Merge remote-tracking branch 'origin/mrbougo/clonefixes'

[xonotic/xonotic-data.pk3dir.git] / qcsrc / common / weapons / calculations.qc

// =============================
//  Explosion Force Calculation
// =============================

float explosion_calcpush_getmultiplier(vector explosion_v, vector target_v)
{
        float a;
        a  = explosion_v * (explosion_v - target_v);

        if(a <= 0)
                // target is too fast to be hittable by this
                return 0;

        a /= (explosion_v * explosion_v);
                // we know we can divide by this, or above a would be == 0

        return a;
}

#if 0
vector explosion_calcpush(vector explosion_v, float explosion_m, vector target_v, float target_m, float elasticity)
{
        // solution of the equations:
        //    v'                = v + a vp             // central hit
        //    m*v'   + mp*vp'   = m*v + mp*vp          // conservation of momentum
        //    m*v'^2 + mp*vp'^2 = m*v^2 + mp*vp^2      // conservation of energy (ELASTIC hit)
        // -> a = 0                                    // case 1: did not hit
        // -> a = 2*mp*(vp^2 - vp.v) / ((m+mp) * vp^2) // case 2: did hit
        //                                             // non-elastic hits are somewhere between these two

        // this would be physically correct, but we don't do that
        return explosion_v * explosion_calcpush_getmultiplier(explosion_v, target_v) * (
                (1 + elasticity) * (
                        explosion_m
                ) / (
                        target_m + explosion_m
                )
        ); // note: this factor is at least 0, at most 2
}
#endif

// simplified formula, tuned so that if the target has velocity 0, we get exactly the original force
vector damage_explosion_calcpush(vector explosion_f, vector target_v, float speedfactor)
{
        // if below 1, the formulas make no sense (and would cause superjumps)
        if(speedfactor < 1)
                return explosion_f;

#if 0
        float m;
        // find m so that
        //   speedfactor * (1 + e) * m / (1 + m) == 1
        m = 1 / ((1 + 0) * speedfactor - 1);
        vector v;
        v = explosion_calcpush(explosion_f * speedfactor, m, target_v, 1, 0);
        // the factor we then get is:
        //   1
        printf("MASS: %f\nv: %v -> %v\nENERGY BEFORE == %f + %f = %f\nENERGY AFTER >= %f\n",
                m,
                target_v, target_v + v,
                target_v * target_v, m * explosion_f * speedfactor * explosion_f * speedfactor, target_v * target_v + m * explosion_f * speedfactor * explosion_f * speedfactor,
                (target_v + v) * (target_v + v));
        return v;
#endif
        return explosion_f * explosion_calcpush_getmultiplier(explosion_f * speedfactor, target_v);
}


// =========================
//  Shot Spread Calculation
// =========================

vector cliptoplane(vector v, vector p)
{
        return v - (v * p) * p;
}

vector solve_cubic_pq(float p, float q)
{
        float D, u, v, a;
        D = q*q/4.0 + p*p*p/27.0;
        if(D < 0)
        {
                // irreducibilis
                a = 1.0/3.0 * acos(-q/2.0 * sqrt(-27.0/(p*p*p)));
                u = sqrt(-4.0/3.0 * p);
                // a in range 0..pi/3
                // cos(a)
                // cos(a + 2pi/3)
                // cos(a + 4pi/3)
                return
                        u *
                        (
                                '1 0 0' * cos(a + 2.0/3.0*M_PI)
                                +
                                '0 1 0' * cos(a + 4.0/3.0*M_PI)
                                +
                                '0 0 1' * cos(a)
                        );
        }
        else if(D == 0)
        {
                // simple
                if(p == 0)
                        return '0 0 0';
                u = 3*q/p;
                v = -u/2;
                if(u >= v)
                        return '1 1 0' * v + '0 0 1' * u;
                else
                        return '0 1 1' * v + '1 0 0' * u;
        }
        else
        {
                // cardano
                u = cbrt(-q/2.0 + sqrt(D));
                v = cbrt(-q/2.0 - sqrt(D));
                return '1 1 1' * (u + v);
        }
}
vector solve_cubic_abcd(float a, float b, float c, float d)
{
        // y = 3*a*x + b
        // x = (y - b) / 3a
        float p, q;
        vector v;
        p = (9*a*c - 3*b*b);
        q = (27*a*a*d - 9*a*b*c + 2*b*b*b);
        v = solve_cubic_pq(p, q);
        v = (v -  b * '1 1 1') * (1.0 / (3.0 * a));
        if(a < 0)
                v += '1 0 -1' * (v_z - v_x); // swap x, z
        return v;
}

vector findperpendicular(vector v)
{
        vector p;
        p_x = v_z;
        p_y = -v_x;
        p_z = v_y;
        return normalize(cliptoplane(p, v));
}

vector W_CalculateSpread(vector forward, float spread, float spreadfactor, float spreadstyle)
{
        float sigma;
        vector v1 = '0 0 0', v2;
        float dx, dy, r;
        float sstyle;
        spread *= spreadfactor; //g_weaponspreadfactor;
        if(spread <= 0)
                return forward;
        sstyle = spreadstyle; //autocvar_g_projectiles_spread_style;
        
        if(sstyle == 0)
        {
                // this is the baseline for the spread value!
                // standard deviation: sqrt(2/5)
                // density function: sqrt(1-r^2)
                return forward + randomvec() * spread;
        }
        else if(sstyle == 1)
        {
                // same thing, basically
                return normalize(forward + cliptoplane(randomvec() * spread, forward));
        }
        else if(sstyle == 2)
        {
                // circle spread... has at sigma=1 a standard deviation of sqrt(1/2)
                sigma = spread * 0.89442719099991587855; // match baseline stddev
                v1 = findperpendicular(forward);
                v2 = cross(forward, v1);
                // random point on unit circle
                dx = random() * 2 * M_PI;
                dy = sin(dx);
                dx = cos(dx);
                // radius in our dist function
                r = random();
                r = sqrt(r);
                return normalize(forward + (v1 * dx + v2 * dy) * r * sigma);
        }
        else if(sstyle == 3) // gauss 3d
        {
                sigma = spread * 0.44721359549996; // match baseline stddev
                // note: 2D gaussian has sqrt(2) times the stddev of 1D, so this factor is right
                v1 = forward;
                v1_x += gsl_ran_gaussian(sigma);
                v1_y += gsl_ran_gaussian(sigma);
                v1_z += gsl_ran_gaussian(sigma);
                return v1;
        }
        else if(sstyle == 4) // gauss 2d
        {
                sigma = spread * 0.44721359549996; // match baseline stddev
                // note: 2D gaussian has sqrt(2) times the stddev of 1D, so this factor is right
                v1_x = gsl_ran_gaussian(sigma);
                v1_y = gsl_ran_gaussian(sigma);
                v1_z = gsl_ran_gaussian(sigma);
                return normalize(forward + cliptoplane(v1, forward));
        }
        else if(sstyle == 5) // 1-r
        {
                sigma = spread * 1.154700538379252; // match baseline stddev
                v1 = findperpendicular(forward);
                v2 = cross(forward, v1);
                // random point on unit circle
                dx = random() * 2 * M_PI;
                dy = sin(dx);
                dx = cos(dx);
                // radius in our dist function
                r = random();
                r = solve_cubic_abcd(-2, 3, 0, -r) * '0 1 0';
                return normalize(forward + (v1 * dx + v2 * dy) * r * sigma);
        }
        else if(sstyle == 6) // 1-r^2
        {
                sigma = spread * 1.095445115010332; // match baseline stddev
                v1 = findperpendicular(forward);
                v2 = cross(forward, v1);
                // random point on unit circle
                dx = random() * 2 * M_PI;
                dy = sin(dx);
                dx = cos(dx);
                // radius in our dist function
                r = random();
                r = sqrt(1 - r);
                r = sqrt(1 - r);
                return normalize(forward + (v1 * dx + v2 * dy) * r * sigma);
        }
        else if(sstyle == 7) // (1-r) (2-r)
        {
                sigma = spread * 1.224744871391589; // match baseline stddev
                v1 = findperpendicular(forward);
                v2 = cross(forward, v1);
                // random point on unit circle
                dx = random() * 2 * M_PI;
                dy = sin(dx);
                dx = cos(dx);
                // radius in our dist function
                r = random();
                r = 1 - sqrt(r);
                r = 1 - sqrt(r);
                return normalize(forward + (v1 * dx + v2 * dy) * r * sigma);
        }
        else
                error("g_projectiles_spread_style must be 0 (sphere), 1 (flattened sphere), 2 (circle), 3 (gauss 3D), 4 (gauss plane), 5 (linear falloff), 6 (quadratic falloff), 7 (stronger falloff)!");
        return '0 0 0';
        /*
         * how to derive falloff functions:
         * rho(r) := (2-r) * (1-r);
         * a : 0;
         * b : 1;
         * rhor(r) := r * rho(r);
         * cr(t) := integrate(rhor(r), r, a, t);
         * scr(t) := integrate(rhor(r) * r^2, r, a, t);
         * variance : scr(b) / cr(b);
         * solve(cr(r) = rand * cr(b), r), programmmode:false;
         * sqrt(0.4 / variance), numer;
         */
}