Difference between revisions of "Delta Bihari inequality"
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− | <strong>Theorem:</strong> Suppose that $g$ is continuous and nondecreasing, $p$ is rd-continuous and nonnegative, and $y$ is rd-continuous. Let $w$ be the solution of | + | <strong>Theorem:</strong> Suppose that $g$ is continuous and nondecreasing, $p$ is [[continuous | rd-continuous]] and nonnegative, and $y$ is rd-continuous. Let $w$ be the solution of |
$$w^{\Delta}=p(t)g(w); w(a)=\beta$$ | $$w^{\Delta}=p(t)g(w); w(a)=\beta$$ | ||
and suppose there is a bijective function $G$ with $(G \circ w)^{\Delta} = p$. Then | and suppose there is a bijective function $G$ with $(G \circ w)^{\Delta} = p$. Then |
Revision as of 04:36, 6 September 2014
Theorem: Suppose that $g$ is continuous and nondecreasing, $p$ is rd-continuous and nonnegative, and $y$ is rd-continuous. Let $w$ be the solution of $$w^{\Delta}=p(t)g(w); w(a)=\beta$$ and suppose there is a bijective function $G$ with $(G \circ w)^{\Delta} = p$. Then $$y(t) \leq \beta + \displaystyle\int_a^t p(\tau)g(y(\tau)) \Delta \tau$$ for all $t \in \mathbb{T}$ implies $$y(t) \leq G^{-1} \left[ G(\beta) + \displaystyle\int_a^t p(\tau) \Delta \tau \right]$$ for all $t \in \mathbb{T}$.
Proof: █
References
R. Agarwal, M. Bohner, A. Peterson - Inequalities on Time Scales: A Survey