In mathematical analysis, the final value theorem (FVT) is one of several similar theorems used to relate frequency domain expressions to the time domain behavior as time approaches infinity. Mathematically, if f ( t ) {\displaystyle f(t)} in continuous time has (unilateral) Laplace transform F ( s ) {\displaystyle F(s)}, then a final value theorem establishes conditions under which lim t → ∞ f ( t ) = lim s → 0 s F ( s ) . {\displaystyle \lim _{t\,\to \,\infty }f(t)=\lim _{s\,\to \,0}{sF(s)}.} Likewise, if f [ k ] {\displaystyle f[k]} in discrete time has (unilateral) Z-transform F ( z ) {\displaystyle F(z)}, then a final value theorem establishes conditions under which lim k → ∞ f [ k ] = lim z → 1 ( z − 1 ) F ( z ) . {\displaystyle \lim _{k\,\to \,\infty }f[k]=\lim _{z\,\to \,1}{(z-1)F(z)}.}

An Abelian final value theorem makes assumptions about the time-domain behavior of f ( t ) (or f [ k ] ) {\displaystyle f(t){\text{ (or }}f[k])} to calculate lim s → 0 s F ( s ) . {\textstyle \lim _{s\,\to \,0}{sF(s)}.} Conversely, a Tauberian final value theorem makes assumptions about the frequency-domain behaviour of F ( s ) {\displaystyle F(s)} to calculate lim t → ∞ f ( t ) {\displaystyle \lim _{t\to \infty }f(t)} (or lim k → ∞ f [ k ] ) {\displaystyle {\text{(or }}\lim _{k\to \infty }f[k])} (see Abelian and Tauberian theorems for integral transforms).

Final value theorems for the Laplace transform

Deducing lim t → ∞ f ( t )

In the following statements, the notation ‘ s → 0 ’ {\displaystyle {\text{‘}}s\to 0{\text{’}}} means that s {\displaystyle s} approaches 0, whereas ‘ s ↓ 0 ’ {\displaystyle {\text{‘}}s\downarrow 0{\text{’}}} means that s {\displaystyle s} approaches 0 through the positive numbers.

Standard Final Value Theorem

Suppose that every pole of F ( s ) {\displaystyle F(s)} is either in the open left half plane or at the origin, and that F ( s ) {\displaystyle F(s)} has at most a single pole at the origin. Then lim t → ∞ f ( t ) = lim s → 0 s F ( s ) . {\displaystyle \lim _{t\to \infty }f(t)=\lim _{s\to 0}sF(s).}

Final Value Theorem using Laplace transform of the derivative

Suppose that f ( t ) {\displaystyle f(t)} and f ′ ( t ) {\displaystyle f'(t)} both have Laplace transforms that exist for all s > 0. {\displaystyle s>0.} If lim t → ∞ f ( t ) {\displaystyle \lim _{t\to \infty }f(t)} exists and lim s → 0 s F ( s ) {\displaystyle \lim _{s\,\to \,0}{sF(s)}} exists then lim t → ∞ f ( t ) = lim s → 0 s F ( s ) . {\displaystyle \lim _{t\to \infty }f(t)=\lim _{s\,\to \,0}{sF(s)}.}

Remark

Both limits must exist for the theorem to hold. For example, if f ( t ) = sin ⁡ ( t ) {\displaystyle f(t)=\sin(t)} then lim t → ∞ f ( t ) {\displaystyle \lim _{t\to \infty }f(t)} does not exist, but lim s → 0 s F ( s ) = lim s → 0 s s 2 + 1 = 0. {\displaystyle \lim _{s\,\to \,0}{sF(s)}=\lim _{s\,\to \,0}{\frac {s}{s^{2}+1}}=0.}

Improved Tauberian converse Final Value Theorem

Suppose that f : ( 0 , ∞ ) → C {\displaystyle f:(0,\infty )\to \mathbb {C} } is bounded and differentiable, and that t f ′ ( t ) {\displaystyle tf'(t)} is also bounded on ( 0 , ∞ ) {\displaystyle (0,\infty )}. If s F ( s ) → L ∈ C {\displaystyle sF(s)\to L\in \mathbb {C} } as s → 0 {\displaystyle s\to 0} then lim t → ∞ f ( t ) = L . {\displaystyle \lim _{t\to \infty }f(t)=L.}

Extended Final Value Theorem

Suppose that F {\displaystyle F} is a proper rational function and that every pole of F {\displaystyle F} is either in the open left half-plane or at the origin. Then one of the following occurs:

  1. s F ( s ) → L ∈ R {\displaystyle sF(s)\to L\in \mathbb {R} } as s ↓ 0 , {\displaystyle s\downarrow 0,} and lim t → ∞ f ( t ) = L . {\displaystyle \lim _{t\to \infty }f(t)=L.}
  2. s F ( s ) → + ∞ ∈ R {\displaystyle sF(s)\to +\infty \in \mathbb {R} } as s ↓ 0 , {\displaystyle s\downarrow 0,} and f ( t ) → + ∞ {\displaystyle f(t)\to +\infty } as t → ∞ . {\displaystyle t\to \infty .}
  3. s F ( s ) → − ∞ ∈ R {\displaystyle sF(s)\to -\infty \in \mathbb {R} } as s ↓ 0 , {\displaystyle s\downarrow 0,} and f ( t ) → − ∞ {\displaystyle f(t)\to -\infty } as t → ∞ . {\displaystyle t\to \infty .}

In particular, if s = 0 {\displaystyle s=0} is a multiple pole of F ( s ) {\displaystyle F(s)} then case 2 or 3 applies ( f ( t ) → + ∞ or f ( t ) → − ∞ ) . {\displaystyle (f(t)\to +\infty {\text{ or }}f(t)\to -\infty ).}

Generalized Final Value Theorem

Suppose that f ( t ) {\displaystyle f(t)} is Laplace transformable. Let λ > − 1 {\displaystyle \lambda >-1}. If lim t → ∞ f ( t ) t λ {\textstyle \lim _{t\to \infty }{\frac {f(t)}{t^{\lambda }}}} exists and lim s ↓ 0 s λ + 1 F ( s ) {\textstyle \lim _{s\downarrow 0}{s^{\lambda +1}F(s)}} exists then

lim t → ∞ f ( t ) t λ = 1 Γ ( λ + 1 ) lim s ↓ 0 s λ + 1 F ( s ) , {\displaystyle \lim _{t\to \infty }{\frac {f(t)}{t^{\lambda }}}={\frac {1}{\Gamma (\lambda +1)}}\lim _{s\downarrow 0}{s^{\lambda +1}F(s)},}

where Γ ( x ) {\displaystyle \Gamma (x)} denotes the Gamma function.

Applications

Final value theorems for obtaining lim t → ∞ f ( t ) {\displaystyle \lim _{t\to \infty }f(t)} have applications in establishing the long-term stability of a system.

Deducing lim s → 0 s F ( s )

Abelian Final Value Theorem

Suppose that f : ( 0 , ∞ ) → C {\displaystyle f:(0,\infty )\to \mathbb {C} } is bounded and measurable and lim t → ∞ f ( t ) = α ∈ C . {\displaystyle \lim _{t\to \infty }f(t)=\alpha \in \mathbb {C} .} Then F ( s ) {\displaystyle F(s)} exists for all s > 0 {\displaystyle s>0} and lim s ↓ 0 s F ( s ) = α . {\displaystyle \lim _{s\,\downarrow \,0}{sF(s)}=\alpha .}

Elementary proof

Suppose for convenience that | f ( t ) | ≤ 1 {\displaystyle |f(t)|\leq 1} on ( 0 , ∞ ) , {\displaystyle (0,\infty ),} and let α = lim t → ∞ f ( t ) {\displaystyle \alpha =\lim _{t\to \infty }f(t)}. Let ϵ > 0 , {\displaystyle \epsilon >0,} and choose A {\displaystyle A} so that | f ( t ) − α | < ϵ {\displaystyle |f(t)-\alpha |<\epsilon } for all t > A . {\displaystyle t>A.} Since s ∫ 0 ∞ e − s t d t = 1 , {\displaystyle s\int _{0}^{\infty }e^{-st}\,\mathrm {d} t=1,} for every s > 0 {\displaystyle s>0} we have

s F ( s ) − α = s ∫ 0 ∞ ( f ( t ) − α ) e − s t d t ; {\displaystyle sF(s)-\alpha =s\int _{0}^{\infty }(f(t)-\alpha )e^{-st}\,\mathrm {d} t;}

hence

| s F ( s ) − α | ≤ s ∫ 0 A | f ( t ) − α | e − s t d t + s ∫ A ∞ | f ( t ) − α | e − s t d t ≤ 2 s ∫ 0 A e − s t d t + ϵ s ∫ A ∞ e − s t d t ≡ I + I I . {\displaystyle |sF(s)-\alpha |\leq s\int _{0}^{A}|f(t)-\alpha |e^{-st}\,\mathrm {d} t+s\int _{A}^{\infty }|f(t)-\alpha |e^{-st}\,\mathrm {d} t\leq 2s\int _{0}^{A}e^{-st}\,\mathrm {d} t+\epsilon s\int _{A}^{\infty }e^{-st}\,\mathrm {d} t\equiv I+II.}

Now for every s > 0 {\displaystyle s>0} we have

I I < ϵ s ∫ 0 ∞ e − s t d t = ϵ . {\displaystyle II<\epsilon s\int _{0}^{\infty }e^{-st}\,\mathrm {d} t=\epsilon .}

On the other hand, since A < ∞ {\displaystyle A<\infty } is fixed it is clear that lim s → 0 I = 0 {\displaystyle \lim _{s\to 0}I=0}, and so | s F ( s ) − α | < ϵ {\displaystyle |sF(s)-\alpha |<\epsilon } if s > 0 {\displaystyle s>0} is small enough.

Final Value Theorem using Laplace transform of the derivative

Suppose that all of the following conditions are satisfied:

  1. f : ( 0 , ∞ ) → C {\displaystyle f:(0,\infty )\to \mathbb {C} } is continuously differentiable and both f {\displaystyle f} and f ′ {\displaystyle f'} have a Laplace transform
  2. f ′ {\displaystyle f'} is absolutely integrable - that is, ∫ 0 ∞ | f ′ ( τ ) | d τ {\displaystyle \int _{0}^{\infty }|f'(\tau )|\,\mathrm {d} \tau } is finite
  3. lim t → ∞ f ( t ) {\displaystyle \lim _{t\to \infty }f(t)} exists and is finite

Then lim s → 0 + s F ( s ) = lim t → ∞ f ( t ) . {\displaystyle \lim _{s\to 0^{+}}sF(s)=\lim _{t\to \infty }f(t).}

Remark

The proof uses the dominated convergence theorem.

Final Value Theorem for the mean of a function

Let f : ( 0 , ∞ ) → C {\displaystyle f:(0,\infty )\to \mathbb {C} } be a continuous and bounded function such that such that the following limit exists

lim T → ∞ 1 T ∫ 0 T f ( t ) d t = α ∈ C {\displaystyle \lim _{T\to \infty }{\frac {1}{T}}\int _{0}^{T}f(t)\,dt=\alpha \in \mathbb {C} }

Then lim s → 0 , s > 0 s F ( s ) = α . {\displaystyle \lim _{s\,\to \,0,\,s>0}{sF(s)}=\alpha .}

Final Value Theorem for asymptotic sums of periodic functions

Suppose that f : [ 0 , ∞ ) → R {\displaystyle f:[0,\infty )\to \mathbb {R} } is continuous and absolutely integrable in [ 0 , ∞ ) . {\displaystyle [0,\infty ).} Suppose further that f {\displaystyle f} is asymptotically equal to a finite sum of periodic functions f a s , {\displaystyle f_{\mathrm {as} },} that is

| f ( t ) − f a s ( t ) | < ϕ ( t ) , {\displaystyle |f(t)-f_{\mathrm {as} }(t)|<\phi (t),}

where ϕ ( t ) {\displaystyle \phi (t)} is absolutely integrable in [ 0 , ∞ ) {\displaystyle [0,\infty )} and vanishes at infinity. Then

lim s → 0 s F ( s ) = lim t → ∞ 1 t ∫ 0 t f ( x ) d x . {\displaystyle \lim _{s\to 0}sF(s)=\lim _{t\to \infty }{\frac {1}{t}}\int _{0}^{t}f(x)\,\mathrm {d} x.}

Final Value Theorem for a function that diverges to infinity

Let f ( t ) : [ 0 , ∞ ) → R {\displaystyle f(t):[0,\infty )\to \mathbb {R} } satisfy all of the following conditions:

  1. f ( t ) {\displaystyle f(t)} is infinitely differentiable at zero
  2. f ( k ) ( t ) {\displaystyle f^{(k)}(t)} has a Laplace transform for all non-negative integers k {\displaystyle k}
  3. f ( t ) {\displaystyle f(t)} diverges to infinity as t → ∞ {\displaystyle t\to \infty }

Let F ( s ) {\displaystyle F(s)} be the Laplace transform of f ( t ) {\displaystyle f(t)}. Then s F ( s ) {\displaystyle sF(s)} diverges to infinity as s ↓ 0. {\displaystyle s\downarrow 0.}

Final Value Theorem for improperly integrable functions ( Abel's theorem for integrals)

Let h : [ 0 , ∞ ) → R {\displaystyle h:[0,\infty )\to \mathbb {R} } be measurable and such that the (possibly improper) integral f ( x ) := ∫ 0 x h ( t ) d t {\displaystyle f(x):=\int _{0}^{x}h(t)\,\mathrm {d} t} converges for x → ∞ . {\displaystyle x\to \infty .} Then ∫ 0 ∞ h ( t ) d t := lim x → ∞ f ( x ) = lim s ↓ 0 ∫ 0 ∞ e − s t h ( t ) d t . {\displaystyle \int _{0}^{\infty }h(t)\,\mathrm {d} t:=\lim _{x\to \infty }f(x)=\lim _{s\downarrow 0}\int _{0}^{\infty }e^{-st}h(t)\,\mathrm {d} t.} This is a version of Abel's theorem.

To see this, notice that f ′ ( t ) = h ( t ) {\displaystyle f'(t)=h(t)} and apply the final value theorem to f {\displaystyle f} after an integration by parts: For s > 0 , {\displaystyle s>0,}

s ∫ 0 ∞ e − s t f ( t ) d t = [ − e − s t f ( t ) ] t = o ∞ + ∫ 0 ∞ e − s t f ′ ( t ) d t = ∫ 0 ∞ e − s t h ( t ) d t . {\displaystyle s\int _{0}^{\infty }e^{-st}f(t)\,\mathrm {d} t={\Big [}-e^{-st}f(t){\Big ]}_{t=o}^{\infty }+\int _{0}^{\infty }e^{-st}f'(t)\,\mathrm {d} t=\int _{0}^{\infty }e^{-st}h(t)\,\mathrm {d} t.}

By the final value theorem, the left-hand side converges to lim x → ∞ f ( x ) {\displaystyle \lim _{x\to \infty }f(x)} for s → 0. {\displaystyle s\to 0.}

To establish the convergence of the improper integral lim x → ∞ f ( x ) {\displaystyle \lim _{x\to \infty }f(x)} in practice, Dirichlet's test for improper integrals is often helpful. An example is the Dirichlet integral.

Applications

Final value theorems for obtaining lim s → 0 s F ( s ) {\displaystyle \lim _{s\,\to \,0}{sF(s)}} have applications in probability and statistics to calculate the moments of a random variable. Let R ( x ) {\displaystyle R(x)} be cumulative distribution function of a continuous random variable X {\displaystyle X} and let ρ ( s ) {\displaystyle \rho (s)} be the Laplace–Stieltjes transform of R ( x ) . {\displaystyle R(x).} Then the n {\displaystyle n}-th moment of X {\displaystyle X} can be calculated as E [ X n ] = ( − 1 ) n d n ρ ( s ) d s n | s = 0 . {\displaystyle E[X^{n}]=(-1)^{n}\left.{\frac {d^{n}\rho (s)}{ds^{n}}}\right|_{s=0}.} The strategy is to write d n ρ ( s ) d s n = F ( G 1 ( s ) , G 2 ( s ) , … , G k ( s ) , … ) , {\displaystyle {\frac {d^{n}\rho (s)}{ds^{n}}}={\mathcal {F}}{\bigl (}G_{1}(s),G_{2}(s),\dots ,G_{k}(s),\dots {\bigr )},} where F ( … ) {\displaystyle {\mathcal {F}}(\dots )} is continuous and for each k , {\displaystyle k,} G k ( s ) = s F k ( s ) {\displaystyle G_{k}(s)=sF_{k}(s)} for a function F k ( s ) . {\displaystyle F_{k}(s).} For each k , {\displaystyle k,} put f k ( t ) {\displaystyle f_{k}(t)} as the inverse Laplace transform of F k ( s ) , {\displaystyle F_{k}(s),} obtain lim t → ∞ f k ( t ) , {\displaystyle \lim _{t\to \infty }f_{k}(t),} and apply a final value theorem to deduce lim s → 0 G k ( s ) = lim s → 0 s F k ( s ) = lim t → ∞ f k ( t ) . {\displaystyle \lim _{s\,\to \,0}{G_{k}(s)}=\lim _{s\,\to \,0}{sF_{k}(s)}=\lim _{t\to \infty }f_{k}(t).} Then

d n ρ ( s ) d s n | s = 0 = F ( lim s → 0 G 1 ( s ) , lim s → 0 G 2 ( s ) , … , lim s → 0 G k ( s ) , … ) , {\displaystyle \left.{\frac {d^{n}\rho (s)}{ds^{n}}}\right|_{s=0}={\mathcal {F}}{\Bigl (}\lim _{s\,\to \,0}G_{1}(s),\lim _{s\,\to \,0}G_{2}(s),\dots ,\lim _{s\,\to \,0}G_{k}(s),\dots {\Bigr )},}

and hence E [ X n ] {\displaystyle E[X^{n}]} is obtained.

Examples

Example where FVT holds

For example, for a system described by transfer function

H ( s ) = 6 s + 2 , {\displaystyle H(s)={\frac {6}{s+2}},}

the impulse response converges to

lim t → ∞ h ( t ) = lim s → 0 6 s s + 2 = 0. {\displaystyle \lim _{t\to \infty }h(t)=\lim _{s\to 0}{\frac {6s}{s+2}}=0.}

That is, the system returns to zero after being disturbed by a short impulse. However, the Laplace transform of the unit step response is

G ( s ) = 1 s 6 s + 2 {\displaystyle G(s)={\frac {1}{s}}{\frac {6}{s+2}}}

and so the step response converges to

lim t → ∞ g ( t ) = lim s → 0 s s 6 s + 2 = 6 2 = 3 {\displaystyle \lim _{t\to \infty }g(t)=\lim _{s\to 0}{\frac {s}{s}}{\frac {6}{s+2}}={\frac {6}{2}}=3}

So a zero-state system will follow an exponential rise to a final value of 3.

Example where FVT does not hold

For a system described by the transfer function

H ( s ) = 9 s 2 + 9 , {\displaystyle H(s)={\frac {9}{s^{2}+9}},}

the final value theorem appears to predict the final value of the impulse response to be 0 and the final value of the step response to be 1. However, neither time-domain limit exists, and so the final value theorem predictions are not valid. In fact, both the impulse response and step response oscillate, and (in this special case) the final value theorem describes the average values around which the responses oscillate.

There are two checks performed in Control theory which confirm valid results for the Final Value Theorem:

  1. All non-zero roots of the denominator of H ( s ) {\displaystyle H(s)} must have negative real parts.
  2. H ( s ) {\displaystyle H(s)} must not have more than one pole at the origin.

Rule 1 was not satisfied in this example, in that the roots of the denominator are 0 + j 3 {\displaystyle 0+j3} and 0 − j 3. {\displaystyle 0-j3.}

Final value theorems for the Z transform

Deducing lim k → ∞ f [ k ]

Final Value Theorem

If lim k → ∞ f [ k ] {\displaystyle \lim _{k\to \infty }f[k]} exists and lim z → 1 ( z − 1 ) F ( z ) {\displaystyle \lim _{z\,\to \,1}{(z-1)F(z)}} exists then lim k → ∞ f [ k ] = lim z → 1 ( z − 1 ) F ( z ) . {\displaystyle \lim _{k\to \infty }f[k]=\lim _{z\,\to \,1}{(z-1)F(z)}.}

Final value of linear systems

Continuous-time LTI systems

Final value of the system

x ˙ ( t ) = A x ( t ) + B u ( t ) {\displaystyle {\dot {\mathbf {x} }}(t)=\mathbf {A} \mathbf {x} (t)+\mathbf {B} \mathbf {u} (t)}

y ( t ) = C x ( t ) {\displaystyle \mathbf {y} (t)=\mathbf {C} \mathbf {x} (t)}

in response to a step input u ( t ) {\displaystyle \mathbf {u} (t)} with amplitude R {\displaystyle R} is:

lim t → ∞ y ( t ) = − C A − 1 B R {\displaystyle \lim _{t\to \infty }\mathbf {y} (t)=-\mathbf {CA} ^{-1}\mathbf {B} R}

Sampled-data systems

The sampled-data system of the above continuous-time LTI system at the aperiodic sampling times t i , i = 1 , 2 , . . . {\displaystyle t_{i},i=1,2,...} is the discrete-time system

x ( t i + 1 ) = Φ ( h i ) x ( t i ) + Γ ( h i ) u ( t i ) {\displaystyle {\mathbf {x} }(t_{i+1})=\mathbf {\Phi } (h_{i})\mathbf {x} (t_{i})+\mathbf {\Gamma } (h_{i})\mathbf {u} (t_{i})}

y ( t i ) = C x ( t i ) {\displaystyle \mathbf {y} (t_{i})=\mathbf {C} \mathbf {x} (t_{i})}

where h i = t i + 1 − t i {\displaystyle h_{i}=t_{i+1}-t_{i}} and

Φ ( h i ) = e A h i {\displaystyle \mathbf {\Phi } (h_{i})=e^{\mathbf {A} h_{i}}}, Γ ( h i ) = ∫ 0 h i e A s d s {\displaystyle \mathbf {\Gamma } (h_{i})=\int _{0}^{h_{i}}e^{\mathbf {A} s}\,\mathrm {d} s}

The final value of this system in response to a step input u ( t ) {\displaystyle \mathbf {u} (t)} with amplitude R {\displaystyle R} is the same as the final value of its original continuous-time system.

See also

Notes

External links

  • 2017-12-26 at the Wayback Machine: final value for Laplace
  • : final value proof for Z-transforms