source: trunk/packages/vizservers/nanovis/Axis.cpp @ 2277

#include <stdlib.h>
#include <stdio.h>
#include <math.h>
#include <float.h>
#include <string.h>
#include "Axis.h"

NaN _NaN;

inline bool DEFINED(double x) {
    return !isnan(x);
}

inline double EXP10(double x) {
    return pow(10.0, x);
}

inline int ROUND(double x) {
    return round(x);
}

inline double UROUND(double x, double u) {
    return (ROUND((x)/(u)))*u;
}

inline double UCEIL(double x, double u) {
    return (ceil((x)/(u)))*u;
}

inline double UFLOOR(double x, double u) {
    return (floor((x)/(u)))*u;
}

/*
 * ----------------------------------------------------------------------
 *
 * NiceNum --
 *
 *      Reference: Paul Heckbert, "Nice Numbers for Graph Labels",
 *                 Graphics Gems, pp 61-63.  
 *
 *      Finds a "nice" number approximately equal to x.
 *
 * ----------------------------------------------------------------------
 */
static double
NiceNum(
    double x,
    int round)                  /* If non-zero, round. Otherwise take ceiling
                                 * of value. */
{
    double expt;                /* Exponent of x */
    double frac;                /* Fractional part of x */
    double nice;                /* Nice, rounded fraction */

    expt = floor(log10(x));
    frac = x / EXP10(expt);     /* between 1 and 10 */
    if (round) {
        if (frac < 1.5) {
            nice = 1.0;
        } else if (frac < 3.0) {
            nice = 2.0;
        } else if (frac < 7.0) {
            nice = 5.0;
        } else {
            nice = 10.0;
        }
    } else {
        if (frac <= 1.0) {
            nice = 1.0;
        } else if (frac <= 2.0) {
            nice = 2.0;
        } else if (frac <= 5.0) {
            nice = 5.0;
        } else {
            nice = 10.0;
        }
    }
    return nice * EXP10(expt);
}

void 
Ticks::SetTicks(void)
{
    numTicks_ = 0;
    ticks_ = new float[nSteps_];
    if (step_ == 0.0) { 
        /* Hack: A zero step indicates to use log values. */
        unsigned int i;
        /* Precomputed log10 values [1..10] */
        static double logTable[] = {
            0.0, 
            0.301029995663981, 
            0.477121254719662, 
            0.602059991327962, 
            0.698970004336019, 
            0.778151250383644, 
            0.845098040014257,
            0.903089986991944, 
            0.954242509439325, 
            1.0
        };
        for (i = 0; i < nSteps_; i++) {
            ticks_[i] = logTable[i];
        }
    } else {
        double value;
        unsigned int i;
    
        value = initial_;       /* Start from smallest axis tick */
        for (i = 0; i < nSteps_; i++) {
            value = initial_ + (step_ * i);
            ticks_[i] = UROUND(value, step_);
        }
    }
    numTicks_ = nSteps_;
}

Axis::Axis(const char *axisName) :
    major_(5), minor_(2) 
{
    name_ = NULL;
    name(axisName);
    units_ = NULL;
    title_ = NULL;
    valueMin_ = DBL_MAX, valueMax_ = -DBL_MAX;
    min_ = DBL_MAX, max_ = -DBL_MAX;
    reqMin_ = reqMax_ = _NaN;
    range_ = 0.0, scale_ = 0.0;
    reqStep_ = 0.0;
    flags_ = AUTOSCALE;
}

/*
 * ----------------------------------------------------------------------
 *
 * InRange --
 *
 *      Determines if a value lies within a given range.
 *
 *      The value is normalized by the current axis range. If the normalized
 *      value is between [0.0..1.0] then it's in range.  The value is compared
 *      to 0 and 1., where 0.0 is the minimum and 1.0 is the maximum.
 *      DBL_EPSILON is the smallest number that can be represented on the host
 *      machine, such that (1.0 + epsilon) != 1.0.
 *
 *      Please note, *max* can't equal *min*.
 *
 * Results:
 *      If the value is within the interval [min..max], 1 is returned; 0
 *      otherwise.
 *
 * ----------------------------------------------------------------------
 */
bool
Axis::InRange(double x)
{
    if (range_ < DBL_EPSILON) {
        return (fabs(max_ - x) >= DBL_EPSILON);
    } else {
        x = (x - min_) * scale_;
        return ((x >= -DBL_EPSILON) && ((x - 1.0) < DBL_EPSILON));
    }
}

void
Axis::FixRange(double min, double max)
{
    if (min == DBL_MAX) {
        if (DEFINED(reqMin_)) {
            min = reqMin_;
        } else {
            min = (flags_ & LOGSCALE) ? 0.001 : 0.0;
        }
    }
    if (max == -DBL_MAX) {
        if (DEFINED(reqMax_)) {
            max = reqMax_;
        } else {
            max = 1.0;
        }
    }
    if (min >= max) {
        /*
         * There is no range of data (i.e. min is not less than max), so
         * manufacture one.
         */
        if (min == 0.0) {
            min = 0.0, max = 1.0;
        } else {
            max = min + (fabs(min) * 0.1);
        }
    }

    /*   
     * The axis limits are either the current data range or overridden by the
     * values selected by the user with the -min or -max options.
     */
    valueMin_ = (DEFINED(reqMin_)) ? reqMin_ : min;
    valueMax_ = (DEFINED(reqMax_)) ? reqMax_ : max;
    if (valueMax_ < valueMin_) {
        /*   
         * If the limits still don't make sense, it's because one limit
         * configuration option (-min or -max) was set and the other default
         * (based upon the data) is too small or large.  Remedy this by making
         * up a new min or max from the user-defined limit.
         */
        if (!DEFINED(reqMin_)) {
            valueMin_ = valueMax_ - (fabs(valueMax_) * 0.1);
        }
        if (!DEFINED(reqMax_)) {
            valueMax_ = valueMin_ + (fabs(valueMax_) * 0.1);
        }
    }
}

/*
 * ----------------------------------------------------------------------
 *
 * LogScale --
 *
 *      Determine the range and units of a log scaled axis.
 *
 *      Unless the axis limits are specified, the axis is scaled
 *      automatically, where the smallest and largest major ticks encompass
 *      the range of actual data values.  When an axis limit is specified,
 *      that value represents the smallest(min)/largest(max) value in the
 *      displayed range of values.
 *
 *      Both manual and automatic scaling are affected by the step used.  By
 *      default, the step is the largest power of ten to divide the range in
 *      more than one piece.
 *
 *      Automatic scaling:
 *      Find the smallest number of units which contain the range of values.
 *      The minimum and maximum major tick values will be represent the
 *      range of values for the axis. This greatest number of major ticks
 *      possible is 10.
 *
 *      Manual scaling:
 *      Make the minimum and maximum data values the represent the range of
 *      the values for the axis.  The minimum and maximum major ticks will be
 *      inclusive of this range.  This provides the largest area for plotting
 *      and the expected results when the axis min and max values have be set
 *      by the user (.e.g zooming).  The maximum number of major ticks is 20.
 *
 *      For log scale, there's the possibility that the minimum and
 *      maximum data values are the same magnitude.  To represent the
 *      points properly, at least one full decade should be shown.
 *      However, if you zoom a log scale plot, the results should be
 *      predictable. Therefore, in that case, show only minor ticks.
 *      Lastly, there should be an appropriate way to handle numbers
 *      <=0.
 *
 *          maxY
 *            |    units = magnitude (of least significant digit)
 *            |    high  = largest unit tick < max axis value
 *      high _|    low   = smallest unit tick > min axis value
 *            |
 *            |    range = high - low
 *            |    # ticks = greatest factor of range/units
 *           _|
 *        U   |
 *        n   |
 *        i   |
 *        t  _|
 *            |
 *            |
 *            |
 *       low _|
 *            |
 *            |_minX________________maxX__
 *            |   |       |      |       |
 *     minY  low                        high
 *           minY
 *
 *
 *      numTicks = Number of ticks
 *      min = Minimum value of axis
 *      max = Maximum value of axis
 *      range    = Range of values (max - min)
 *
 *      If the number of decades is greater than ten, it is assumed
 *      that the full set of log-style ticks can't be drawn properly.
 *
 * Results:
 *      None
 *
 * ---------------------------------------------------------------------- */
void
Axis::LogScale()
{
    double range;
    double tickMin, tickMax;
    double majorStep, minorStep;
    int nMajor, nMinor;
    double min, max;

    nMajor = nMinor = 0;
    /* Suppress compiler warnings. */
    majorStep = minorStep = 0.0;
    tickMin = tickMax = _NaN;
    min = valueMin_, max = valueMax_;
    if (min < max) {
        min = (min != 0.0) ? log10(fabs(min)) : 0.0;
        max = (max != 0.0) ? log10(fabs(max)) : 1.0;

        tickMin = floor(min);
        tickMax = ceil(max);
        range = tickMax - tickMin;
        
        if (range > 10) {
            /* There are too many decades to display a major tick at every
             * decade.  Instead, treat the axis as a linear scale.  */
            range = NiceNum(range, 0);
            majorStep = NiceNum(range / major_.reqNumTicks, 1);
            tickMin = UFLOOR(tickMin, majorStep);
            tickMax = UCEIL(tickMax, majorStep);
            nMajor = (int)((tickMax - tickMin) / majorStep) + 1;
            minorStep = EXP10(floor(log10(majorStep)));
            if (minorStep == majorStep) {
                nMinor = 4, minorStep = 0.2;
            } else {
                nMinor = ROUND(majorStep / minorStep) - 1;
            }
        } else {
            if (tickMin == tickMax) {
                tickMax++;
            }
            majorStep = 1.0;
            nMajor = (int)(tickMax - tickMin + 1); /* FIXME: Check this. */
            
            minorStep = 0.0;    /* This is a special hack to pass
                                 * information to the SetTicks
                                 * method. An interval of 0.0 indicates
                                 *      1) this is a minor sweep and 
                                 *      2) the axis is log scale.  
                                 */
            nMinor = 10;
        }
        if ((flags_ & TIGHT_MIN) || (DEFINED(reqMin_))) {
            tickMin = min;
            nMajor++;
        }
        if ((flags_ & TIGHT_MAX) || (DEFINED(reqMax_))) {
            tickMax = max;
        }
    }
    major_.SetValues(majorStep, nMajor, floor(tickMin));
    minor_.SetValues(minorStep, nMinor, minorStep);
    min_ = tickMin;
    max_ = tickMax;
    range_ = max_ - min_;
    scale_ = 1.0 / range_;
}

/*
 * ----------------------------------------------------------------------
 *
 * Axis::LinearScale --
 *
 *      Determine the units of a linear scaled axis.
 *
 *      The axis limits are either the range of the data values mapped
 *      to the axis (autoscaled), or the values specified by the -min
 *      and -max options (manual).
 *
 *      If autoscaled, the smallest and largest major ticks will
 *      encompass the range of data values.  If the -loose option is
 *      selected, the next outer ticks are choosen.  If tight, the
 *      ticks are at or inside of the data limits are used.
 *
 *      If manually set, the ticks are at or inside the data limits
 *      are used.  This makes sense for zooming.  You want the
 *      selected range to represent the next limit, not something a
 *      bit bigger.
 *
 *      Note: I added an "always" value to the -loose option to force
 *            the manually selected axes to be loose. It's probably
 *            not a good idea.
 *
 *          maxY
 *            |    units = magnitude (of least significant digit)
 *            |    high  = largest unit tick < max axis value
 *      high _|    low   = smallest unit tick > min axis value
 *            |
 *            |    range = high - low
 *            |    # ticks = greatest factor of range/units
 *           _|
 *        U   |
 *        n   |
 *        i   |
 *        t  _|
 *            |
 *            |
 *            |
 *       low _|
 *            |
 *            |_minX________________maxX__
 *            |   |       |      |       |
 *     minY  low                        high
 *           minY
 *
 *      numTicks = Number of ticks
 *      min = Minimum value of axis
 *      max = Maximum value of axis
 *      range    = Range of values (max - min)
 *
 * Results:
 *      None.
 *
 * Side Effects:
 *      The axis tick information is set.  The actual tick values will
 *      be generated later.
 *
 * ----------------------------------------------------------------------
 */
void
Axis::LinearScale()
{
    double step;
    double tickMin, tickMax;
    unsigned int nTicks;

    nTicks = 0;
    step = 1.0;
    /* Suppress compiler warning. */
    tickMin = tickMax = 0.0;
    if (valueMin_ < valueMax_) {
        double range;

        range = valueMax_ - valueMin_;
        /* Calculate the major tick stepping. */
        if (reqStep_ > 0.0) {
            /* An interval was designated by the user.  Keep scaling it until
             * it fits comfortably within the current range of the axis.  */
            step = reqStep_;
            while ((2 * step) >= range) {
                step *= 0.5;
            }
        } else {
            range = NiceNum(range, 0);
            step = NiceNum(range / major_.reqNumTicks, 1);
        }
        
        /* Find the outer tick values. Add 0.0 to prevent getting -0.0. */
        tickMin = floor(valueMin_ / step) * step + 0.0;
        tickMax = ceil(valueMax_ / step) * step + 0.0;
        
        nTicks = ROUND((tickMax - tickMin) / step) + 1;
    } 
    major_.SetValues(tickMin, step, nTicks);

    /*
     * The limits of the axis are either the range of the data ("tight") or at
     * the next outer tick interval ("loose").  The looseness or tightness has
     * to do with how the axis fits the range of data values.  This option is
     * overridden when the user sets an axis limit (by either -min or -max
     * option).  The axis limit is always at the selected limit (otherwise we
     * assume that user would have picked a different number).
     */
    min_ = ((flags_ & TIGHT_MIN)||(DEFINED(reqMin_))) ? valueMin_ : tickMin;
    max_ = ((flags_ & TIGHT_MAX)||(DEFINED(reqMax_))) ? valueMax_ : tickMax;
    range_ = max_ - min_;
    scale_ = 1.0 / range_;

    /* Now calculate the minor tick step and number. */

    if ((minor_.reqNumTicks > 0) && (minor_.autoscale())) {
        nTicks = minor_.reqNumTicks - 1;
        step = 1.0 / (nTicks + 1);
    } else {
        nTicks = 0;             /* No minor ticks. */
        step = 0.5;             /* Don't set the minor tick interval to
                                 * 0.0. It makes the GenerateTicks routine
                                 * create minor log-scale tick marks.  */
    }
    minor_.SetValues(step, step, nTicks);
}


void
Axis::SetScale(double min, double max)
{
    FixRange(min, max);
    if (flags_ & LOGSCALE) {
        LogScale();
    } else {
        LinearScale();
    }
    major_.SweepTicks();
    minor_.SweepTicks();
    MakeTicks();
}

void
Axis::MakeTicks(void)
{
    major_.Reset();
    minor_.Reset();
    int i;
    for (i = 0; i < major_.numTicks(); i++) {
        double t1, t2;
        int j;
        
        t1 = major_.tick(i);
        /* Minor ticks */
        for (j = 0; j < minor_.numTicks(); j++) {
            t2 = t1 + (major_.step() * minor_.tick(j));
            if (!InRange(t2)) {
                continue;
            }
            if (t1 == t2) {
                continue;       // Don't add duplicate minor ticks.
            }
            minor_.Append(t2);
        }
        if (!InRange(t1)) {
            continue;
        }
        major_.Append(t1);
    }
}

double
Axis::Map(double x)
{
    if ((flags_ & LOGSCALE) && (x != 0.0)) {
        x = log10(fabs(x));
    }
    /* Map graph coordinate to normalized coordinates [0..1] */
    x = (x - min_) * scale_;
    if (flags_ & DESCENDING) {
        x = 1.0 - x;
    }
    return x;
}

double
Axis::InvMap(double x)
{
    if (flags_ & DESCENDING) {
        x = 1.0 - x;
    }
    x = (x * range_) + min_;
    if (flags_ & LOGSCALE) {
        x = EXP10(x);
    }
    return x;
}