Libros sobre el tema "Time reversal of diffusion"

United States. National Aeronautics and Space Administration., ed. On an origin of numerical diffusion: Violation of invariance under space-time inversion. [Washington, DC: National Aeronautics and Space Administration, 1992.

United States. National Aeronautics and Space Administration., ed. On an origin of numerical diffusion: Violation of invariance under space-time inversion. [Washington, DC: National Aeronautics and Space Administration, 1992.

Gan, Woon Siong. Time Reversal Acoustics. Singapore: Springer Singapore, 2021. http://dx.doi.org/10.1007/978-981-16-3235-8.

Geru, Ion I. Time-Reversal Symmetry. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-030-01210-6.

Rachidi, Farhad, Marcos Rubinstein y Mario Paolone, eds. Electromagnetic Time Reversal. Chichester, UK: John Wiley & Sons, Ltd, 2017. http://dx.doi.org/10.1002/9781119142119.

Time reversal, an autobiography. Oxford [England]: Clarendon Press, 1989.

The physics of time reversal. Chicago: University of Chicago Press, 1987.

Reverse time travel. London: Cassell, 1996.

Reverse time travel. London: Cassell, 1995.

Albert, David Z. Time and chance. Cambridge, Mass: Harvard University Press, 2000.

Altman, C. y K. Suchy. Reciprocity, Spatial Mapping and Time Reversal in Electromagnetics. Dordrecht: Springer Netherlands, 1991. http://dx.doi.org/10.1007/978-94-015-7915-5.

Altman, C. y K. Suchy. Reciprocity, Spatial Mapping and Time Reversal in Electromagnetics. Dordrecht: Springer Netherlands, 2011. http://dx.doi.org/10.1007/978-94-007-1530-1.

Altman, C. Reciprocity, Spatial Mapping and Time Reversal in Electromagnetics. Dordrecht: Springer Netherlands, 1991.

Altman, C. Reciprocity, spatial mapping, and time reversal in electromagnetics. 2^a ed. Dordrecht: Springer, 2011.

Altman, C. Reciprocity, spatial mapping and time reversal in electromagnetics. Dordrecht: Kluwer Academic Publishers, 1991.

Stock, James H. Diffusion indexes. Cambridge, MA: National Bureau of Economic Research, 1998.

Linnemann, Daniel. Quantum‐Enhanced Sensing Based on Time Reversal of Entangling Interactions. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-319-96008-1.

Ge, Fudong, YangQuan Chen y Chunhai Kou. Regional Analysis of Time-Fractional Diffusion Processes. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-319-72896-4.

Time travel: A new perspective. St. Paul, Minn., U.S.A: Llewellyn Publications, 1997.

E, Turkel y Institute for Computer Applications in Science and Engineering., eds. Long-time asymptotics of a system for plasma diffusion. Hampton, Va: Institute for Computer Applications in Science and Engineering, NASA Langley Research Center, 1985.

E, Turkel y Institute for Computer Applications in Science and Engineering., eds. Long-time asymptotics of a system for plasma diffusion. Hampton, Va: Institute for Computer Applications in Science and Engineering, NASA Langley Research Center, 1985.

Mark, Skalsey, ed. Time reversal: The Arthur Rich Memorial Symposium, Ann Arbor, MI 1991. New York: American Institute of Physics, 1993.

Winter, Thomas A. Examination of time-reversal acoustic application to shallow water active sonar systems. Monterey, Calif: Naval Postgraduate School, 2000.

Fink, Mathias. Renversement du temps, ondes et innovation. [Paris]: Collège de France, 2009.

Renversement du temps, ondes et innovation. [Paris]: Collège de France, 2009.

Fink, Mathias. Renversement du temps, ondes et innovation. [Paris]: Collège de France, 2009.

Hundsdorfer, Willem y Jan Verwer. Numerical Solution of Time-Dependent Advection-Diffusion-Reaction Equations. Berlin, Heidelberg: Springer Berlin Heidelberg, 2003. http://dx.doi.org/10.1007/978-3-662-09017-6.

Jan, Verwer, ed. Numerical Solution of Time-Dependent Advection-Diffusion-Reaction Equations. Berlin, Heidelberg: Springer Berlin Heidelberg, 2003.

1946-, Verwer J. G., ed. Numerical solution of time-dependent advection-diffusion-reaction equations. Berlin: Springer, 2003.

Heinemann, Michael Gerhard. Experimental studies of applications of time-reversal acoustics to non-coherent underwater communications. Monterey, Calif: Naval Postgraduate School, 2000.

Abrantes, António Adolfo Mendes. Examination of time-reversal acoustics in shallow water and applications to underwater communications. Monterey, Calif: Naval Postgraduate School, 1999.

Somoza, José Carlos. Zig zag: A novel. New York, NY: Rayo, 2007.

Umrigar, C. J. An accurate short-time Green function for diffusion Monte Carlo. Ithaca, N.Y: Cornell Theory Center, Cornell University, 1991.

Melino, Angelo. Estimation of unit averaged diffusion processes. Toronto: University of Toronto, 1985.

Steel, Ashley C. The diffusion of working time innovations in manufacturing and construction industry. Uxbridge: Brunel University, 1985.

Gaw, Jerry L. "A time to heal": The diffusion of Listerism in Victorian Britain. Philadelphia, Pa: American Philosophical Society, 1999.

Cockburn, B. The Local Discontinuous Galerkin method for time-dependent convection-diffusion systems. Hampton, VA: Institute for Computer Applications in Science and Engineering, NASA Langley Research Center, 1997.

Khriplovich, I. B. CP violation without strangeness: Electric dipole moments of particles, atoms, and molecules. Berlin: Springer-Verlag, 1997.

D, Bowman J., Gould C. R, Roberson N. R, Los Alamos National Laboratory, Triangle Universities Nuclear Laboratory y Workshop on Tests of Time Reversal Invariance in Neutron Physics (1987 : Chapel Hill, N.C.), eds. Tests of time reversal invariance in neutron physics: April 17-19. 1987, Chapel Hill, N.C. Singapore: World Scientific, 1987.

R, Gould C., Popov I͡U︡ P, Bowman J. D, Triangle Universities Nuclear Laboratory y International Workshop on Time Reversal Invariance and Parity Violation in Neutron Reactions (2nd : 1993 : Dubna, Chekhovskiĭ raĭon, Russia), eds. Time reversal invariance and parity violation in neutron reactions: Dubna, Russia, 4-7 May 1993. Singapore: World Scientific, 1994.

Nunes, João Pedro Vidal. Exponential-affine diffusion term structure models: Dimension, time-homogeneity, and stochastic volatility. [s.l.]: typescript, 2000.

Intersensory facilitation: Race, superposition, and diffusion models for reaction time to multiple stimuli. Frankfurt am Main: Peter Lang, 1992.

Aït-Sahalia, Yacine. Telling from discrete data whether the underlying continuous-time model is a diffusion. Cambridge, MA: National Bureau of Economic Research, 2001.

Research Institute for Advanced Computer Science (U.S.), ed. A deterministic particle method for one-dimensional reaction-diffusion equations. Moffett Field, CA: Research Institute for Advanced Computer Science, NASA Ames Research Center, 1995.

Denzler, Jochen. Higher-order time asymptotics of fast diffusion in Euclidean space: A dynamical systems methods. Providence, Rhode Island: American Mathematical Society, 2014.

Brennan, J. H. Voyage à travers le temps: Un guide pour les débutants. Varennes, Québec: AdA, 2008.

Watling, Keith Duncan. Formulae for solutions to (possibly degenerate) diffusion equations exhibiting semi-classical and small time asymptotics. [s.l.]: typescript, 1986.

Aït-Sahalia, Yacine. Closed-form likelihood expansions for multivariate diffusions. Cambridge, MA: National Bureau of Economic Research, 2002.

Gao, Kai. Time Reversal. Overseas Chinese Press Inc, 2022.

Gan, Woon Siong. Time Reversal Acoustics. Springer Singapore Pte. Limited, 2021.