aivika-4.3.4: A multi-paradigm simulation library

CopyrightCopyright (c) 2009-2015, David Sorokin <david.sorokin@gmail.com>
LicenseBSD3
MaintainerDavid Sorokin <david.sorokin@gmail.com>
Stabilityexperimental
Safe HaskellNone
LanguageHaskell2010

Simulation.Aivika.SystemDynamics

Contents

Description

Tested with: GHC 7.10.1

This module defines integrals and other functions of System Dynamics.

Synopsis

Equality and Ordering

(.==.) :: Eq a => Dynamics a -> Dynamics a -> Dynamics Bool Source

Compare for equality.

(./=.) :: Eq a => Dynamics a -> Dynamics a -> Dynamics Bool Source

Compare for inequality.

(.<.) :: Ord a => Dynamics a -> Dynamics a -> Dynamics Bool Source

Compare for ordering.

(.>=.) :: Ord a => Dynamics a -> Dynamics a -> Dynamics Bool Source

Compare for ordering.

(.>.) :: Ord a => Dynamics a -> Dynamics a -> Dynamics Bool Source

Compare for ordering.

(.<=.) :: Ord a => Dynamics a -> Dynamics a -> Dynamics Bool Source

Compare for ordering.

maxDynamics :: Ord a => Dynamics a -> Dynamics a -> Dynamics a Source

Return the maximum.

minDynamics :: Ord a => Dynamics a -> Dynamics a -> Dynamics a Source

Return the minimum.

ifDynamics :: Dynamics Bool -> Dynamics a -> Dynamics a -> Dynamics a Source

Implement the if-then-else operator.

Ordinary Differential Equations

integ Source

Arguments

:: Dynamics Double

the derivative

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the integral

Return an integral with the specified derivative and initial value.

To create a loopback, you should use the recursive do-notation. It allows defining the differential equations unordered as in mathematics:

model :: Simulation [Double]
model = 
  mdo a <- integ (- ka * a) 100
      b <- integ (ka * a - kb * b) 0
      c <- integ (kb * b) 0
      let ka = 1
          kb = 1
      runDynamicsInStopTime $ sequence [a, b, c]

integEither Source

Arguments

:: Dynamics (Either Double Double)

either set a new Left integral value, or use a Right derivative

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double) 

Like integ but allows either setting a new Left integral value, or integrating using the Right derivative directly within computation.

This function always uses Euler's method.

smoothI Source

Arguments

:: Dynamics Double

the value to smooth over time

-> Dynamics Double

time

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the first order exponential smooth

Return the first order exponential smooth.

To create a loopback, you should use the recursive do-notation with help of which the function itself is defined:

smoothI x t i =
  mdo y <- integ ((x - y) / t) i
      return y

smooth Source

Arguments

:: Dynamics Double

the value to smooth over time

-> Dynamics Double

time

-> Simulation (Dynamics Double)

the first order exponential smooth

Return the first order exponential smooth.

This is a simplified version of the smoothI function without specifing the initial value.

smooth3I Source

Arguments

:: Dynamics Double

the value to smooth over time

-> Dynamics Double

time

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the third order exponential smooth

Return the third order exponential smooth.

To create a loopback, you should use the recursive do-notation with help of which the function itself is defined:

smooth3I x t i =
  mdo y  <- integ ((s2 - y) / t') i
      s2 <- integ ((s1 - s2) / t') i
      s1 <- integ ((x - s1) / t') i
      let t' = t / 3.0
      return y

smooth3 Source

Arguments

:: Dynamics Double

the value to smooth over time

-> Dynamics Double

time

-> Simulation (Dynamics Double)

the third order exponential smooth

Return the third order exponential smooth.

This is a simplified version of the smooth3I function without specifying the initial value.

smoothNI Source

Arguments

:: Dynamics Double

the value to smooth over time

-> Dynamics Double

time

-> Int

the order

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the n'th order exponential smooth

Return the n'th order exponential smooth.

The result is not discrete in that sense that it may change within the integration time interval depending on the integration method used. Probably, you should apply the discreteDynamics function to the result if you want to achieve an effect when the value is not changed within the time interval, which is used sometimes.

smoothN Source

Arguments

:: Dynamics Double

the value to smooth over time

-> Dynamics Double

time

-> Int

the order

-> Simulation (Dynamics Double)

the n'th order exponential smooth

Return the n'th order exponential smooth.

This is a simplified version of the smoothNI function without specifying the initial value.

delay1I Source

Arguments

:: Dynamics Double

the value to conserve

-> Dynamics Double

time

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the first order exponential delay

Return the first order exponential delay.

To create a loopback, you should use the recursive do-notation with help of which the function itself is defined:

delay1I x t i =
  mdo y <- integ (x - y / t) (i * t)
      return $ y / t

delay1 Source

Arguments

:: Dynamics Double

the value to conserve

-> Dynamics Double

time

-> Simulation (Dynamics Double)

the first order exponential delay

Return the first order exponential delay.

This is a simplified version of the delay1I function without specifying the initial value.

delay3I Source

Arguments

:: Dynamics Double

the value to conserve

-> Dynamics Double

time

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the third order exponential delay

Return the third order exponential delay.

delay3 Source

Arguments

:: Dynamics Double

the value to conserve

-> Dynamics Double

time

-> Simulation (Dynamics Double)

the third order exponential delay

Return the third order exponential delay.

This is a simplified version of the delay3I function without specifying the initial value.

delayNI Source

Arguments

:: Dynamics Double

the value to conserve

-> Dynamics Double

time

-> Int

the order

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the n'th order exponential delay

Return the n'th order exponential delay.

delayN Source

Arguments

:: Dynamics Double

the value to conserve

-> Dynamics Double

time

-> Int

the order

-> Simulation (Dynamics Double)

the n'th order exponential delay

Return the n'th order exponential delay.

This is a simplified version of the delayNI function without specifying the initial value.

forecast Source

Arguments

:: Dynamics Double

the value to forecast

-> Dynamics Double

the average time

-> Dynamics Double

the time horizon

-> Simulation (Dynamics Double)

the forecast

Return the forecast.

The function has the following definition:

forecast x at hz =
  do y <- smooth x at
     return $ x * (1.0 + (x / y - 1.0) / at * hz)

trend Source

Arguments

:: Dynamics Double

the value for which the trend is calculated

-> Dynamics Double

the average time

-> Dynamics Double

the initial value

-> Simulation (Dynamics Double)

the fractional change rate

Return the trend.

The function has the following definition:

trend x at i =
  do y <- smoothI x at (x / (1.0 + i * at))
     return $ (x / y - 1.0) / at

Difference Equations

diffsum Source

Arguments

:: (Num a, Unboxed a) 
=> Dynamics a

the difference

-> Dynamics a

the initial value

-> Simulation (Dynamics a)

the sum

Retun the sum for the difference equation. It is like an integral returned by the integ function, only now the difference is used instead of derivative.

As usual, to create a loopback, you should use the recursive do-notation.

diffsumEither Source

Arguments

:: (Num a, Unboxed a) 
=> Dynamics (Either a a)

either set the Left value for the sum, or add the Right difference to the sum

-> Dynamics a

the initial value

-> Simulation (Dynamics a)

the sum

Like diffsum but allows either setting a new Left sum value, or adding the Right difference.

Table Functions

lookupDynamics :: Dynamics Double -> Array Int (Double, Double) -> Dynamics Double Source

Lookup x in a table of pairs (x, y) using linear interpolation.

lookupStepwiseDynamics :: Dynamics Double -> Array Int (Double, Double) -> Dynamics Double Source

Lookup x in a table of pairs (x, y) using stepwise function.

Discrete Functions

delay Source

Arguments

:: Dynamics a

the value to delay

-> Dynamics Double

the lag time

-> Dynamics a

the delayed value

Return the delayed value using the specified lag time.

delayI Source

Arguments

:: Dynamics a

the value to delay

-> Dynamics Double

the lag time

-> Dynamics a

the initial value

-> Simulation (Dynamics a)

the delayed value

Return the delayed value using the specified lag time and initial value. Because of the latter, it allows creating a loop back.

step Source

Arguments

:: Dynamics Double

the height

-> Dynamics Double

the step time

-> Dynamics Double 

Computation that returns 0 until the step time and then returns the specified height.

pulse Source

Arguments

:: Dynamics Double

the time start

-> Dynamics Double

the interval width

-> Dynamics Double 

Computation that returns 1, starting at the time start, and lasting for the interval width; 0 is returned at all other times.

pulseP Source

Arguments

:: Dynamics Double

the time start

-> Dynamics Double

the interval width

-> Dynamics Double

the time period

-> Dynamics Double 

Computation that returns 1, starting at the time start, and lasting for the interval width and then repeats this pattern with the specified period; 0 is returned at all other times.

ramp Source

Arguments

:: Dynamics Double

the slope parameter

-> Dynamics Double

the time start

-> Dynamics Double

the end time

-> Dynamics Double 

Computation that returns 0 until the specified time start and then slopes upward until the end time and then holds constant.

Financial Functions

npv Source

Arguments

:: Dynamics Double

the stream

-> Dynamics Double

the discount rate

-> Dynamics Double

the initial value

-> Dynamics Double

factor

-> Simulation (Dynamics Double)

the Net Present Value (NPV)

Return the Net Present Value (NPV) of the stream computed using the specified discount rate, the initial value and some factor (usually 1).

It is defined in the following way:

npv stream rate init factor =
  mdo let dt' = liftParameter dt
      df <- integ (- df * rate) 1
      accum <- integ (stream * df) init
      return $ (accum + dt' * stream * df) * factor

npve Source

Arguments

:: Dynamics Double

the stream

-> Dynamics Double

the discount rate

-> Dynamics Double

the initial value

-> Dynamics Double

factor

-> Simulation (Dynamics Double)

the Net Present Value End (NPVE)

Return the Net Present Value End of period (NPVE) of the stream computed using the specified discount rate, the initial value and some factor.

It is defined in the following way:

npve stream rate init factor =
  mdo let dt' = liftParameter dt
      df <- integ (- df * rate / (1 + rate * dt')) (1 / (1 + rate * dt'))
      accum <- integ (stream * df) init
      return $ (accum + dt' * stream * df) * factor