previous edition is the decreased emphasis on decision-theoretic principles. Nevertheless, the connection between Bayesian Statistics and Decision Theory is developed. Moreover, the author emphasizes the increasing importance of computational techniques." (Krzysztof Piasecki, Zentralblatt MATH, Vol. 980, ...
The theory was first presented within the context of time-reversal symmetry [1,2,3] but, more recently, has been developed into a practical tool for analysing experiments in quantum optics [7,8,9,10,11,12,13,14,15] and other areas such as continuous monitoring [16,17,18,19,20,21,...
Article ADS MathSciNet Google Scholar A. Riotto, “Inflation and the theory of cosmological perturbations”, Lectures from the Summer School on Astroparticle Physics and Cosmology, Trieste, hep-ph/0210162 (2002). J. Lindesay, “An introduction of multiple scales in a dynamical cosmology”, gr-...
This is a review of the issue of randomness in quantum mechanics, with special emphasis on its ambiguity; for example, randomness has different antipodal relationships to determinism, computability, and compressibility. Following a (Wittgensteinian) philosophical discussion of randomness in general, I ar...
$$\begin{aligned} (\forall x^0)(\forall x^1)(\forall x^2)(\forall x^3) \left( \sum _{\nu =0}^3 \frac{\partial }{\partial x^{\nu } } T^{\nu }_{\mu } = - \frac{\partial \boldsymbol{\mathcal {L}}}{\partial x^{\mu }} \right) . \end{aligned}$$ ...
This technique is explained in Chaps. 12 and 19 of Ref. [4]. The pseudotimesresembles the so-called Schwinger proper time used in relativistic physics. There should be no danger of confusing the fluctuating noise variableηin this equation with the constant critical exponentηin (9). ...