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annotate src/fftw-3.3.5/genfft/littlesimp.ml @ 83:ae30d91d2ffe

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Replace these with versions built using an older toolset (so as to avoid ABI compatibilities when linking on Ubuntu 14.04 for packaging purposes)
author Chris Cannam
date Fri, 07 Feb 2020 11:51:13 +0000
parents 2cd0e3b3e1fd
children
rev   line source
Chris@42 1 (*
Chris@42 2 * Copyright (c) 1997-1999 Massachusetts Institute of Technology
Chris@42 3 * Copyright (c) 2003, 2007-14 Matteo Frigo
Chris@42 4 * Copyright (c) 2003, 2007-14 Massachusetts Institute of Technology
Chris@42 5 *
Chris@42 6 * This program is free software; you can redistribute it and/or modify
Chris@42 7 * it under the terms of the GNU General Public License as published by
Chris@42 8 * the Free Software Foundation; either version 2 of the License, or
Chris@42 9 * (at your option) any later version.
Chris@42 10 *
Chris@42 11 * This program is distributed in the hope that it will be useful,
Chris@42 12 * but WITHOUT ANY WARRANTY; without even the implied warranty of
Chris@42 13 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
Chris@42 14 * GNU General Public License for more details.
Chris@42 15 *
Chris@42 16 * You should have received a copy of the GNU General Public License
Chris@42 17 * along with this program; if not, write to the Free Software
Chris@42 18 * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
Chris@42 19 *
Chris@42 20 *)
Chris@42 21
Chris@42 22 (*
Chris@42 23 * The LittleSimplifier module implements a subset of the simplifications
Chris@42 24 * of the AlgSimp module. These simplifications can be executed
Chris@42 25 * quickly here, while they would take a long time using the heavy
Chris@42 26 * machinery of AlgSimp.
Chris@42 27 *
Chris@42 28 * For example, 0 * x is simplified to 0 tout court by the LittleSimplifier.
Chris@42 29 * On the other hand, AlgSimp would first simplify x, generating lots
Chris@42 30 * of common subexpressions, storing them in a table etc, just to
Chris@42 31 * discard all the work later. Similarly, the LittleSimplifier
Chris@42 32 * reduces the constant FFT in Rader's algorithm to a constant sequence.
Chris@42 33 *)
Chris@42 34
Chris@42 35 open Expr
Chris@42 36
Chris@42 37 let rec makeNum = function
Chris@42 38 | n -> Num n
Chris@42 39
Chris@42 40 and makeUminus = function
Chris@42 41 | Uminus a -> a
Chris@42 42 | Num a -> makeNum (Number.negate a)
Chris@42 43 | a -> Uminus a
Chris@42 44
Chris@42 45 and makeTimes = function
Chris@42 46 | (Num a, Num b) -> makeNum (Number.mul a b)
Chris@42 47 | (Num a, Times (Num b, c)) -> makeTimes (makeNum (Number.mul a b), c)
Chris@42 48 | (Num a, b) when Number.is_zero a -> makeNum (Number.zero)
Chris@42 49 | (Num a, b) when Number.is_one a -> b
Chris@42 50 | (Num a, b) when Number.is_mone a -> makeUminus b
Chris@42 51 | (Num a, Uminus b) -> Times (makeUminus (Num a), b)
Chris@42 52 | (a, (Num b as b')) -> makeTimes (b', a)
Chris@42 53 | (a, b) -> Times (a, b)
Chris@42 54
Chris@42 55 and makePlus l =
Chris@42 56 let rec reduceSum x = match x with
Chris@42 57 [] -> []
Chris@42 58 | [Num a] -> if Number.is_zero a then [] else x
Chris@42 59 | (Num a) :: (Num b) :: c ->
Chris@42 60 reduceSum ((makeNum (Number.add a b)) :: c)
Chris@42 61 | ((Num _) as a') :: b :: c -> b :: reduceSum (a' :: c)
Chris@42 62 | a :: s -> a :: reduceSum s
Chris@42 63
Chris@42 64 in match reduceSum l with
Chris@42 65 [] -> makeNum (Number.zero)
Chris@42 66 | [a] -> a
Chris@42 67 | [a; b] when a == b -> makeTimes (Num Number.two, a)
Chris@42 68 | [Times (Num a, b); Times (Num c, d)] when b == d ->
Chris@42 69 makeTimes (makePlus [Num a; Num c], b)
Chris@42 70 | a -> Plus a
Chris@42 71