1
0
mirror of https://github.com/TomHarte/CLK.git synced 2024-11-23 03:32:32 +00:00
CLK/Components/OPx/Implementation/Tables.hpp

223 lines
7.8 KiB
C++
Raw Normal View History

//
// Tables.hpp
// Clock Signal
//
// Created by Thomas Harte on 15/04/2020.
// Copyright © 2020 Thomas Harte. All rights reserved.
//
#pragma once
2023-05-10 21:02:18 +00:00
namespace Yamaha::OPL {
/*
These are the OPL's built-in log-sin and exponentiation tables, as recovered by
Matthew Gambrell and Olli Niemitalo in 'OPLx decapsulated'. Despite the formulas
being well known, I've elected not to generate these at runtime because even if I
did, I'd just end up with the proper values laid out in full in a unit test, and
they're very compact.
*/
2020-04-20 02:42:25 +00:00
/*!
Represents both the logarithm of a value and its sign.
2020-04-20 02:42:25 +00:00
It's actually the negative logarithm, in base two, in fixed point.
*/
struct LogSign {
int log;
int sign;
void reset() {
log = 0;
sign = 1;
}
LogSign &operator +=(int attenuation) {
log += attenuation;
return *this;
}
LogSign &operator +=(LogSign log_sign) {
log += log_sign.log;
sign *= log_sign.sign;
return *this;
}
int level(int fractional = 0) const;
};
2020-04-20 02:42:25 +00:00
/*!
@returns Negative log sin of x, assuming a 1024-unit circle.
*/
constexpr LogSign negative_log_sin(int x) {
2023-05-16 20:40:09 +00:00
/// Defines the first quadrant of 1024-unit negative log to the base two of sine (that conveniently misses sin(0)).
///
/// Expected branchless usage for a full 1024 unit output:
///
/// constexpr int multiplier[] = { 1, -1 };
/// constexpr int mask[] = { 0, 255 };
///
/// value = exp( log_sin[angle & 255] ^ mask[(angle >> 8) & 1]) * multitplier[(angle >> 9) & 1]
///
/// ... where exp(x) = 2 ^ -x / 256
constexpr int16_t log_sin[] = {
2137, 1731, 1543, 1419, 1326, 1252, 1190, 1137,
1091, 1050, 1013, 979, 949, 920, 894, 869,
846, 825, 804, 785, 767, 749, 732, 717,
701, 687, 672, 659, 646, 633, 621, 609,
598, 587, 576, 566, 556, 546, 536, 527,
518, 509, 501, 492, 484, 476, 468, 461,
453, 446, 439, 432, 425, 418, 411, 405,
399, 392, 386, 380, 375, 369, 363, 358,
352, 347, 341, 336, 331, 326, 321, 316,
311, 307, 302, 297, 293, 289, 284, 280,
276, 271, 267, 263, 259, 255, 251, 248,
244, 240, 236, 233, 229, 226, 222, 219,
215, 212, 209, 205, 202, 199, 196, 193,
190, 187, 184, 181, 178, 175, 172, 169,
167, 164, 161, 159, 156, 153, 151, 148,
146, 143, 141, 138, 136, 134, 131, 129,
127, 125, 122, 120, 118, 116, 114, 112,
110, 108, 106, 104, 102, 100, 98, 96,
94, 92, 91, 89, 87, 85, 83, 82,
80, 78, 77, 75, 74, 72, 70, 69,
67, 66, 64, 63, 62, 60, 59, 57,
56, 55, 53, 52, 51, 49, 48, 47,
46, 45, 43, 42, 41, 40, 39, 38,
37, 36, 35, 34, 33, 32, 31, 30,
29, 28, 27, 26, 25, 24, 23, 23,
22, 21, 20, 20, 19, 18, 17, 17,
16, 15, 15, 14, 13, 13, 12, 12,
11, 10, 10, 9, 9, 8, 8, 7,
7, 7, 6, 6, 5, 5, 5, 4,
4, 4, 3, 3, 3, 2, 2, 2,
2, 1, 1, 1, 1, 1, 1, 1,
0, 0, 0, 0, 0, 0, 0, 0
};
constexpr int16_t sign[] = { 1, -1 };
constexpr int16_t mask[] = { 0, 255 };
return {
.log = log_sin[(x & 255) ^ mask[(x >> 8) & 1]],
.sign = sign[(x >> 9) & 1]
};
}
/*!
Computes the linear value represented by the log-sign @c ls, shifted left by @c fractional prior
to loss of precision.
*/
constexpr int power_two(LogSign ls, int fractional = 0) {
/// A derivative of the exponent table in a real OPL2; mapped_exp[x] = (source[c ^ 0xff] << 1) | 0x800.
///
/// The ahead-of-time transformation represents fixed work the OPL2 does when reading its table
/// independent on the input.
///
/// The original table is a 0.10 fixed-point representation of 2^x - 1 with bit 10 implicitly set, where x is
/// in 0.8 fixed point.
///
/// Since the log_sin table represents sine in a negative base-2 logarithm, values from it would need
/// to be negatived before being put into the original table. That's haned with the ^ 0xff. The | 0x800 is to
/// set the implicit bit 10 (subject to the shift).
///
/// The shift by 1 is to allow the chip's exploitation of the recursive symmetry of the exponential table to
/// be achieved more easily. Specifically, to convert a logarithmic attenuation to a linear one, just perform:
///
/// result = mapped_exp[x & 0xff] >> (x >> 8)
constexpr int16_t mapped_exp[] = {
4084, 4074, 4062, 4052, 4040, 4030, 4020, 4008,
3998, 3986, 3976, 3966, 3954, 3944, 3932, 3922,
3912, 3902, 3890, 3880, 3870, 3860, 3848, 3838,
3828, 3818, 3808, 3796, 3786, 3776, 3766, 3756,
3746, 3736, 3726, 3716, 3706, 3696, 3686, 3676,
3666, 3656, 3646, 3636, 3626, 3616, 3606, 3596,
3588, 3578, 3568, 3558, 3548, 3538, 3530, 3520,
3510, 3500, 3492, 3482, 3472, 3464, 3454, 3444,
3434, 3426, 3416, 3408, 3398, 3388, 3380, 3370,
3362, 3352, 3344, 3334, 3326, 3316, 3308, 3298,
3290, 3280, 3272, 3262, 3254, 3246, 3236, 3228,
3218, 3210, 3202, 3192, 3184, 3176, 3168, 3158,
3150, 3142, 3132, 3124, 3116, 3108, 3100, 3090,
3082, 3074, 3066, 3058, 3050, 3040, 3032, 3024,
3016, 3008, 3000, 2992, 2984, 2976, 2968, 2960,
2952, 2944, 2936, 2928, 2920, 2912, 2904, 2896,
2888, 2880, 2872, 2866, 2858, 2850, 2842, 2834,
2826, 2818, 2812, 2804, 2796, 2788, 2782, 2774,
2766, 2758, 2752, 2744, 2736, 2728, 2722, 2714,
2706, 2700, 2692, 2684, 2678, 2670, 2664, 2656,
2648, 2642, 2634, 2628, 2620, 2614, 2606, 2600,
2592, 2584, 2578, 2572, 2564, 2558, 2550, 2544,
2536, 2530, 2522, 2516, 2510, 2502, 2496, 2488,
2482, 2476, 2468, 2462, 2456, 2448, 2442, 2436,
2428, 2422, 2416, 2410, 2402, 2396, 2390, 2384,
2376, 2370, 2364, 2358, 2352, 2344, 2338, 2332,
2326, 2320, 2314, 2308, 2300, 2294, 2288, 2282,
2276, 2270, 2264, 2258, 2252, 2246, 2240, 2234,
2228, 2222, 2216, 2210, 2204, 2198, 2192, 2186,
2180, 2174, 2168, 2162, 2156, 2150, 2144, 2138,
2132, 2128, 2122, 2116, 2110, 2104, 2098, 2092,
2088, 2082, 2076, 2070, 2064, 2060, 2054, 2048,
};
return ((mapped_exp[ls.log & 0xff] << fractional) >> (ls.log >> 8)) * ls.sign;
}
/*
Credit for the fixed register lists goes to Nuke.YKT; I found them at:
https://siliconpr0n.org/archive/doku.php?id=vendor:yamaha:opl2#ym2413_instrument_rom
The arrays below begin with channel 1, then each line is a single channel defined
in exactly the same terms as the OPL's user-defined channel.
*/
constexpr uint8_t opll_patch_set[] = {
0x71, 0x61, 0x1e, 0x17, 0xd0, 0x78, 0x00, 0x17,
0x13, 0x41, 0x1a, 0x0d, 0xd8, 0xf7, 0x23, 0x13,
0x13, 0x01, 0x99, 0x00, 0xf2, 0xc4, 0x11, 0x23,
0x31, 0x61, 0x0e, 0x07, 0xa8, 0x64, 0x70, 0x27,
0x32, 0x21, 0x1e, 0x06, 0xe0, 0x76, 0x00, 0x28,
0x31, 0x22, 0x16, 0x05, 0xe0, 0x71, 0x00, 0x18,
0x21, 0x61, 0x1d, 0x07, 0x82, 0x81, 0x10, 0x07,
0x23, 0x21, 0x2d, 0x14, 0xa2, 0x72, 0x00, 0x07,
0x61, 0x61, 0x1b, 0x06, 0x64, 0x65, 0x10, 0x17,
0x41, 0x61, 0x0b, 0x18, 0x85, 0xf7, 0x71, 0x07,
0x13, 0x01, 0x83, 0x11, 0xfa, 0xe4, 0x10, 0x04,
0x17, 0xc1, 0x24, 0x07, 0xf8, 0xf8, 0x22, 0x12,
0x61, 0x50, 0x0c, 0x05, 0xc2, 0xf5, 0x20, 0x42,
0x01, 0x01, 0x55, 0x03, 0xc9, 0x95, 0x03, 0x02,
0x61, 0x41, 0x89, 0x03, 0xf1, 0xe4, 0x40, 0x13,
};
constexpr uint8_t vrc7_patch_set[] = {
0x03, 0x21, 0x05, 0x06, 0xe8, 0x81, 0x42, 0x27,
0x13, 0x41, 0x14, 0x0d, 0xd8, 0xf6, 0x23, 0x12,
0x11, 0x11, 0x08, 0x08, 0xfa, 0xb2, 0x20, 0x12,
0x31, 0x61, 0x0c, 0x07, 0xa8, 0x64, 0x61, 0x27,
0x32, 0x21, 0x1e, 0x06, 0xe1, 0x76, 0x01, 0x28,
0x02, 0x01, 0x06, 0x00, 0xa3, 0xe2, 0xf4, 0xf4,
0x21, 0x61, 0x1d, 0x07, 0x82, 0x81, 0x11, 0x07,
0x23, 0x21, 0x22, 0x17, 0xa2, 0x72, 0x01, 0x17,
0x35, 0x11, 0x25, 0x00, 0x40, 0x73, 0x72, 0x01,
0xb5, 0x01, 0x0f, 0x0f, 0xa8, 0xa5, 0x51, 0x02,
0x17, 0xc1, 0x24, 0x07, 0xf8, 0xf8, 0x22, 0x12,
0x71, 0x23, 0x11, 0x06, 0x65, 0x74, 0x18, 0x16,
0x01, 0x02, 0xd3, 0x05, 0xc9, 0x95, 0x03, 0x02,
0x61, 0x63, 0x0c, 0x00, 0x94, 0xc0, 0x33, 0xf6,
0x21, 0x72, 0x0d, 0x00, 0xc1, 0xd5, 0x56, 0x06,
};
constexpr uint8_t percussion_patch_set[] = {
0x01, 0x01, 0x18, 0x0f, 0xdf, 0xf8, 0x6a, 0x6d,
0x01, 0x01, 0x00, 0x00, 0xc8, 0xd8, 0xa7, 0x48,
0x05, 0x01, 0x00, 0x00, 0xf8, 0xaa, 0x59, 0x55,
};
inline int LogSign::level(int fractional) const {
return power_two(*this, fractional);
}
}