Suppose that the real functions $f$ and $g$ are defined on an interval $\Delta$ . Then on this interval

• $\inf(f\!+\!g) \;\geqq\; \inf f+\inf g$
• $\sup(f\!+\!g) \;\leqq\; \sup f+\sup g$

If $f$ and $g$ are also nonnegative on $\Delta$ , we can write

• $\inf(fg) \;\geqq\; \inf f\cdot\inf g$
• $\sup(fg) \;\leqq\; \sup f\cdot\sup g$