mirror of
https://github.com/Xaymar/obs-StreamFX
synced 2024-10-24 05:42:39 +00:00
cc9d3486b2
With this, GCC 8 and above should now be able to compile the project both in obs-studio and as a standalone install. Some features are currently still not fully supported and require extra work, but the majority of things are supported and work out of the box. Exact feature parity can be looked up here on the wiki: https://github.com/Xaymar/obs-StreamFX/wiki/Platform-Feature-Parity Related: #119 #98 #30
280 lines
8.4 KiB
C++
280 lines
8.4 KiB
C++
/*
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* Modern effects for a modern Streamer
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* Copyright (C) 2018 Michael Fabian Dirks
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*
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* This program is free software; you can redistribute it and/or modify
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* it under the terms of the GNU General Public License as published by
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* the Free Software Foundation; either version 2 of the License, or
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* (at your option) any later version.
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*
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* This program is distributed in the hope that it will be useful,
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* but WITHOUT ANY WARRANTY; without even the implied warranty of
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* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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* GNU General Public License for more details.
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*
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* You should have received a copy of the GNU General Public License
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* along with this program; if not, write to the Free Software
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* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301, USA
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*/
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#pragma once
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#include <cinttypes>
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#include <cstddef>
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#include <string>
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#include <type_traits>
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extern "C" {
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#ifdef _MSC_VER
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#pragma warning(push)
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#pragma warning(disable : 4201)
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#endif
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#include <obs.h>
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#include <graphics/vec2.h>
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#include <graphics/vec3.h>
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#include <graphics/vec4.h>
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#ifdef _MSC_VER
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#pragma warning(pop)
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#endif
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}
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// Constants
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#define S_PI 3.1415926535897932384626433832795 // PI = pi
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#define S_PI2 6.283185307179586476925286766559 // 2PI = 2 * pi
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#define S_PI2_SQROOT 2.506628274631000502415765284811 // sqrt(2 * pi)
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#define S_RAD 57.295779513082320876798154814105 // 180/pi
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#define S_DEG 0.01745329251994329576923690768489 // pi/180
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#define D_DEG_TO_RAD(x) (x * S_DEG)
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#define D_RAD_TO_DEG(x) (x * S_RAD)
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const char* obs_module_recursive_text(const char* to_translate, size_t depth = std::numeric_limits<size_t>::max());
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template<typename Enum>
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struct enable_bitmask_operators {
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static const bool enable = false;
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};
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template<typename Enum>
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typename std::enable_if<enable_bitmask_operators<Enum>::enable, Enum>::type operator|(Enum lhs, Enum rhs)
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{
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using underlying = typename std::underlying_type<Enum>::type;
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return static_cast<Enum>(static_cast<underlying>(lhs) | static_cast<underlying>(rhs));
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}
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template<typename Enum>
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typename std::enable_if<enable_bitmask_operators<Enum>::enable, Enum>::type operator&(Enum lhs, Enum rhs)
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{
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using underlying = typename std::underlying_type<Enum>::type;
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return static_cast<Enum>(static_cast<underlying>(lhs) & static_cast<underlying>(rhs));
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}
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template<typename Enum>
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typename std::enable_if<enable_bitmask_operators<Enum>::enable, bool>::type any(Enum lhs)
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{
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using underlying = typename std::underlying_type<Enum>::type;
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return static_cast<underlying>(lhs) != static_cast<underlying>(0);
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}
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template<typename Enum>
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typename std::enable_if<enable_bitmask_operators<Enum>::enable, bool>::type exact(Enum lhs, Enum rhs)
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{
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using underlying = typename std::underlying_type<Enum>::type;
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return static_cast<underlying>(lhs) == static_cast<underlying>(rhs);
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}
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#define P_ENABLE_BITMASK_OPERATORS(x) \
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template<> \
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struct enable_bitmask_operators<x> { \
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static const bool enable = true; \
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};
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#define D_STR(s) #s
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#define D_VSTR(s) D_STR(s)
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namespace util {
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bool inline are_property_groups_broken()
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{
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return obs_get_version() < MAKE_SEMANTIC_VERSION(24, 0, 0);
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}
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obs_property_t* obs_properties_add_tristate(obs_properties_t* props, const char* name, const char* desc);
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inline bool is_tristate_enabled(int64_t tristate)
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{
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return tristate == 1;
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}
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inline bool is_tristate_disabled(int64_t tristate)
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{
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return tristate == 0;
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}
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inline bool is_tristate_default(int64_t tristate)
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{
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return tristate == -1;
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}
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struct vec2a : public vec2 {
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// 16-byte Aligned version of vec2
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static void* operator new(size_t count);
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static void* operator new[](size_t count);
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static void operator delete(void* p);
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static void operator delete[](void* p);
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};
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#ifdef _MSC_VER
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__declspec(align(16))
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#endif
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struct vec3a : public vec3 {
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// 16-byte Aligned version of vec3
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static void* operator new(size_t count);
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static void* operator new[](size_t count);
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static void operator delete(void* p);
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static void operator delete[](void* p);
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};
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#ifdef _MSC_VER
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__declspec(align(16))
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#endif
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struct vec4a : public vec4 {
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// 16-byte Aligned version of vec4
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static void* operator new(size_t count);
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static void* operator new[](size_t count);
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static void operator delete(void* p);
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static void operator delete[](void* p);
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};
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std::pair<int64_t, int64_t> size_from_string(std::string text, bool allowSquare = true);
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namespace math {
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// Proven by tests to be the fastest implementation on Intel and AMD CPUs.
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// Ranking: log10, loop < bitscan < pow
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// loop and log10 trade blows, usually almost identical.
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// loop is used for integers, log10 for anything else.
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template<typename T>
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inline bool is_power_of_two(T v)
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{
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return T(1ull << uint64_t(floor(log10(T(v)) / log10(2.0)))) == v;
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};
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template<typename T>
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inline bool is_power_of_two_loop(T v)
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{
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bool have_bit = false;
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for (size_t index = 0; index < (sizeof(T) * 8); index++) {
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bool cur = (v & (static_cast<T>(1ull) << index)) != 0;
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if (cur) {
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if (have_bit)
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return false;
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have_bit = true;
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}
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}
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return true;
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}
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#pragma push_macro("P_IS_POWER_OF_TWO_AS_LOOP")
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#define P_IS_POWER_OF_TWO_AS_LOOP(x) \
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template<> \
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inline bool is_power_of_two(x v) \
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{ \
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return is_power_of_two_loop(v); \
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}
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P_IS_POWER_OF_TWO_AS_LOOP(int8_t)
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P_IS_POWER_OF_TWO_AS_LOOP(uint8_t)
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P_IS_POWER_OF_TWO_AS_LOOP(int16_t)
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P_IS_POWER_OF_TWO_AS_LOOP(uint16_t)
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P_IS_POWER_OF_TWO_AS_LOOP(int32_t)
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P_IS_POWER_OF_TWO_AS_LOOP(uint32_t)
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P_IS_POWER_OF_TWO_AS_LOOP(int64_t)
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P_IS_POWER_OF_TWO_AS_LOOP(uint64_t)
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#undef P_IS_POWER_OF_TWO_AS_LOOP
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#pragma pop_macro("P_IS_POWER_OF_TWO_AS_LOOP")
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template<typename T>
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inline uint64_t get_power_of_two_exponent_floor(T v)
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{
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return uint64_t(floor(log10(T(v)) / log10(2.0)));
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}
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template<typename T>
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inline uint64_t get_power_of_two_exponent_ceil(T v)
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{
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return uint64_t(ceil(log10(T(v)) / log10(2.0)));
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}
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template<typename T, typename C>
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inline bool is_equal(T target, C value)
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{
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return (target > (value - std::numeric_limits<T>::epsilon()))
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&& (target < (value + std::numeric_limits<T>::epsilon()));
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}
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template<typename T>
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inline T gaussian(T x, T o /*, T u = 0*/)
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{
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// u/µ can be simulated by subtracting that value from x.
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static const double_t pi = 3.1415926535897932384626433832795;
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static const double_t two_pi = pi * 2.;
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static const double_t two_pi_sqroot = 2.506628274631000502415765284811; //sqrt(two_pi);
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if (is_equal<double_t>(0, o)) {
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return T(std::numeric_limits<double_t>::infinity());
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}
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// g(x) = (1 / o√(2Π)) * e(-(1/2) * ((x-u)/o)²)
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double_t left_e = 1. / (o * two_pi_sqroot);
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double_t mid_right_e = ((x /* - u*/) / o);
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double_t right_e = -0.5 * mid_right_e * mid_right_e;
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double_t final = left_e * exp(right_e);
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return T(final);
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}
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template<typename T>
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inline T lerp(T a, T b, double_t v)
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{
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return static_cast<T>((static_cast<double_t>(a) * (1.0 - v)) + (static_cast<double_t>(b) * v));
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}
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template<typename T>
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class kalman1D {
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T _q_process_noise_covariance;
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T _r_measurement_noise_covariance;
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T _x_value_of_interest;
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T _p_estimation_error_covariance;
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T _k_kalman_gain;
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public:
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kalman1D()
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: _q_process_noise_covariance(0), _r_measurement_noise_covariance(0), _x_value_of_interest(0),
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_p_estimation_error_covariance(0), _k_kalman_gain(0.0)
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{}
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kalman1D(T pnc, T mnc, T eec, T value)
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: _q_process_noise_covariance(pnc), _r_measurement_noise_covariance(mnc), _x_value_of_interest(value),
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_p_estimation_error_covariance(eec), _k_kalman_gain(0.0)
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{}
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~kalman1D() {}
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T filter(T measurement)
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{
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_p_estimation_error_covariance += _q_process_noise_covariance;
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_k_kalman_gain =
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_p_estimation_error_covariance / (_p_estimation_error_covariance + _r_measurement_noise_covariance);
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_x_value_of_interest += _k_kalman_gain * (measurement - _x_value_of_interest);
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_p_estimation_error_covariance = (1 - _k_kalman_gain) * _p_estimation_error_covariance;
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return _x_value_of_interest;
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}
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T get()
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{
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return _x_value_of_interest;
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}
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};
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} // namespace math
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inline size_t aligned_offset(size_t align, size_t pos)
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{
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return ((pos / align) + 1) * align;
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}
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void* malloc_aligned(size_t align, size_t size);
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void free_aligned(void* mem);
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} // namespace util
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