An operational matrix-based algorithm for simulating linear and fractional differential circuits
DATE(2012)
摘要
We present a new time-domain simulation algorithm (named OPM) based on operational matrices, which naturally handles system models cast in ordinary differential equations (ODEs), differential algebraic equations (DAEs), high-order differential equations and fractional differential equations (FDEs). When applied to simulating linear systems (represented by ODEs or DAEs), OPM has similar performance to advanced transient analysis methods such as trapezoidal or Gear's method in terms of complexity and accuracy. On the other hand, OPM naturally handles FDEs without much extra effort, which can not be efficiently solved using existing time-domain methods. High-order differential systems, being special cases of FDEs, can also be simulated using OPM. Moreover, adaptive time step can be utilized in OPM to provide a more flexible simulation with low CPU time. Numerical results then validate OPM's wide applicability and superiority.
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关键词
gear method,flexible simulation,fractional differential equation,fractional differential equations,low cpu time,transient analysis method,differential algebraic equations,time-domain simulation algorithm,matrix algebra,high-order differential system,operational matrix-based algorithm,fractional differential circuits,difference equations,validate opm,differential algebraic equation,high-order differential equation,adaptive time step,time-domain method,fractional differential circuit,existing time-domain method,linear systems,network analysis,ordinary differential equations,operational matrices,high-order differential equations,ordinary differential equation,transient analysis,cpu time,mathematical model,identification,time domain,authentication,linear system,differential equation,differential equations,physical unclonable function,accuracy,system modeling
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