(* * Copyright (c) 1997-1999 Massachusetts Institute of Technology * * This program is free software; you can redistribute it and/or modify * it under the terms of the GNU General Public License as published by * the Free Software Foundation; either version 2 of the License, or * (at your option) any later version. * * 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. * * You should have received a copy of the GNU General Public License * along with this program; if not, write to the Free Software * Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA * *) (* $Id: twiddle.ml,v 1.2 1999/02/19 17:22:19 athena Exp $ *) (* This file implements various policies for either loading the twiddle * factors according to various algorithms. *) open Complex open Util let square x = if (!Magic.use_wsquare) then wsquare x else times x x (* various policies for computing/loading twiddle factors *) (* load all twiddle factors *) let twiddle_policy_load_all = let twiddle_expression n i _ = load_var (access_twiddle (i - 1)) and num_twiddle n = (n - 1) and twiddle_order n = forall_flat 1 n (fun i -> [i]) in twiddle_expression, num_twiddle, twiddle_order (* * if n is even, compute w^n = (w^{n/2})^2, else * load it *) let twiddle_policy_load_odd = let twiddle_expression n i twiddles = if ((i mod 2) == 0) then square (twiddles (i / 2)) else load_var (access_twiddle ((i - 1) / 2)) and num_twiddle n = (n / 2) and twiddle_order n = forall_flat 1 n (fun i -> if ((i mod 2) == 1) then [i] else []) in twiddle_expression, num_twiddle, twiddle_order (* compute w^n = w w^{n-1} *) let twiddle_policy_iter = let twiddle_expression n i twiddles = if (i == 1) then load_var (access_twiddle (i - 1)) else times (twiddles (i - 1)) (twiddles 1) and num_twiddle n = 1 and twiddle_order n = [1] in twiddle_expression, num_twiddle, twiddle_order (* * if n is even, compute w^n = (w^{n/2})^2, else * w^n = w w^{n-1} *) let twiddle_policy_square1 = let twiddle_expression n i twiddles = if (i == 1) then load_var (access_twiddle (i - 1)) else if ((i mod 2) == 0) then square (twiddles (i / 2)) else times (twiddles (i - 1)) (twiddles 1) and num_twiddle n = 1 and twiddle_order n = [1] in twiddle_expression, num_twiddle, twiddle_order (* * if n is even, compute w^n = (w^{n/2})^2, else * compute w^n from w^{n-1}, w^{n-2}, and w *) let twiddle_policy_square2 = let twiddle_expression n i twiddles = if (i == 1) then load_var (access_twiddle (i - 1)) else if ((i mod 2) == 0) then square (twiddles (i / 2)) else wthree (twiddles (i - 1)) (twiddles (i - 2)) (twiddles 1) and num_twiddle n = 1 and twiddle_order n = [1] in twiddle_expression, num_twiddle, twiddle_order (* * if n is even, compute w^n = (w^{n/2})^2, else * w^n = w^{floor(n/2)} w^{ceil(n/2)} *) let twiddle_policy_square3 = let twiddle_expression n i twiddles = if (i == 1) then load_var (access_twiddle (i - 1)) else if ((i mod 2) == 0) then square (twiddles (i / 2)) else times (twiddles (i / 2)) (twiddles (i - i / 2)) and num_twiddle n = 1 and twiddle_order n = [1] in twiddle_expression, num_twiddle, twiddle_order let twiddle_policy () = match !Magic.twiddle_policy with Magic.TWIDDLE_LOAD_ALL -> twiddle_policy_load_all | Magic.TWIDDLE_ITER -> twiddle_policy_iter | Magic.TWIDDLE_LOAD_ODD -> twiddle_policy_load_odd | Magic.TWIDDLE_SQUARE1 -> twiddle_policy_square1 | Magic.TWIDDLE_SQUARE2 -> twiddle_policy_square2 | Magic.TWIDDLE_SQUARE3 -> twiddle_policy_square3