Exemple #1
0
static SkScalar refine_cubic_root(const SkFP coeff[4], SkScalar root)
{
    //  x1 = x0 - f(t) / f'(t)

    SkFP    T = SkScalarToFloat(root);
    SkFP    N, D;

    // f' = 3*coeff[0]*T^2 + 2*coeff[1]*T + coeff[2]
    D = SkFPMul(SkFPMul(coeff[0], SkFPMul(T,T)), 3);
    D = SkFPAdd(D, SkFPMulInt(SkFPMul(coeff[1], T), 2));
    D = SkFPAdd(D, coeff[2]);

    if (D == 0)
        return root;

    // f = coeff[0]*T^3 + coeff[1]*T^2 + coeff[2]*T + coeff[3]
    N = SkFPMul(SkFPMul(SkFPMul(T, T), T), coeff[0]);
    N = SkFPAdd(N, SkFPMul(SkFPMul(T, T), coeff[1]));
    N = SkFPAdd(N, SkFPMul(T, coeff[2]));
    N = SkFPAdd(N, coeff[3]);

    if (N)
    {
        SkScalar delta = SkFPToScalar(SkFPDiv(N, D));

        if (delta)
            root -= delta;
    }
    return root;
}
Exemple #2
0
/*  Solve coeff(t) == 0, returning the number of roots that
    lie withing 0 < t < 1.
    coeff[0]t^3 + coeff[1]t^2 + coeff[2]t + coeff[3]
 
    Eliminates repeated roots (so that all tValues are distinct, and are always
    in increasing order.
*/
static int solve_cubic_polynomial(const SkFP coeff[4], SkScalar tValues[3])
{
#ifndef SK_SCALAR_IS_FLOAT
    return 0;   // this is not yet implemented for software float
#endif

    if (SkScalarNearlyZero(coeff[0]))   // we're just a quadratic
    {
        return SkFindUnitQuadRoots(coeff[1], coeff[2], coeff[3], tValues);
    }

    SkFP    a, b, c, Q, R;

    {
        SkASSERT(coeff[0] != 0);

        SkFP inva = SkFPInvert(coeff[0]);
        a = SkFPMul(coeff[1], inva);
        b = SkFPMul(coeff[2], inva);
        c = SkFPMul(coeff[3], inva);
    }
    Q = SkFPDivInt(SkFPSub(SkFPMul(a,a), SkFPMulInt(b, 3)), 9);
//  R = (2*a*a*a - 9*a*b + 27*c) / 54;
    R = SkFPMulInt(SkFPMul(SkFPMul(a, a), a), 2);
    R = SkFPSub(R, SkFPMulInt(SkFPMul(a, b), 9));
    R = SkFPAdd(R, SkFPMulInt(c, 27));
    R = SkFPDivInt(R, 54);

    SkFP Q3 = SkFPMul(SkFPMul(Q, Q), Q);
    SkFP R2MinusQ3 = SkFPSub(SkFPMul(R,R), Q3);
    SkFP adiv3 = SkFPDivInt(a, 3);

    SkScalar*   roots = tValues;
    SkScalar    r;

    if (SkFPLT(R2MinusQ3, 0))   // we have 3 real roots
    {
#ifdef SK_SCALAR_IS_FLOAT
        float theta = sk_float_acos(R / sk_float_sqrt(Q3));
        float neg2RootQ = -2 * sk_float_sqrt(Q);

        r = neg2RootQ * sk_float_cos(theta/3) - adiv3;
        if (is_unit_interval(r))
            *roots++ = r;

        r = neg2RootQ * sk_float_cos((theta + 2*SK_ScalarPI)/3) - adiv3;
        if (is_unit_interval(r))
            *roots++ = r;

        r = neg2RootQ * sk_float_cos((theta - 2*SK_ScalarPI)/3) - adiv3;
        if (is_unit_interval(r))
            *roots++ = r;

        SkDEBUGCODE(test_collaps_duplicates();)
Exemple #3
0
/*  Looking for F' dot F'' == 0
    
    A = b - a
    B = c - 2b + a
    C = d - 3c + 3b - a

    F' = 3Ct^2 + 6Bt + 3A
    F'' = 6Ct + 6B

    F' dot F'' -> CCt^3 + 3BCt^2 + (2BB + CA)t + AB
*/
static void formulate_F1DotF2(const SkScalar src[], SkFP coeff[4])
{
    SkScalar    a = src[2] - src[0];
    SkScalar    b = src[4] - 2 * src[2] + src[0];
    SkScalar    c = src[6] + 3 * (src[2] - src[4]) - src[0];

    SkFP    A = SkScalarToFP(a);
    SkFP    B = SkScalarToFP(b);
    SkFP    C = SkScalarToFP(c);

    coeff[0] = SkFPMul(C, C);
    coeff[1] = SkFPMulInt(SkFPMul(B, C), 3);
    coeff[2] = SkFPMulInt(SkFPMul(B, B), 2);
    coeff[2] = SkFPAdd(coeff[2], SkFPMul(C, A));
    coeff[3] = SkFPMul(A, B);
}
Exemple #4
0
/*  Solve coeff(t) == 0, returning the number of roots that
    lie withing 0 < t < 1.
    coeff[0]t^3 + coeff[1]t^2 + coeff[2]t + coeff[3]
*/
static int solve_cubic_polynomial(const SkFP coeff[4], SkScalar tValues[3])
{
#ifndef SK_SCALAR_IS_FLOAT
    return 0;   // this is not yet implemented for software float
#endif

    if (SkScalarNearlyZero(coeff[0]))   // we're just a quadratic
    {
        return SkFindUnitQuadRoots(coeff[1], coeff[2], coeff[3], tValues);
    }

    SkFP    a, b, c, Q, R;

    {
        SkASSERT(coeff[0] != 0);

        SkFP inva = SkFPInvert(coeff[0]);
        a = SkFPMul(coeff[1], inva);
        b = SkFPMul(coeff[2], inva);
        c = SkFPMul(coeff[3], inva);
    }
    Q = SkFPDivInt(SkFPSub(SkFPMul(a,a), SkFPMulInt(b, 3)), 9);
//  R = (2*a*a*a - 9*a*b + 27*c) / 54;
    R = SkFPMulInt(SkFPMul(SkFPMul(a, a), a), 2);
    R = SkFPSub(R, SkFPMulInt(SkFPMul(a, b), 9));
    R = SkFPAdd(R, SkFPMulInt(c, 27));
    R = SkFPDivInt(R, 54);

    SkFP Q3 = SkFPMul(SkFPMul(Q, Q), Q);
    SkFP R2MinusQ3 = SkFPSub(SkFPMul(R,R), Q3);
    SkFP adiv3 = SkFPDivInt(a, 3);

    SkScalar*   roots = tValues;
    SkScalar    r;

    if (SkFPLT(R2MinusQ3, 0))   // we have 3 real roots
    {
#ifdef SK_SCALAR_IS_FLOAT
        float theta = sk_float_acos(R / sk_float_sqrt(Q3));
        float neg2RootQ = -2 * sk_float_sqrt(Q);

        r = neg2RootQ * sk_float_cos(theta/3) - adiv3;
        if (is_unit_interval(r))
            *roots++ = r;

        r = neg2RootQ * sk_float_cos((theta + 2*SK_ScalarPI)/3) - adiv3;
        if (is_unit_interval(r))
            *roots++ = r;

        r = neg2RootQ * sk_float_cos((theta - 2*SK_ScalarPI)/3) - adiv3;
        if (is_unit_interval(r))
            *roots++ = r;

        // now sort the roots
        bubble_sort(tValues, (int)(roots - tValues));
#endif
    }
    else                // we have 1 real root
    {
        SkFP A = SkFPAdd(SkFPAbs(R), SkFPSqrt(R2MinusQ3));
        A = SkFPCubeRoot(A);
        if (SkFPGT(R, 0))
            A = SkFPNeg(A);

        if (A != 0)
            A = SkFPAdd(A, SkFPDiv(Q, A));
        r = SkFPToScalar(SkFPSub(A, adiv3));
        if (is_unit_interval(r))
            *roots++ = r;
    }

    return (int)(roots - tValues);
}