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Douglas Anderson authored
There's a bit of math in rockchip_mmc_get_phase() to calculate the "fine delay". This math boils down to: PSECS_PER_SEC = 1000000000000. ROCKCHIP_MMC_DELAY_ELEMENT_PSEC = 60 card_clk * ROCKCHIP_MMC_DELAY_ELEMENT_PSEC * 360 * x / PSECS_PER_SEC ...but we do it in pieces to avoid overflowing 32-bits. Right now we overdo it a little bit, though, and end up getting less accurate math than we could. Right now we do: DIV_ROUND_CLOSEST((card_clk / 1000000) * (ROCKCHIP_MMC_DELAY_ELEMENT_PSEC / 10) * (360 / 10) * delay_num, PSECS_PER_SEC / 1000000 / 10 / 10) This is non-ideal because: A) The pins on Rockchip SoCs are rated to go at most 150 MHz, so the max card clock is 150 MHz. Even ignoring this the maximum SD card clock (for SDR104) would be 208 MHz. This means you can decrease your division by 100x and still not overflow: hex(208000000 / 10000 * 6 * 36 * 0xff) == 0x44497200 B) On many Rockchip SoCs we end up with a card clock that is actually 148500000 because we parent off the 297 MHz PLL. That means the math we're actually doing today is less than ideal. Specifically: 148500000 / 1000000 = 148 Let's fix the math to be slightly more accurate. NOTE: no known problems are fixed by this. It was found simply by code inspection. If you want to see the difference between the old and the new on a 148.5 MHz clock, this python can help: old = [x for x in (int(round(148 * 6 * 36 * x / 10000.)) for x in range(256)) if x < 90] new = [x for x in (int(round(1485 * 6 * 36 * x / 100000.)) for x in range(256)) if x < 90] The only differences are: delay_num=17 54=>55 delay_num=22 70=>71 delay_num=27 86=>87 Signed-off-by: Douglas Anderson <dianders@chromium.org> Signed-off-by: Heiko Stuebner <heiko@sntech.de>
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