Mathematical Models of Information and Stochastic Systems

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A01=Philipp Kornreich
advanced stochastic modeling techniques
Author_Philipp Kornreich
Average Randomness
Binary Bits
Category=GPFC
chaos and fractals
Conditional Distribution Function
Conditional Probability
Conditional Probability Matrix
continuous distribution functions
Continuous Random Variables
Discrete Distribution Functions
Discrete Random Process
Discrete Random Variables
Distribution Function
Eigen Vectors
entropy calculation methods
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
Flat Spots
Light Emitting Semiconductor Diode
Macroscopic Parameter
Mandelbrot Set
Optimum Transmission Rates
Oscillator Mass
Perfume Bottle
Power Density Spectrum
probabilistic mathematical model
probabilistic properties
probability theory applications
quantum mechanics
random process analysis
Random Variables
spectral density estimation
Spin Angular Momentum
statistical correlations
Stochastic Temperature
time-dependent stochastic system
Wide Sense Stationary
Wide Sense Stationary Random Process
WSS Process

Product details

  • ISBN 9781420058833
  • Weight: 657g
  • Dimensions: 156 x 234mm
  • Publication Date: 13 May 2008
  • Publisher: Taylor & Francis Inc
  • Publication City/Country: US
  • Product Form: Hardback
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From ancient soothsayers and astrologists to today’s pollsters and economists, probability theory has long been used to predict the future on the basis of past and present knowledge. Mathematical Models of Information and Stochastic Systems shows that the amount of knowledge about a system plays an important role in the mathematical models used to foretell the future of the system. It explains how this known quantity of information is used to derive a system’s probabilistic properties.

After an introduction, the book presents several basic principles that are employed in the remainder of the text to develop useful examples of probability theory. It examines both discrete and continuous distribution functions and random variables, followed by a chapter on the average values, correlations, and covariances of functions of variables as well as the probabilistic mathematical model of quantum mechanics. The author then explores the concepts of randomness and entropy and derives various discrete probabilities and continuous probability density functions from what is known about a particular stochastic system. The final chapters discuss information of discrete and continuous systems, time-dependent stochastic processes, data analysis, and chaotic systems and fractals.

By building a range of probability distributions based on prior knowledge of the problem, this classroom-tested text illustrates how to predict the behavior of diverse systems. A solutions manual is available for qualifying instructors.

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