kernel-fxtec-pro1x/drivers/media/i2c/aptina-pll.c
Sakari Ailus bcb63314e2 [media] media: Drop FSF's postal address from the source code files
Drop the FSF's postal address from the source code files that typically
contain mostly the license text. Of the 628 removed instances, 578 are
outdated.

The patch has been created with the following command without manual edits:

git grep -l "675 Mass Ave\|59 Temple Place\|51 Franklin St" -- \
	drivers/media/ include/media|while read i; do i=$i perl -e '
open(F,"< $ENV{i}");
$a=join("", <F>);
$a =~ s/[ \t]*\*\n.*You should.*\n.*along with.*\n.*(\n.*USA.*$)?\n//m
	&& $a =~ s/(^.*)Or, (point your browser to) /$1To obtain the license, $2\n$1/m;
close(F);
open(F, "> $ENV{i}");
print F $a;
close(F);'; done

Signed-off-by: Sakari Ailus <sakari.ailus@linux.intel.com>
2017-01-27 11:38:09 -02:00

168 lines
5.6 KiB
C

/*
* Aptina Sensor PLL Configuration
*
* Copyright (C) 2012 Laurent Pinchart <laurent.pinchart@ideasonboard.com>
*
* This program is free software; you can redistribute it and/or
* modify it under the terms of the GNU General Public License
* version 2 as published by the Free Software Foundation.
*
* This program is distributed in the hope that it will be useful, but
* WITHOUT ANY WARRANTY; without even the implied warranty of
* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
* General Public License for more details.
*/
#include <linux/device.h>
#include <linux/gcd.h>
#include <linux/kernel.h>
#include <linux/lcm.h>
#include <linux/module.h>
#include "aptina-pll.h"
int aptina_pll_calculate(struct device *dev,
const struct aptina_pll_limits *limits,
struct aptina_pll *pll)
{
unsigned int mf_min;
unsigned int mf_max;
unsigned int p1_min;
unsigned int p1_max;
unsigned int p1;
unsigned int div;
dev_dbg(dev, "PLL: ext clock %u pix clock %u\n",
pll->ext_clock, pll->pix_clock);
if (pll->ext_clock < limits->ext_clock_min ||
pll->ext_clock > limits->ext_clock_max) {
dev_err(dev, "pll: invalid external clock frequency.\n");
return -EINVAL;
}
if (pll->pix_clock == 0 || pll->pix_clock > limits->pix_clock_max) {
dev_err(dev, "pll: invalid pixel clock frequency.\n");
return -EINVAL;
}
/* Compute the multiplier M and combined N*P1 divisor. */
div = gcd(pll->pix_clock, pll->ext_clock);
pll->m = pll->pix_clock / div;
div = pll->ext_clock / div;
/* We now have the smallest M and N*P1 values that will result in the
* desired pixel clock frequency, but they might be out of the valid
* range. Compute the factor by which we should multiply them given the
* following constraints:
*
* - minimum/maximum multiplier
* - minimum/maximum multiplier output clock frequency assuming the
* minimum/maximum N value
* - minimum/maximum combined N*P1 divisor
*/
mf_min = DIV_ROUND_UP(limits->m_min, pll->m);
mf_min = max(mf_min, limits->out_clock_min /
(pll->ext_clock / limits->n_min * pll->m));
mf_min = max(mf_min, limits->n_min * limits->p1_min / div);
mf_max = limits->m_max / pll->m;
mf_max = min(mf_max, limits->out_clock_max /
(pll->ext_clock / limits->n_max * pll->m));
mf_max = min(mf_max, DIV_ROUND_UP(limits->n_max * limits->p1_max, div));
dev_dbg(dev, "pll: mf min %u max %u\n", mf_min, mf_max);
if (mf_min > mf_max) {
dev_err(dev, "pll: no valid combined N*P1 divisor.\n");
return -EINVAL;
}
/*
* We're looking for the highest acceptable P1 value for which a
* multiplier factor MF exists that fulfills the following conditions:
*
* 1. p1 is in the [p1_min, p1_max] range given by the limits and is
* even
* 2. mf is in the [mf_min, mf_max] range computed above
* 3. div * mf is a multiple of p1, in order to compute
* n = div * mf / p1
* m = pll->m * mf
* 4. the internal clock frequency, given by ext_clock / n, is in the
* [int_clock_min, int_clock_max] range given by the limits
* 5. the output clock frequency, given by ext_clock / n * m, is in the
* [out_clock_min, out_clock_max] range given by the limits
*
* The first naive approach is to iterate over all p1 values acceptable
* according to (1) and all mf values acceptable according to (2), and
* stop at the first combination that fulfills (3), (4) and (5). This
* has a O(n^2) complexity.
*
* Instead of iterating over all mf values in the [mf_min, mf_max] range
* we can compute the mf increment between two acceptable values
* according to (3) with
*
* mf_inc = p1 / gcd(div, p1) (6)
*
* and round the minimum up to the nearest multiple of mf_inc. This will
* restrict the number of mf values to be checked.
*
* Furthermore, conditions (4) and (5) only restrict the range of
* acceptable p1 and mf values by modifying the minimum and maximum
* limits. (5) can be expressed as
*
* ext_clock / (div * mf / p1) * m * mf >= out_clock_min
* ext_clock / (div * mf / p1) * m * mf <= out_clock_max
*
* or
*
* p1 >= out_clock_min * div / (ext_clock * m) (7)
* p1 <= out_clock_max * div / (ext_clock * m)
*
* Similarly, (4) can be expressed as
*
* mf >= ext_clock * p1 / (int_clock_max * div) (8)
* mf <= ext_clock * p1 / (int_clock_min * div)
*
* We can thus iterate over the restricted p1 range defined by the
* combination of (1) and (7), and then compute the restricted mf range
* defined by the combination of (2), (6) and (8). If the resulting mf
* range is not empty, any value in the mf range is acceptable. We thus
* select the mf lwoer bound and the corresponding p1 value.
*/
if (limits->p1_min == 0) {
dev_err(dev, "pll: P1 minimum value must be >0.\n");
return -EINVAL;
}
p1_min = max(limits->p1_min, DIV_ROUND_UP(limits->out_clock_min * div,
pll->ext_clock * pll->m));
p1_max = min(limits->p1_max, limits->out_clock_max * div /
(pll->ext_clock * pll->m));
for (p1 = p1_max & ~1; p1 >= p1_min; p1 -= 2) {
unsigned int mf_inc = p1 / gcd(div, p1);
unsigned int mf_high;
unsigned int mf_low;
mf_low = roundup(max(mf_min, DIV_ROUND_UP(pll->ext_clock * p1,
limits->int_clock_max * div)), mf_inc);
mf_high = min(mf_max, pll->ext_clock * p1 /
(limits->int_clock_min * div));
if (mf_low > mf_high)
continue;
pll->n = div * mf_low / p1;
pll->m *= mf_low;
pll->p1 = p1;
dev_dbg(dev, "PLL: N %u M %u P1 %u\n", pll->n, pll->m, pll->p1);
return 0;
}
dev_err(dev, "pll: no valid N and P1 divisors found.\n");
return -EINVAL;
}
EXPORT_SYMBOL_GPL(aptina_pll_calculate);
MODULE_DESCRIPTION("Aptina PLL Helpers");
MODULE_AUTHOR("Laurent Pinchart <laurent.pinchart@ideasonboard.com>");
MODULE_LICENSE("GPL v2");