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System Entropy Measurement of Stochastic Partial Differential Systems
- Source :
- Entropy, Vol 18, Iss 3, p 99 (2016), Entropy; Volume 18; Issue 3; Pages: 99
- Publication Year :
- 2016
- Publisher :
- MDPI AG, 2016.
-
Abstract
- System entropy describes the dispersal of a system’s energy and is an indication of the disorder of a physical system. Several system entropy measurement methods have been developed for dynamic systems. However, most real physical systems are always modeled using stochastic partial differential dynamic equations in the spatio-temporal domain. No efficient method currently exists that can calculate the system entropy of stochastic partial differential systems (SPDSs) in consideration of the effects of intrinsic random fluctuation and compartment diffusion. In this study, a novel indirect measurement method is proposed for calculating of system entropy of SPDSs using a Hamilton–Jacobi integral inequality (HJII)-constrained optimization method. In other words, we solve a nonlinear HJII-constrained optimization problem for measuring the system entropy of nonlinear stochastic partial differential systems (NSPDSs). To simplify the system entropy measurement of NSPDSs, the global linearization technique and finite difference scheme were employed to approximate the nonlinear stochastic spatial state space system. This allows the nonlinear HJII-constrained optimization problem for the system entropy measurement to be transformed to an equivalent linear matrix inequalities (LMIs)-constrained optimization problem, which can be easily solved using the MATLAB LMI-toolbox (MATLAB R2014a, version 8.3). Finally, several examples are presented to illustrate the system entropy measurement of SPDSs.
- Subjects :
- entropy maximization principle
Hamilton–Jacobi integral inequality (HJII)
linear matrix inequalities (LMIs)
stochastic partial differential system (SPDS)
system entropy
General Physics and Astronomy
lcsh:Astrophysics
02 engineering and technology
01 natural sciences
010305 fluids & plasmas
Differential entropy
0103 physical sciences
lcsh:QB460-466
0202 electrical engineering, electronic engineering, information engineering
Applied mathematics
Entropy maximization
Entropy (energy dispersal)
lcsh:Science
Mathematics
Principle of maximum entropy
Mathematical analysis
Quantum relative entropy
lcsh:QC1-999
Stochastic partial differential equation
Maximum entropy probability distribution
020201 artificial intelligence & image processing
lcsh:Q
Joint quantum entropy
lcsh:Physics
Subjects
Details
- Language :
- English
- ISSN :
- 10994300
- Volume :
- 18
- Issue :
- 3
- Database :
- OpenAIRE
- Journal :
- Entropy
- Accession number :
- edsair.doi.dedup.....ab61b88a6331d8b6551004ade240f832