Definition:Strictly Increasing

Ordered Sets
Let $$\left({S; \preceq_1}\right)$$ and $$\left({T; \preceq_2}\right)$$ be posets.

Let $$\phi: \left({S; \preceq_1}\right) \to \left({T; \preceq_2}\right)$$ be a mapping.

Then $$\phi$$ is strictly increasing if:


 * $$\forall x, y \in S: x \prec_1 y \iff \phi \left({x}\right) \prec_2 \phi \left({y}\right)$$

Note that this definition also holds if $$S = T$$.

Real Functions
This definition continues to hold when $$S = T = \R$$.

Thus, let $$f$$ be a real function.

Then $$f$$ is strictly increasing iff $$x < y \iff f \left({x}\right) < f \left({y}\right)$$.

Sequences
Let $$\left({S; \preceq}\right)$$ be a totally ordered set.

Then a sequence $$\left \langle {a_k} \right \rangle_{k \in A}$$ of terms of $$S$$ is strictly increasing iff:


 * $$\forall j, k \in A: j < k \implies a_j \prec a_k$$

Real Sequences
The above definition for sequences is usually applied to real number sequences.

Let $$\left \langle {x_n} \right \rangle$$ be a sequence in $\R$.

Then $$\left \langle {x_n} \right \rangle$$ is strictly increasing if


 * $$\forall n \in \N: x_n < x_{n+1}$$

Also see

 * Increasing
 * Strictly decreasing
 * Strictly monotone