2017-07-27 08:39:43 +00:00
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// This is an excerpt of from the Clipper library by Angus Johnson, see the license below,
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// implementing a 64 x 64 -> 128bit multiply, and 128bit addition, subtraction and compare
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// operations, to be used with exact geometric predicates.
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// The code has been extended by Vojtech Bubnik to use 128 bit intrinsic types
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// and/or 64x64->128 intrinsic functions where possible.
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/*******************************************************************************
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* *
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* Author : Angus Johnson *
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* Version : 6.2.9 *
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* Date : 16 February 2015 *
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* Website : http://www.angusj.com *
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* Copyright : Angus Johnson 2010-2015 *
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* *
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* License: *
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* Use, modification & distribution is subject to Boost Software License Ver 1. *
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* http://www.boost.org/LICENSE_1_0.txt *
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* *
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* Attributions: *
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* The code in this library is an extension of Bala Vatti's clipping algorithm: *
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* "A generic solution to polygon clipping" *
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* Communications of the ACM, Vol 35, Issue 7 (July 1992) pp 56-63. *
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* http://portal.acm.org/citation.cfm?id=129906 *
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* *
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* Computer graphics and geometric modeling: implementation and algorithms *
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* By Max K. Agoston *
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* Springer; 1 edition (January 4, 2005) *
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* http://books.google.com/books?q=vatti+clipping+agoston *
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* *
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* See also: *
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* "Polygon Offsetting by Computing Winding Numbers" *
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* Paper no. DETC2005-85513 pp. 565-575 *
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* ASME 2005 International Design Engineering Technical Conferences *
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* and Computers and Information in Engineering Conference (IDETC/CIE2005) *
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* September 24-28, 2005 , Long Beach, California, USA *
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* http://www.me.berkeley.edu/~mcmains/pubs/DAC05OffsetPolygon.pdf *
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* *
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*******************************************************************************/
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2017-08-18 09:39:24 +00:00
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// #define SLIC3R_DEBUG
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2017-07-27 08:39:43 +00:00
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// Make assert active if SLIC3R_DEBUG
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#ifdef SLIC3R_DEBUG
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#undef NDEBUG
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#define DEBUG
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#define _DEBUG
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#undef assert
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#endif
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#include <cassert>
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#include "Point.hpp"
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2017-09-11 07:58:41 +00:00
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#if ! defined(_MSC_VER) && defined(__SIZEOF_INT128__)
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2017-07-27 08:39:43 +00:00
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#define HAS_INTRINSIC_128_TYPE
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#endif
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//------------------------------------------------------------------------------
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// Int128 class (enables safe math on signed 64bit integers)
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// eg Int128 val1((int64_t)9223372036854775807); //ie 2^63 -1
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// Int128 val2((int64_t)9223372036854775807);
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// Int128 val3 = val1 * val2;
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//------------------------------------------------------------------------------
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class Int128
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{
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#ifdef HAS_INTRINSIC_128_TYPE
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/******************************************** Using the intrinsic 128bit x 128bit multiply ************************************************/
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public:
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__int128 value;
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Int128(int64_t lo = 0) : value(lo) {}
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Int128(const Int128 &v) : value(v.value) {}
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Int128& operator=(const int64_t &rhs) { value = rhs; return *this; }
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uint64_t lo() const { return uint64_t(value); }
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int64_t hi() const { return int64_t(value >> 64); }
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int sign() const { return (value > 0) - (value < 0); }
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bool operator==(const Int128 &rhs) const { return value == rhs.value; }
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bool operator!=(const Int128 &rhs) const { return value != rhs.value; }
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bool operator> (const Int128 &rhs) const { return value > rhs.value; }
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bool operator< (const Int128 &rhs) const { return value < rhs.value; }
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bool operator>=(const Int128 &rhs) const { return value >= rhs.value; }
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bool operator<=(const Int128 &rhs) const { return value <= rhs.value; }
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Int128& operator+=(const Int128 &rhs) { value += rhs.value; return *this; }
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Int128 operator+ (const Int128 &rhs) const { return Int128(value + rhs.value); }
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Int128& operator-=(const Int128 &rhs) { value -= rhs.value; return *this; }
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Int128 operator -(const Int128 &rhs) const { return Int128(value - rhs.value); }
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Int128 operator -() const { return Int128(- value); }
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operator double() const { return double(value); }
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static inline Int128 multiply(int64_t lhs, int64_t rhs) { return Int128(__int128(lhs) * __int128(rhs)); }
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// Evaluate signum of a 2x2 determinant.
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static int sign_determinant_2x2(int64_t a11, int64_t a12, int64_t a21, int64_t a22)
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{
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__int128 det = __int128(a11) * __int128(a22) - __int128(a12) * __int128(a21);
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return (det > 0) - (det < 0);
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}
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// Compare two rational numbers.
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static int compare_rationals(int64_t p1, int64_t q1, int64_t p2, int64_t q2)
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{
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int invert = ((q1 < 0) == (q2 < 0)) ? 1 : -1;
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__int128 det = __int128(p1) * __int128(q2) - __int128(p2) * __int128(q1);
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return ((det > 0) - (det < 0)) * invert;
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}
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#else /* HAS_INTRINSIC_128_TYPE */
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/******************************************** Splitting the 128bit number into two 64bit words *********************************************/
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Int128(int64_t lo = 0) : m_lo((uint64_t)lo), m_hi((lo < 0) ? -1 : 0) {}
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Int128(const Int128 &val) : m_lo(val.m_lo), m_hi(val.m_hi) {}
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Int128(const int64_t& hi, const uint64_t& lo) : m_lo(lo), m_hi(hi) {}
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Int128& operator = (const int64_t &val)
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{
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m_lo = (uint64_t)val;
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m_hi = (val < 0) ? -1 : 0;
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return *this;
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}
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uint64_t lo() const { return m_lo; }
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int64_t hi() const { return m_hi; }
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int sign() const { return (m_hi == 0) ? (m_lo > 0) : (m_hi > 0) - (m_hi < 0); }
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bool operator == (const Int128 &val) const { return m_hi == val.m_hi && m_lo == val.m_lo; }
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bool operator != (const Int128 &val) const { return ! (*this == val); }
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bool operator > (const Int128 &val) const { return (m_hi == val.m_hi) ? m_lo > val.m_lo : m_hi > val.m_hi; }
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bool operator < (const Int128 &val) const { return (m_hi == val.m_hi) ? m_lo < val.m_lo : m_hi < val.m_hi; }
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bool operator >= (const Int128 &val) const { return ! (*this < val); }
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bool operator <= (const Int128 &val) const { return ! (*this > val); }
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Int128& operator += (const Int128 &rhs)
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{
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m_hi += rhs.m_hi;
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m_lo += rhs.m_lo;
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if (m_lo < rhs.m_lo) m_hi++;
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return *this;
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}
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Int128 operator + (const Int128 &rhs) const
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{
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Int128 result(*this);
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result+= rhs;
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return result;
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}
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Int128& operator -= (const Int128 &rhs)
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{
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*this += -rhs;
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return *this;
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}
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Int128 operator - (const Int128 &rhs) const
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{
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Int128 result(*this);
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result -= rhs;
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return result;
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}
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Int128 operator-() const { return (m_lo == 0) ? Int128(-m_hi, 0) : Int128(~m_hi, ~m_lo + 1); }
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operator double() const
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{
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const double shift64 = 18446744073709551616.0; //2^64
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return (m_hi < 0) ?
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((m_lo == 0) ?
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(double)m_hi * shift64 :
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-(double)(~m_lo + ~m_hi * shift64)) :
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(double)(m_lo + m_hi * shift64);
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}
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static inline Int128 multiply(int64_t lhs, int64_t rhs)
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{
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#if defined(_MSC_VER) && defined(_WIN64)
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// On Visual Studio 64bit, use the _mul128() intrinsic function.
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Int128 result;
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result.m_lo = (uint64_t)_mul128(lhs, rhs, &result.m_hi);
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return result;
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#else
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// This branch should only be executed in case there is neither __int16 type nor _mul128 intrinsic
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// function available. This is mostly on 32bit operating systems.
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// Use a pure C implementation of _mul128().
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int negate = (lhs < 0) != (rhs < 0);
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if (lhs < 0)
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lhs = -lhs;
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uint64_t int1Hi = uint64_t(lhs) >> 32;
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uint64_t int1Lo = uint64_t(lhs & 0xFFFFFFFF);
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if (rhs < 0)
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rhs = -rhs;
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uint64_t int2Hi = uint64_t(rhs) >> 32;
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uint64_t int2Lo = uint64_t(rhs & 0xFFFFFFFF);
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//because the high (sign) bits in both int1Hi & int2Hi have been zeroed,
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//there's no risk of 64 bit overflow in the following assignment
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//(ie: $7FFFFFFF*$FFFFFFFF + $7FFFFFFF*$FFFFFFFF < 64bits)
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uint64_t a = int1Hi * int2Hi;
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uint64_t b = int1Lo * int2Lo;
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//Result = A shl 64 + C shl 32 + B ...
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uint64_t c = int1Hi * int2Lo + int1Lo * int2Hi;
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Int128 tmp;
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tmp.m_hi = int64_t(a + (c >> 32));
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tmp.m_lo = int64_t(c << 32);
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tmp.m_lo += int64_t(b);
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if (tmp.m_lo < b)
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++ tmp.m_hi;
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if (negate)
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tmp = - tmp;
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return tmp;
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#endif
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}
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// Evaluate signum of a 2x2 determinant.
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static int sign_determinant_2x2(int64_t a11, int64_t a12, int64_t a21, int64_t a22)
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{
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return (Int128::multiply(a11, a22) - Int128::multiply(a12, a21)).sign();
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}
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// Compare two rational numbers.
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static int compare_rationals(int64_t p1, int64_t q1, int64_t p2, int64_t q2)
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{
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int invert = ((q1 < 0) == (q2 < 0)) ? 1 : -1;
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Int128 det = Int128::multiply(p1, q2) - Int128::multiply(p2, q1);
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return det.sign() * invert;
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}
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private:
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uint64_t m_lo;
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int64_t m_hi;
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#endif /* HAS_INTRINSIC_128_TYPE */
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/******************************************** Common methods ************************************************/
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public:
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// Evaluate signum of a 2x2 determinant, use a numeric filter to avoid 128 bit multiply if possible.
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static int sign_determinant_2x2_filtered(int64_t a11, int64_t a12, int64_t a21, int64_t a22)
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{
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// First try to calculate the determinant over the upper 31 bits.
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// Round p1, p2, q1, q2 to 31 bits.
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int64_t a11s = (a11 + (1 << 31)) >> 32;
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int64_t a12s = (a12 + (1 << 31)) >> 32;
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int64_t a21s = (a21 + (1 << 31)) >> 32;
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int64_t a22s = (a22 + (1 << 31)) >> 32;
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// Result fits 63 bits, it is an approximate of the determinant divided by 2^64.
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int64_t det = a11s * a22s - a12s * a21s;
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// Maximum absolute of the remainder of the exact determinant, divided by 2^64.
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int64_t err = ((std::abs(a11s) + std::abs(a12s) + std::abs(a21s) + std::abs(a22s)) << 1) + 1;
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assert(std::abs(det) <= err || ((det > 0) ? 1 : -1) == sign_determinant_2x2(a11, a12, a21, a22));
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return (std::abs(det) > err) ?
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((det > 0) ? 1 : -1) :
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sign_determinant_2x2(a11, a12, a21, a22);
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}
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// Compare two rational numbers, use a numeric filter to avoid 128 bit multiply if possible.
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static int compare_rationals_filtered(int64_t p1, int64_t q1, int64_t p2, int64_t q2)
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{
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// First try to calculate the determinant over the upper 31 bits.
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// Round p1, p2, q1, q2 to 31 bits.
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int invert = ((q1 < 0) == (q2 < 0)) ? 1 : -1;
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int64_t q1s = (q1 + (1 << 31)) >> 32;
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int64_t q2s = (q2 + (1 << 31)) >> 32;
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if (q1s != 0 && q2s != 0) {
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int64_t p1s = (p1 + (1 << 31)) >> 32;
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int64_t p2s = (p2 + (1 << 31)) >> 32;
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// Result fits 63 bits, it is an approximate of the determinant divided by 2^64.
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int64_t det = p1s * q2s - p2s * q1s;
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// Maximum absolute of the remainder of the exact determinant, divided by 2^64.
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int64_t err = ((std::abs(p1s) + std::abs(q1s) + std::abs(p2s) + std::abs(q2s)) << 1) + 1;
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assert(std::abs(det) <= err || ((det > 0) ? 1 : -1) * invert == compare_rationals(p1, q1, p2, q2));
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if (std::abs(det) > err)
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return ((det > 0) ? 1 : -1) * invert;
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}
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2017-07-28 13:47:59 +00:00
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return sign_determinant_2x2(p1, q1, p2, q2) * invert;
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2017-07-27 08:39:43 +00:00
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}
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// Exact orientation predicate,
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// returns +1: CCW, 0: collinear, -1: CW.
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static int orient(const Slic3r::Point &p1, const Slic3r::Point &p2, const Slic3r::Point &p3)
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{
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Slic3r::Vector v1(p2 - p1);
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Slic3r::Vector v2(p3 - p1);
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return sign_determinant_2x2_filtered(v1.x, v1.y, v2.x, v2.y);
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}
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2017-07-28 13:47:59 +00:00
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// Exact orientation predicate,
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// returns +1: CCW, 0: collinear, -1: CW.
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static int cross(const Slic3r::Point &v1, const Slic3r::Point &v2)
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{
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return sign_determinant_2x2_filtered(v1.x, v1.y, v2.x, v2.y);
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}
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2017-07-27 08:39:43 +00:00
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};
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