dissipation Theorem, and Limitations of Measurements , 2006, IEEE Transactions on Automatic Control.
[6] W. Wonham. On the Separation Theorem of Stochastic Control , 1968 .
[7] H. Nyquist. Thermal Agitation of Electric Charge in Conductors , 1928 .
[8] Juan Luis Varona,et al. Port-Hamiltonian systems: an introductory survey , 2006 .
[9] Masahito Ueda,et al. Nonequilibrium thermodynamics of feedback control. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.
[10] R. Landauer,et al. Irreversibility and heat generation in the computing process , 1961, IBM J. Res. Dev..
[11] Henrik Sandberg,et al. The Observer Effect in Estimation with Physical Communication Constraints , 2011 .
[12] Suriyanarayanan Vaikuntanathan,et al. Nonequilibrium detailed fluctuation theorem for repeated discrete feedback. , 2010, Physical review. E, Statistical, nonlinear, and soft matter physics.
[13] Henrik Sandberg,et al. Second-law-like inequalities with information and their interpretations , 2014, 1409.5351.
[14] Nigel J. Newton,et al. Information and Entropy Flow in the Kalman–Bucy Filter , 2005 .
[15] Henrik Sandberg,et al. Maximum work extraction and implementation costs for nonequilibrium Maxwell's demons. , 2014, Physical review. E, Statistical, nonlinear, and soft matter physics.
[16] Henrik Sandberg,et al. Finite-time thermodynamics of port-Hamiltonian systems , 2013, 1308.1213.
[17] J. Johnson. Thermal Agitation of Electricity in Conductors , 1927, Nature.
[18] J. Willems. Dissipative dynamical systems Part II: Linear systems with quadratic supply rates , 1972 .