Difference between revisions of "Induction on time scales"

From timescalewiki
Jump to: navigation, search
 
Line 10: Line 10:
  
 
==References==
 
==References==
* {{BookReference|Dynamic Equations on Time Scales|2001|Martin Bohner|author2=Allan Peterson|prev=Forward jump|next=}}: Theorem 1.7
+
* {{BookReference|Dynamic Equations on Time Scales|2001|Martin Bohner|author2=Allan Peterson|prev=Forward jump|next=Delta derivative}}: Theorem 1.7
 
[http://web.mst.edu/~bohner/sample.pdf]
 
[http://web.mst.edu/~bohner/sample.pdf]
  
 
[[Category:Theorem]]
 
[[Category:Theorem]]
 
[[Category:Unproven]]
 
[[Category:Unproven]]

Latest revision as of 05:10, 10 June 2016

Theorem

Let $\mathbb{T}$ be a time scale. Let $t_0 \in \mathbb{T}$ and assume that $\{S(t) \colon t \in [t_0,\infty)\}$ is a family of statements satisfying the following axioms:

  • the statement $S(t_0)$ is true
  • if $t \in [t_0,\infty)$ is right-scattered and $S(t)$ is true, then $S(\sigma(t))$ is true
  • if $t \in [t_0,\infty)$ is right-dense and $S(t)$ is true, then there is a neighborhood $U$ of $t$ such that $S(s)$ is true for all $s \in U \cap (t,\infty)$
  • if $t \in (t_0, \infty)$ is left-dense and $S(s)$ is true for all $s \in [t_0,t)$, then $S(t)$ is true.

Then $S(t)$ is true for all $t \in [t_0,\infty)$.

Proof

References

[1]