690 lines
24 KiB
Plaintext
690 lines
24 KiB
Plaintext
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//Disable a bunch of warnings for now
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#ifndef _MSC_VER
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#pragma GCC diagnostic push
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#pragma GCC diagnostic ignored "-Wshadow"
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#pragma GCC diagnostic ignored "-Wunused-but-set-variable"
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#pragma GCC diagnostic ignored "-Wunused-parameter"
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#endif
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//------------------------------------------------------------------------------
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// VERSION 0.1
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//
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// LICENSE
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// This software is dual-licensed to the public domain and under the following
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// license: you are granted a perpetual, irrevocable license to copy, modify,
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// publish, and distribute this file as you see fit.
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//
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// CREDITS
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// Written by Michal Cichon
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//------------------------------------------------------------------------------
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# ifndef __IMGUI_BEZIER_MATH_INL__
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# define __IMGUI_BEZIER_MATH_INL__
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# pragma once
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//------------------------------------------------------------------------------
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# include "imgui_bezier_math.h"
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# include <map> // used in ImCubicBezierFixedStep
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//------------------------------------------------------------------------------
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template <typename T>
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inline T ImLinearBezier(const T& p0, const T& p1, float t)
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{
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return p0 + t * (p1 - p0);
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}
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template <typename T>
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inline T ImLinearBezierDt(const T& p0, const T& p1, float t)
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{
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IM_UNUSED(t);
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return p1 - p0;
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}
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template <typename T>
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inline T ImQuadraticBezier(const T& p0, const T& p1, const T& p2, float t)
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{
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const auto a = 1 - t;
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return a * a * p0 + 2 * t * a * p1 + t * t * p2;
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}
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template <typename T>
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inline T ImQuadraticBezierDt(const T& p0, const T& p1, const T& p2, float t)
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{
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return 2 * (1 - t) * (p1 - p0) + 2 * t * (p2 - p1);
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}
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template <typename T>
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inline T ImCubicBezier(const T& p0, const T& p1, const T& p2, const T& p3, float t)
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{
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const auto a = 1 - t;
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const auto b = a * a * a;
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const auto c = t * t * t;
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return b * p0 + 3 * t * a * a * p1 + 3 * t * t * a * p2 + c * p3;
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}
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template <typename T>
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inline T ImCubicBezierDt(const T& p0, const T& p1, const T& p2, const T& p3, float t)
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{
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const auto a = 1 - t;
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const auto b = a * a;
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const auto c = t * t;
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const auto d = 2 * t * a;
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return -3 * p0 * b + 3 * p1 * (b - d) + 3 * p2 * (d - c) + 3 * p3 * c;
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}
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template <typename T>
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inline T ImCubicBezierSample(const T& p0, const T& p1, const T& p2, const T& p3, float t)
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{
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const auto cp0_zero = ImLengthSqr(p1 - p0) < 1e-5f;
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const auto cp1_zero = ImLengthSqr(p3 - p2) < 1e-5f;
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if (cp0_zero && cp1_zero)
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return ImLinearBezier(p0, p3, t);
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else if (cp0_zero)
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return ImQuadraticBezier(p0, p2, p3, t);
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else if (cp1_zero)
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return ImQuadraticBezier(p0, p1, p3, t);
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else
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return ImCubicBezier(p0, p1, p2, p3, t);
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}
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template <typename T>
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inline T ImCubicBezierSample(const ImCubicBezierPointsT<T>& curve, float t)
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{
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return ImCubicBezierSample(curve.P0, curve.P1, curve.P2, curve.P3, t);
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}
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template <typename T>
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inline T ImCubicBezierTangent(const T& p0, const T& p1, const T& p2, const T& p3, float t)
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{
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const auto cp0_zero = ImLengthSqr(p1 - p0) < 1e-5f;
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const auto cp1_zero = ImLengthSqr(p3 - p2) < 1e-5f;
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if (cp0_zero && cp1_zero)
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return ImLinearBezierDt(p0, p3, t);
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else if (cp0_zero)
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return ImQuadraticBezierDt(p0, p2, p3, t);
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else if (cp1_zero)
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return ImQuadraticBezierDt(p0, p1, p3, t);
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else
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return ImCubicBezierDt(p0, p1, p2, p3, t);
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}
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template <typename T>
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inline T ImCubicBezierTangent(const ImCubicBezierPointsT<T>& curve, float t)
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{
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return ImCubicBezierTangent(curve.P0, curve.P1, curve.P2, curve.P3, t);
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}
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template <typename T>
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inline float ImCubicBezierLength(const T& p0, const T& p1, const T& p2, const T& p3)
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{
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// Legendre-Gauss abscissae with n=24 (x_i values, defined at i=n as the roots of the nth order Legendre polynomial Pn(x))
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static const float t_values[] =
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{
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-0.0640568928626056260850430826247450385909f,
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0.0640568928626056260850430826247450385909f,
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-0.1911188674736163091586398207570696318404f,
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0.1911188674736163091586398207570696318404f,
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-0.3150426796961633743867932913198102407864f,
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0.3150426796961633743867932913198102407864f,
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-0.4337935076260451384870842319133497124524f,
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0.4337935076260451384870842319133497124524f,
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-0.5454214713888395356583756172183723700107f,
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0.5454214713888395356583756172183723700107f,
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-0.6480936519369755692524957869107476266696f,
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0.6480936519369755692524957869107476266696f,
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-0.7401241915785543642438281030999784255232f,
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0.7401241915785543642438281030999784255232f,
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-0.8200019859739029219539498726697452080761f,
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0.8200019859739029219539498726697452080761f,
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-0.8864155270044010342131543419821967550873f,
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0.8864155270044010342131543419821967550873f,
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-0.9382745520027327585236490017087214496548f,
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0.9382745520027327585236490017087214496548f,
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-0.9747285559713094981983919930081690617411f,
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0.9747285559713094981983919930081690617411f,
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-0.9951872199970213601799974097007368118745f,
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0.9951872199970213601799974097007368118745f
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};
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// Legendre-Gauss weights with n=24 (w_i values, defined by a function linked to in the Bezier primer article)
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static const float c_values[] =
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{
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0.1279381953467521569740561652246953718517f,
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0.1279381953467521569740561652246953718517f,
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0.1258374563468282961213753825111836887264f,
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0.1258374563468282961213753825111836887264f,
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0.1216704729278033912044631534762624256070f,
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0.1216704729278033912044631534762624256070f,
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0.1155056680537256013533444839067835598622f,
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0.1155056680537256013533444839067835598622f,
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0.1074442701159656347825773424466062227946f,
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0.1074442701159656347825773424466062227946f,
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0.0976186521041138882698806644642471544279f,
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0.0976186521041138882698806644642471544279f,
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0.0861901615319532759171852029837426671850f,
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0.0861901615319532759171852029837426671850f,
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0.0733464814110803057340336152531165181193f,
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0.0733464814110803057340336152531165181193f,
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0.0592985849154367807463677585001085845412f,
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0.0592985849154367807463677585001085845412f,
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0.0442774388174198061686027482113382288593f,
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0.0442774388174198061686027482113382288593f,
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0.0285313886289336631813078159518782864491f,
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0.0285313886289336631813078159518782864491f,
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0.0123412297999871995468056670700372915759f,
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0.0123412297999871995468056670700372915759f
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};
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static_assert(sizeof(t_values) / sizeof(*t_values) == sizeof(c_values) / sizeof(*c_values), "");
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auto arc = [p0, p1, p2, p3](float t)
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{
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const auto p = ImCubicBezierDt(p0, p1, p2, p3, t);
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const auto l = ImLength(p);
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return l;
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};
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const auto z = 0.5f;
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const auto n = sizeof(t_values) / sizeof(*t_values);
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auto accumulator = 0.0f;
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for (size_t i = 0; i < n; ++i)
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{
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const auto t = z * t_values[i] + z;
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accumulator += c_values[i] * arc(t);
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}
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return z * accumulator;
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}
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template <typename T>
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inline float ImCubicBezierLength(const ImCubicBezierPointsT<T>& curve)
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{
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return ImCubicBezierLength(curve.P0, curve.P1, curve.P2, curve.P3);
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}
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template <typename T>
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inline ImCubicBezierSplitResultT<T> ImCubicBezierSplit(const T& p0, const T& p1, const T& p2, const T& p3, float t)
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{
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const auto z1 = t;
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const auto z2 = z1 * z1;
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const auto z3 = z1 * z1 * z1;
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const auto s1 = z1 - 1;
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const auto s2 = s1 * s1;
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const auto s3 = s1 * s1 * s1;
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return ImCubicBezierSplitResultT<T>
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{
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ImCubicBezierPointsT<T>
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{
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p0,
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z1 * p1 - s1 * p0,
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z2 * p2 - 2 * z1 * s1 * p1 + s2 * p0,
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z3 * p3 - 3 * z2 * s1 * p2 + 3 * z1 * s2 * p1 - s3 * p0
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},
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ImCubicBezierPointsT<T>
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{
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z3 * p0 - 3 * z2 * s1 * p1 + 3 * z1 * s2 * p2 - s3 * p3,
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z2 * p1 - 2 * z1 * s1 * p2 + s2 * p3,
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z1 * p2 - s1 * p3,
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p3,
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}
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};
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}
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template <typename T>
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inline ImCubicBezierSplitResultT<T> ImCubicBezierSplit(const ImCubicBezierPointsT<T>& curve, float t)
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{
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return ImCubicBezierSplit(curve.P0, curve.P1, curve.P2, curve.P3, t);
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}
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inline ImRect ImCubicBezierBoundingRect(const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3)
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{
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auto a = 3 * p3 - 9 * p2 + 9 * p1 - 3 * p0;
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auto b = 6 * p0 - 12 * p1 + 6 * p2;
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auto c = 3 * p1 - 3 * p0;
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auto delta_squared = ImMul(b, b) - 4 * ImMul(a, c);
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auto tl = ImMin(p0, p3);
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auto rb = ImMax(p0, p3);
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# define IM_VEC2_INDEX(v, i) *(&v.x + i)
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for (int i = 0; i < 2; ++i)
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{
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if (IM_VEC2_INDEX(a, i) == 0.0f)
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continue;
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if (IM_VEC2_INDEX(delta_squared, i) >= 0)
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{
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auto delta = ImSqrt(IM_VEC2_INDEX(delta_squared, i));
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auto t0 = (-IM_VEC2_INDEX(b, i) + delta) / (2 * IM_VEC2_INDEX(a, i));
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if (t0 > 0 && t0 < 1)
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{
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auto p = ImCubicBezier(IM_VEC2_INDEX(p0, i), IM_VEC2_INDEX(p1, i), IM_VEC2_INDEX(p2, i), IM_VEC2_INDEX(p3, i), t0);
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IM_VEC2_INDEX(tl, i) = ImMin(IM_VEC2_INDEX(tl, i), p);
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IM_VEC2_INDEX(rb, i) = ImMax(IM_VEC2_INDEX(rb, i), p);
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}
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auto t1 = (-IM_VEC2_INDEX(b, i) - delta) / (2 * IM_VEC2_INDEX(a, i));
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if (t1 > 0 && t1 < 1)
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{
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auto p = ImCubicBezier(IM_VEC2_INDEX(p0, i), IM_VEC2_INDEX(p1, i), IM_VEC2_INDEX(p2, i), IM_VEC2_INDEX(p3, i), t1);
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IM_VEC2_INDEX(tl, i) = ImMin(IM_VEC2_INDEX(tl, i), p);
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IM_VEC2_INDEX(rb, i) = ImMax(IM_VEC2_INDEX(rb, i), p);
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}
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}
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}
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# undef IM_VEC2_INDEX
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return ImRect(tl, rb);
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}
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inline ImRect ImCubicBezierBoundingRect(const ImCubicBezierPoints& curve)
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{
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return ImCubicBezierBoundingRect(curve.P0, curve.P1, curve.P2, curve.P3);
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}
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inline ImProjectResult ImProjectOnCubicBezier(const ImVec2& point, const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3, const int subdivisions)
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{
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// http://pomax.github.io/bezierinfo/#projections
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const float epsilon = 1e-5f;
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const float fixed_step = 1.0f / static_cast<float>(subdivisions - 1);
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ImProjectResult result;
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result.Point = point;
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result.Time = 0.0f;
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result.Distance = FLT_MAX;
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// Step 1: Coarse check
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for (int i = 0; i < subdivisions; ++i)
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{
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auto t = i * fixed_step;
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auto p = ImCubicBezier(p0, p1, p2, p3, t);
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auto s = point - p;
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auto d = ImDot(s, s);
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if (d < result.Distance)
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{
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result.Point = p;
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result.Time = t;
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result.Distance = d;
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}
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}
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if (result.Time == 0.0f || ImFabs(result.Time - 1.0f) <= epsilon)
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{
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result.Distance = ImSqrt(result.Distance);
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return result;
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}
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// Step 2: Fine check
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auto left = result.Time - fixed_step;
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auto right = result.Time + fixed_step;
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auto step = fixed_step * 0.1f;
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for (auto t = left; t < right + step; t += step)
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{
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auto p = ImCubicBezier(p0, p1, p2, p3, t);
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auto s = point - p;
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auto d = ImDot(s, s);
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if (d < result.Distance)
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{
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result.Point = p;
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result.Time = t;
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result.Distance = d;
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}
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}
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result.Distance = ImSqrt(result.Distance);
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return result;
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}
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inline ImProjectResult ImProjectOnCubicBezier(const ImVec2& p, const ImCubicBezierPoints& curve, const int subdivisions)
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{
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return ImProjectOnCubicBezier(p, curve.P0, curve.P1, curve.P2, curve.P3, subdivisions);
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}
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inline ImCubicBezierIntersectResult ImCubicBezierLineIntersect(const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3, const ImVec2& a0, const ImVec2& a1)
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{
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auto cubic_roots = [](float a, float b, float c, float d, float* roots) -> int
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{
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int count = 0;
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auto sign = [](float x) -> float { return x < 0 ? -1.0f : 1.0f; };
|
||
|
|
||
|
auto A = b / a;
|
||
|
auto B = c / a;
|
||
|
auto C = d / a;
|
||
|
|
||
|
auto Q = (3 * B - ImPow(A, 2)) / 9;
|
||
|
auto R = (9 * A * B - 27 * C - 2 * ImPow(A, 3)) / 54;
|
||
|
auto D = ImPow(Q, 3) + ImPow(R, 2); // polynomial discriminant
|
||
|
|
||
|
if (D >= 0) // complex or duplicate roots
|
||
|
{
|
||
|
auto S = sign(R + ImSqrt(D)) * ImPow(ImFabs(R + ImSqrt(D)), (1.0f / 3.0f));
|
||
|
auto T = sign(R - ImSqrt(D)) * ImPow(ImFabs(R - ImSqrt(D)), (1.0f / 3.0f));
|
||
|
|
||
|
roots[0] = -A / 3 + (S + T); // real root
|
||
|
roots[1] = -A / 3 - (S + T) / 2; // real part of complex root
|
||
|
roots[2] = -A / 3 - (S + T) / 2; // real part of complex root
|
||
|
auto Im = ImFabs(ImSqrt(3) * (S - T) / 2); // complex part of root pair
|
||
|
|
||
|
// discard complex roots
|
||
|
if (Im != 0)
|
||
|
count = 1;
|
||
|
else
|
||
|
count = 3;
|
||
|
}
|
||
|
else // distinct real roots
|
||
|
{
|
||
|
auto th = ImAcos(R / ImSqrt(-ImPow(Q, 3)));
|
||
|
|
||
|
roots[0] = 2 * ImSqrt(-Q) * ImCos(th / 3) - A / 3;
|
||
|
roots[1] = 2 * ImSqrt(-Q) * ImCos((th + 2 * IM_PI) / 3) - A / 3;
|
||
|
roots[2] = 2 * ImSqrt(-Q) * ImCos((th + 4 * IM_PI) / 3) - A / 3;
|
||
|
|
||
|
count = 3;
|
||
|
}
|
||
|
|
||
|
return count;
|
||
|
};
|
||
|
|
||
|
/*
|
||
|
https://github.com/kaishiqi/Geometric-Bezier/blob/master/GeometricBezier/src/kaishiqi/geometric/intersection/Intersection.as
|
||
|
|
||
|
Start with Bezier using Bernstein polynomials for weighting functions:
|
||
|
(1-t^3)P0 + 3t(1-t)^2P1 + 3t^2(1-t)P2 + t^3P3
|
||
|
|
||
|
Expand and collect terms to form linear combinations of original Bezier
|
||
|
controls. This ends up with a vector cubic in t:
|
||
|
(-P0+3P1-3P2+P3)t^3 + (3P0-6P1+3P2)t^2 + (-3P0+3P1)t + P0
|
||
|
/\ /\ /\ /\
|
||
|
|| || || ||
|
||
|
c3 c2 c1 c0
|
||
|
*/
|
||
|
|
||
|
// Calculate the coefficients
|
||
|
auto c3 = -p0 + 3 * p1 - 3 * p2 + p3;
|
||
|
auto c2 = 3 * p0 - 6 * p1 + 3 * p2;
|
||
|
auto c1 = -3 * p0 + 3 * p1;
|
||
|
auto c0 = p0;
|
||
|
|
||
|
// Convert line to normal form: ax + by + c = 0
|
||
|
auto a = a1.y - a0.y;
|
||
|
auto b = a0.x - a1.x;
|
||
|
auto c = a0.x * (a0.y - a1.y) + a0.y * (a1.x - a0.x);
|
||
|
|
||
|
// Rotate each cubic coefficient using line for new coordinate system?
|
||
|
// Find roots of rotated cubic
|
||
|
float roots[3];
|
||
|
auto rootCount = cubic_roots(
|
||
|
a * c3.x + b * c3.y,
|
||
|
a * c2.x + b * c2.y,
|
||
|
a * c1.x + b * c1.y,
|
||
|
a * c0.x + b * c0.y + c,
|
||
|
roots);
|
||
|
|
||
|
// Any roots in closed interval [0,1] are intersections on Bezier, but
|
||
|
// might not be on the line segment.
|
||
|
// Find intersections and calculate point coordinates
|
||
|
|
||
|
auto min = ImMin(a0, a1);
|
||
|
auto max = ImMax(a0, a1);
|
||
|
|
||
|
ImCubicBezierIntersectResult result;
|
||
|
auto points = result.Points;
|
||
|
|
||
|
for (int i = 0; i < rootCount; ++i)
|
||
|
{
|
||
|
auto root = roots[i];
|
||
|
|
||
|
if (0 <= root && root <= 1)
|
||
|
{
|
||
|
// We're within the Bezier curve
|
||
|
// Find point on Bezier
|
||
|
auto p = ImCubicBezier(p0, p1, p2, p3, root);
|
||
|
|
||
|
// See if point is on line segment
|
||
|
// Had to make special cases for vertical and horizontal lines due
|
||
|
// to slight errors in calculation of p00
|
||
|
if (a0.x == a1.x)
|
||
|
{
|
||
|
if (min.y <= p.y && p.y <= max.y)
|
||
|
*points++ = p;
|
||
|
}
|
||
|
else if (a0.y == a1.y)
|
||
|
{
|
||
|
if (min.x <= p.x && p.x <= max.x)
|
||
|
*points++ = p;
|
||
|
}
|
||
|
else if (p.x >= min.x && p.y >= min.y && p.x <= max.x && p.y <= max.y)
|
||
|
{
|
||
|
*points++ = p;
|
||
|
}
|
||
|
}
|
||
|
}
|
||
|
|
||
|
result.Count = static_cast<int>(points - result.Points);
|
||
|
|
||
|
return result;
|
||
|
}
|
||
|
|
||
|
inline ImCubicBezierIntersectResult ImCubicBezierLineIntersect(const ImCubicBezierPoints& curve, const ImLine& line)
|
||
|
{
|
||
|
return ImCubicBezierLineIntersect(curve.P0, curve.P1, curve.P2, curve.P3, line.A, line.B);
|
||
|
}
|
||
|
|
||
|
inline void ImCubicBezierSubdivide(ImCubicBezierSubdivideCallback callback, void* user_pointer, const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3, float tess_tol, ImCubicBezierSubdivideFlags flags)
|
||
|
{
|
||
|
return ImCubicBezierSubdivide(callback, user_pointer, ImCubicBezierPoints{ p0, p1, p2, p3 }, tess_tol, flags);
|
||
|
}
|
||
|
|
||
|
inline void ImCubicBezierSubdivide(ImCubicBezierSubdivideCallback callback, void* user_pointer, const ImCubicBezierPoints& curve, float tess_tol, ImCubicBezierSubdivideFlags flags)
|
||
|
{
|
||
|
struct Tesselator
|
||
|
{
|
||
|
ImCubicBezierSubdivideCallback Callback;
|
||
|
void* UserPointer;
|
||
|
float TesselationTollerance;
|
||
|
ImCubicBezierSubdivideFlags Flags;
|
||
|
|
||
|
void Commit(const ImVec2& p, const ImVec2& t)
|
||
|
{
|
||
|
ImCubicBezierSubdivideSample sample;
|
||
|
sample.Point = p;
|
||
|
sample.Tangent = t;
|
||
|
Callback(sample, UserPointer);
|
||
|
}
|
||
|
|
||
|
void Subdivide(const ImCubicBezierPoints& curve, int level = 0)
|
||
|
{
|
||
|
float dx = curve.P3.x - curve.P0.x;
|
||
|
float dy = curve.P3.y - curve.P0.y;
|
||
|
float d2 = ((curve.P1.x - curve.P3.x) * dy - (curve.P1.y - curve.P3.y) * dx);
|
||
|
float d3 = ((curve.P2.x - curve.P3.x) * dy - (curve.P2.y - curve.P3.y) * dx);
|
||
|
d2 = (d2 >= 0) ? d2 : -d2;
|
||
|
d3 = (d3 >= 0) ? d3 : -d3;
|
||
|
if ((d2 + d3) * (d2 + d3) < TesselationTollerance * (dx * dx + dy * dy))
|
||
|
{
|
||
|
Commit(curve.P3, ImCubicBezierTangent(curve, 1.0f));
|
||
|
}
|
||
|
else if (level < 10)
|
||
|
{
|
||
|
const auto p12 = (curve.P0 + curve.P1) * 0.5f;
|
||
|
const auto p23 = (curve.P1 + curve.P2) * 0.5f;
|
||
|
const auto p34 = (curve.P2 + curve.P3) * 0.5f;
|
||
|
const auto p123 = (p12 + p23) * 0.5f;
|
||
|
const auto p234 = (p23 + p34) * 0.5f;
|
||
|
const auto p1234 = (p123 + p234) * 0.5f;
|
||
|
|
||
|
Subdivide(ImCubicBezierPoints { curve.P0, p12, p123, p1234 }, level + 1);
|
||
|
Subdivide(ImCubicBezierPoints { p1234, p234, p34, curve.P3 }, level + 1);
|
||
|
}
|
||
|
}
|
||
|
};
|
||
|
|
||
|
if (tess_tol < 0)
|
||
|
tess_tol = 1.118f; // sqrtf(1.25f)
|
||
|
|
||
|
Tesselator tesselator;
|
||
|
tesselator.Callback = callback;
|
||
|
tesselator.UserPointer = user_pointer;
|
||
|
tesselator.TesselationTollerance = tess_tol * tess_tol;
|
||
|
tesselator.Flags = flags;
|
||
|
|
||
|
if (!(tesselator.Flags & ImCubicBezierSubdivide_SkipFirst))
|
||
|
tesselator.Commit(curve.P0, ImCubicBezierTangent(curve, 0.0f));
|
||
|
|
||
|
tesselator.Subdivide(curve, 0);
|
||
|
}
|
||
|
|
||
|
template <typename F> inline void ImCubicBezierSubdivide(F& callback, const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3, float tess_tol, ImCubicBezierSubdivideFlags flags)
|
||
|
{
|
||
|
auto handler = [](const ImCubicBezierSubdivideSample& p, void* user_pointer)
|
||
|
{
|
||
|
auto& callback = *reinterpret_cast<F*>(user_pointer);
|
||
|
callback(p);
|
||
|
};
|
||
|
|
||
|
ImCubicBezierSubdivide(handler, &callback, ImCubicBezierPoints{ p0, p1, p2, p3 }, tess_tol, flags);
|
||
|
}
|
||
|
|
||
|
template <typename F> inline void ImCubicBezierSubdivide(F& callback, const ImCubicBezierPoints& curve, float tess_tol, ImCubicBezierSubdivideFlags flags)
|
||
|
{
|
||
|
auto handler = [](const ImCubicBezierSubdivideSample& p, void* user_pointer)
|
||
|
{
|
||
|
auto& callback = *reinterpret_cast<F*>(user_pointer);
|
||
|
callback(p);
|
||
|
};
|
||
|
|
||
|
ImCubicBezierSubdivide(handler, &callback, curve, tess_tol, flags);
|
||
|
}
|
||
|
|
||
|
inline void ImCubicBezierFixedStep(ImCubicBezierFixedStepCallback callback, void* user_pointer, const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3, float step, bool overshoot, float max_value_error, float max_t_error)
|
||
|
{
|
||
|
if (step <= 0.0f || !callback || max_value_error <= 0 || max_t_error <= 0)
|
||
|
return;
|
||
|
|
||
|
ImCubicBezierFixedStepSample sample;
|
||
|
sample.T = 0.0f;
|
||
|
sample.Length = 0.0f;
|
||
|
sample.Point = p0;
|
||
|
sample.BreakSearch = false;
|
||
|
|
||
|
callback(sample, user_pointer);
|
||
|
if (sample.BreakSearch)
|
||
|
return;
|
||
|
|
||
|
const auto total_length = ImCubicBezierLength(p0, p1, p2, p3);
|
||
|
const auto point_count = static_cast<int>(total_length / step) + (overshoot ? 2 : 1);
|
||
|
const auto t_min = 0.0f;
|
||
|
const auto t_max = step * point_count / total_length;
|
||
|
const auto t_0 = (t_min + t_max) * 0.5f;
|
||
|
|
||
|
// #todo: replace map with ImVector + binary search
|
||
|
std::map<float, float> cache;
|
||
|
for (int point_index = 1; point_index < point_count; ++point_index)
|
||
|
{
|
||
|
const auto targetLength = point_index * step;
|
||
|
|
||
|
float t_start = t_min;
|
||
|
float t_end = t_max;
|
||
|
float t = t_0;
|
||
|
|
||
|
float t_best = t;
|
||
|
float error_best = total_length;
|
||
|
|
||
|
while (true)
|
||
|
{
|
||
|
auto cacheIt = cache.find(t);
|
||
|
if (cacheIt == cache.end())
|
||
|
{
|
||
|
const auto front = ImCubicBezierSplit(p0, p1, p2, p3, t).Left;
|
||
|
const auto split_length = ImCubicBezierLength(front);
|
||
|
|
||
|
cacheIt = cache.emplace(t, split_length).first;
|
||
|
}
|
||
|
|
||
|
const auto length = cacheIt->second;
|
||
|
const auto error = targetLength - length;
|
||
|
|
||
|
if (error < error_best)
|
||
|
{
|
||
|
error_best = error;
|
||
|
t_best = t;
|
||
|
}
|
||
|
|
||
|
if (ImFabs(error) <= max_value_error || ImFabs(t_start - t_end) <= max_t_error)
|
||
|
{
|
||
|
sample.T = t;
|
||
|
sample.Length = length;
|
||
|
sample.Point = ImCubicBezier(p0, p1, p2, p3, t);
|
||
|
|
||
|
callback(sample, user_pointer);
|
||
|
if (sample.BreakSearch)
|
||
|
return;
|
||
|
|
||
|
break;
|
||
|
}
|
||
|
else if (error < 0.0f)
|
||
|
t_end = t;
|
||
|
else // if (error > 0.0f)
|
||
|
t_start = t;
|
||
|
|
||
|
t = (t_start + t_end) * 0.5f;
|
||
|
}
|
||
|
}
|
||
|
}
|
||
|
|
||
|
inline void ImCubicBezierFixedStep(ImCubicBezierFixedStepCallback callback, void* user_pointer, const ImCubicBezierPoints& curve, float step, bool overshoot, float max_value_error, float max_t_error)
|
||
|
{
|
||
|
ImCubicBezierFixedStep(callback, user_pointer, curve.P0, curve.P1, curve.P2, curve.P3, step, overshoot, max_value_error, max_t_error);
|
||
|
}
|
||
|
|
||
|
// F has signature void(const ImCubicBezierFixedStepSample& p)
|
||
|
template <typename F>
|
||
|
inline void ImCubicBezierFixedStep(F& callback, const ImVec2& p0, const ImVec2& p1, const ImVec2& p2, const ImVec2& p3, float step, bool overshoot, float max_value_error, float max_t_error)
|
||
|
{
|
||
|
auto handler = [](ImCubicBezierFixedStepSample& sample, void* user_pointer)
|
||
|
{
|
||
|
auto& callback = *reinterpret_cast<F*>(user_pointer);
|
||
|
callback(sample);
|
||
|
};
|
||
|
|
||
|
ImCubicBezierFixedStep(handler, &callback, p0, p1, p2, p3, step, overshoot, max_value_error, max_t_error);
|
||
|
}
|
||
|
|
||
|
template <typename F>
|
||
|
inline void ImCubicBezierFixedStep(F& callback, const ImCubicBezierPoints& curve, float step, bool overshoot, float max_value_error, float max_t_error)
|
||
|
{
|
||
|
auto handler = [](ImCubicBezierFixedStepSample& sample, void* user_pointer)
|
||
|
{
|
||
|
auto& callback = *reinterpret_cast<F*>(user_pointer);
|
||
|
callback(sample);
|
||
|
};
|
||
|
|
||
|
ImCubicBezierFixedStep(handler, &callback, curve.P0, curve.P1, curve.P2, curve.P3, step, overshoot, max_value_error, max_t_error);
|
||
|
}
|
||
|
|
||
|
|
||
|
//------------------------------------------------------------------------------
|
||
|
# endif // __IMGUI_BEZIER_MATH_INL__
|
||
|
|
||
|
#ifndef _MSC_VER
|
||
|
#pragma GCC diagnostic pop
|
||
|
#endif
|