$F$ : Set of all function from $\{1,2,3 \ldots . n\}$ to $\{0,1\}$ and "$R=\leq$"

$F \leq g$ iff $f(x) \leq g(x), \forall x, \in\{1,2,3 \ldots \ldots n\}$

Let,

GATE CSE 2025 Set 2 Discrete Mathematics - Set Theory & Algebra Question 1 English Explanation

$$\begin{array}{ll} \text { Here } & f(x) \leq g(x) \\ \text { But } & g(x) \not \leq f(x) \end{array}$$

$\therefore \quad$ It cannot be a symmetric.

$\Rightarrow$ It cannot be equivalence reaction.

But here, If $f(x) \leq g(x)$ and $g(x) \leq f(x)$

$$\begin{aligned} &\text { Then, }\\ &\begin{aligned} f(x) & =g(x) \\ (0 & =0) \\ (1 & =1) \end{aligned} \end{aligned}$$

$\therefore$ It is antisymmetric.

Reflexive:

$$\begin{aligned} \because \quad f(x) & \leq f(x), \forall x, \in\{1,2, \ldots n\} \\ 0 & \leq 0 \\ 1 & \leq 0 \end{aligned}$$

$\therefore$ It is reflexive.

Transitive:

Let,

$$\begin{aligned} & 0 \leq 1 \\ & 1 \leq 0 \end{aligned}$$

Let $0 \leq 0$ and $0 \leq 1$ then $0 \leq 1$

$$\begin{aligned} &\begin{array}{ll} \therefore & f(x) \leq g(x) \text { and } g(x) \leq h(x) \\ \text { Then } & f(x) \leq h(x) \end{array}\\ &\therefore \text { It is transitive. } \end{aligned}$$

$\therefore$ It is transitive.

Hence it is poset.

We know that,

glb $(f, g)$ wrt ' $\leq$ ' is $f$

lub $(f, g)$ wrt $\leq$ is $g$

$\therefore \quad$ For every two function $\mathrm{F} \exists \mathrm{a}$ glb and lub also.

$\therefore \quad(f, \leq)$ is a lattice.