Difference between revisions of "Delta integral"
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− | + | Let $\mathbb{T}$ be a [[time scale]]. Delta integration is defined as the inverse operation of [[delta derivative|delta differentiation]] in the sense that if $F^{\Delta}(t)=f(t)$, then | |
− | Let $\mathbb{T}$ be a [[ | + | $$\displaystyle\int_s^t f(\tau) \Delta \tau = F(t)-F(s).$$ |
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− | $$\displaystyle\int_s^t f(\tau) \Delta \tau = F(t)-F(s) | ||
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==Properties of $\Delta$-integrals== | ==Properties of $\Delta$-integrals== | ||
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[[Integration by parts for delta integrals with sigma in integrand]]<br /> | [[Integration by parts for delta integrals with sigma in integrand]]<br /> | ||
[[Integration by parts for delta integrals with no sigma in integrand]]<br /> | [[Integration by parts for delta integrals with no sigma in integrand]]<br /> | ||
+ | [[Delta integral over degenerate interval]]<br /> | ||
+ | [[Modulus of delta integral]]<br /> | ||
+ | [[Delta integral of nonnegative function]]<br /> | ||
+ | [[Delta integral of delta derivative]]<br /> | ||
+ | [[Delta derivative of the delta integral]]<br /> | ||
− | + | ==References== | |
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− | + | [[Category:Definition]] | |
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Latest revision as of 23:46, 22 August 2016
Let $\mathbb{T}$ be a time scale. Delta integration is defined as the inverse operation of delta differentiation in the sense that if $F^{\Delta}(t)=f(t)$, then
$$\displaystyle\int_s^t f(\tau) \Delta \tau = F(t)-F(s).$$
Properties of $\Delta$-integrals
Delta integral from t to sigma(t)
Delta integral is linear
Interchanging limits of delta integral
Delta integrals are additive over intervals
Integration by parts for delta integrals with sigma in integrand
Integration by parts for delta integrals with no sigma in integrand
Delta integral over degenerate interval
Modulus of delta integral
Delta integral of nonnegative function
Delta integral of delta derivative
Delta derivative of the delta integral