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annotate src/fftw-3.3.3/genfft/littlesimp.ml @ 168:ceec0dd9ec9c

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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 <cannam@all-day-breakfast.com>
date Fri, 07 Feb 2020 11:51:13 +0000
parents 89f5e221ed7b
children
rev   line source
cannam@95 1 (*
cannam@95 2 * Copyright (c) 1997-1999 Massachusetts Institute of Technology
cannam@95 3 * Copyright (c) 2003, 2007-11 Matteo Frigo
cannam@95 4 * Copyright (c) 2003, 2007-11 Massachusetts Institute of Technology
cannam@95 5 *
cannam@95 6 * This program is free software; you can redistribute it and/or modify
cannam@95 7 * it under the terms of the GNU General Public License as published by
cannam@95 8 * the Free Software Foundation; either version 2 of the License, or
cannam@95 9 * (at your option) any later version.
cannam@95 10 *
cannam@95 11 * This program is distributed in the hope that it will be useful,
cannam@95 12 * but WITHOUT ANY WARRANTY; without even the implied warranty of
cannam@95 13 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
cannam@95 14 * GNU General Public License for more details.
cannam@95 15 *
cannam@95 16 * You should have received a copy of the GNU General Public License
cannam@95 17 * along with this program; if not, write to the Free Software
cannam@95 18 * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
cannam@95 19 *
cannam@95 20 *)
cannam@95 21
cannam@95 22 (*
cannam@95 23 * The LittleSimplifier module implements a subset of the simplifications
cannam@95 24 * of the AlgSimp module. These simplifications can be executed
cannam@95 25 * quickly here, while they would take a long time using the heavy
cannam@95 26 * machinery of AlgSimp.
cannam@95 27 *
cannam@95 28 * For example, 0 * x is simplified to 0 tout court by the LittleSimplifier.
cannam@95 29 * On the other hand, AlgSimp would first simplify x, generating lots
cannam@95 30 * of common subexpressions, storing them in a table etc, just to
cannam@95 31 * discard all the work later. Similarly, the LittleSimplifier
cannam@95 32 * reduces the constant FFT in Rader's algorithm to a constant sequence.
cannam@95 33 *)
cannam@95 34
cannam@95 35 open Expr
cannam@95 36
cannam@95 37 let rec makeNum = function
cannam@95 38 | n -> Num n
cannam@95 39
cannam@95 40 and makeUminus = function
cannam@95 41 | Uminus a -> a
cannam@95 42 | Num a -> makeNum (Number.negate a)
cannam@95 43 | a -> Uminus a
cannam@95 44
cannam@95 45 and makeTimes = function
cannam@95 46 | (Num a, Num b) -> makeNum (Number.mul a b)
cannam@95 47 | (Num a, Times (Num b, c)) -> makeTimes (makeNum (Number.mul a b), c)
cannam@95 48 | (Num a, b) when Number.is_zero a -> makeNum (Number.zero)
cannam@95 49 | (Num a, b) when Number.is_one a -> b
cannam@95 50 | (Num a, b) when Number.is_mone a -> makeUminus b
cannam@95 51 | (Num a, Uminus b) -> Times (makeUminus (Num a), b)
cannam@95 52 | (a, (Num b as b')) -> makeTimes (b', a)
cannam@95 53 | (a, b) -> Times (a, b)
cannam@95 54
cannam@95 55 and makePlus l =
cannam@95 56 let rec reduceSum x = match x with
cannam@95 57 [] -> []
cannam@95 58 | [Num a] -> if Number.is_zero a then [] else x
cannam@95 59 | (Num a) :: (Num b) :: c ->
cannam@95 60 reduceSum ((makeNum (Number.add a b)) :: c)
cannam@95 61 | ((Num _) as a') :: b :: c -> b :: reduceSum (a' :: c)
cannam@95 62 | a :: s -> a :: reduceSum s
cannam@95 63
cannam@95 64 in match reduceSum l with
cannam@95 65 [] -> makeNum (Number.zero)
cannam@95 66 | [a] -> a
cannam@95 67 | [a; b] when a == b -> makeTimes (Num Number.two, a)
cannam@95 68 | [Times (Num a, b); Times (Num c, d)] when b == d ->
cannam@95 69 makeTimes (makePlus [Num a; Num c], b)
cannam@95 70 | a -> Plus a
cannam@95 71