In this scenario, the launch clock CLK1
is the slow clock; the capture clock
CLK2
is the fast clock. See the following figure.
Figure 1. Multicycles Between SLOW-to-FAST Clocks
![](https://docs.amd.com/api/khub/maps/QjubAheatiytfZyCMjRxIQ/resources/7vorf5~sYB4Bw~0Ru8VCfw-QjubAheatiytfZyCMjRxIQ/resized-content?v=419d2e30b759033c)
For example, assume the following:
-
CLK2
is three times the frequency ofCLK1
. - A clock enable signal on the receiving registers allows a Multicycle constraint to be set between both clocks. See the following figure.
Figure 2. Multicycles Between SLOW-to-FAST Clocks
![](data:image/png;base64,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)
The setup and hold relationships that are resolved by the STA tool when no multicycle is applied are shown in the following figure.
Figure 3. Default Setup and Hold Relationships
![](https://docs.amd.com/api/khub/maps/QjubAheatiytfZyCMjRxIQ/resources/q4Qx_UFUXnj0DoYOz9mnRg-QjubAheatiytfZyCMjRxIQ/content?v=ff3396aacaba5e66)