linux-stable/lib/polynomial.c
Michael Walle cd705ea857 lib: add generic polynomial calculation
Some temperature and voltage sensors use a polynomial to convert between
raw data points and actual temperature or voltage. The polynomial is
usually the result of a curve fitting of the diode characteristic.

The BT1 PVT hwmon driver already uses such a polynonmial calculation
which is rather generic. Move it to lib/ so other drivers can reuse it.

Signed-off-by: Michael Walle <michael@walle.cc>
Reviewed-by: Guenter Roeck <linux@roeck-us.net>
Link: https://lore.kernel.org/r/20220401214032.3738095-2-michael@walle.cc
Signed-off-by: Guenter Roeck <linux@roeck-us.net>
2022-05-22 11:32:30 -07:00

108 lines
3.6 KiB
C

// SPDX-License-Identifier: GPL-2.0-only
/*
* Generic polynomial calculation using integer coefficients.
*
* Copyright (C) 2020 BAIKAL ELECTRONICS, JSC
*
* Authors:
* Maxim Kaurkin <maxim.kaurkin@baikalelectronics.ru>
* Serge Semin <Sergey.Semin@baikalelectronics.ru>
*
*/
#include <linux/kernel.h>
#include <linux/module.h>
#include <linux/polynomial.h>
/*
* Originally this was part of drivers/hwmon/bt1-pvt.c.
* There the following conversion is used and should serve as an example here:
*
* The original translation formulae of the temperature (in degrees of Celsius)
* to PVT data and vice-versa are following:
*
* N = 1.8322e-8*(T^4) + 2.343e-5*(T^3) + 8.7018e-3*(T^2) + 3.9269*(T^1) +
* 1.7204e2
* T = -1.6743e-11*(N^4) + 8.1542e-8*(N^3) + -1.8201e-4*(N^2) +
* 3.1020e-1*(N^1) - 4.838e1
*
* where T = [-48.380, 147.438]C and N = [0, 1023].
*
* They must be accordingly altered to be suitable for the integer arithmetics.
* The technique is called 'factor redistribution', which just makes sure the
* multiplications and divisions are made so to have a result of the operations
* within the integer numbers limit. In addition we need to translate the
* formulae to accept millidegrees of Celsius. Here what they look like after
* the alterations:
*
* N = (18322e-20*(T^4) + 2343e-13*(T^3) + 87018e-9*(T^2) + 39269e-3*T +
* 17204e2) / 1e4
* T = -16743e-12*(D^4) + 81542e-9*(D^3) - 182010e-6*(D^2) + 310200e-3*D -
* 48380
* where T = [-48380, 147438] mC and N = [0, 1023].
*
* static const struct polynomial poly_temp_to_N = {
* .total_divider = 10000,
* .terms = {
* {4, 18322, 10000, 10000},
* {3, 2343, 10000, 10},
* {2, 87018, 10000, 10},
* {1, 39269, 1000, 1},
* {0, 1720400, 1, 1}
* }
* };
*
* static const struct polynomial poly_N_to_temp = {
* .total_divider = 1,
* .terms = {
* {4, -16743, 1000, 1},
* {3, 81542, 1000, 1},
* {2, -182010, 1000, 1},
* {1, 310200, 1000, 1},
* {0, -48380, 1, 1}
* }
* };
*/
/**
* polynomial_calc - calculate a polynomial using integer arithmetic
*
* @poly: pointer to the descriptor of the polynomial
* @data: input value of the polynimal
*
* Calculate the result of a polynomial using only integer arithmetic. For
* this to work without too much loss of precision the coefficients has to
* be altered. This is called factor redistribution.
*
* Returns the result of the polynomial calculation.
*/
long polynomial_calc(const struct polynomial *poly, long data)
{
const struct polynomial_term *term = poly->terms;
long total_divider = poly->total_divider ?: 1;
long tmp, ret = 0;
int deg;
/*
* Here is the polynomial calculation function, which performs the
* redistributed terms calculations. It's pretty straightforward.
* We walk over each degree term up to the free one, and perform
* the redistributed multiplication of the term coefficient, its
* divider (as for the rationale fraction representation), data
* power and the rational fraction divider leftover. Then all of
* this is collected in a total sum variable, which value is
* normalized by the total divider before being returned.
*/
do {
tmp = term->coef;
for (deg = 0; deg < term->deg; ++deg)
tmp = mult_frac(tmp, data, term->divider);
ret += tmp / term->divider_leftover;
} while ((term++)->deg);
return ret / total_divider;
}
EXPORT_SYMBOL_GPL(polynomial_calc);
MODULE_DESCRIPTION("Generic polynomial calculations");
MODULE_LICENSE("GPL");