public final class SimpleBigDecimalScore extends AbstractScore<SimpleBigDecimalScore>
Score
,
Serialized FormModifier and Type | Field and Description |
---|---|
static SimpleBigDecimalScore |
ONE |
static SimpleBigDecimalScore |
ZERO |
INIT_LABEL, initScore
Modifier and Type | Method and Description |
---|---|
SimpleBigDecimalScore |
add(SimpleBigDecimalScore addend)
Returns a Score whose value is (this + addend).
|
int |
compareTo(SimpleBigDecimalScore other) |
SimpleBigDecimalScore |
divide(double divisor)
Returns a Score whose value is (this / divisor).
|
boolean |
equals(Object o) |
BigDecimal |
getScore()
The total of the broken negative constraints and fulfilled positive constraints.
|
int |
hashCode() |
boolean |
isCompatibleArithmeticArgument(Score otherScore) |
boolean |
isFeasible()
A
PlanningSolution is feasible if it has no broken hard constraints
and Score.isSolutionInitialized() is true. |
SimpleBigDecimalScore |
multiply(double multiplicand)
Returns a Score whose value is (this * multiplicand).
|
SimpleBigDecimalScore |
negate()
Returns a Score whose value is (- this).
|
static SimpleBigDecimalScore |
of(BigDecimal score) |
static SimpleBigDecimalScore |
ofUninitialized(int initScore,
BigDecimal score) |
static SimpleBigDecimalScore |
parseScore(String scoreString) |
SimpleBigDecimalScore |
power(double exponent)
Returns a Score whose value is (this ^ exponent).
|
SimpleBigDecimalScore |
subtract(SimpleBigDecimalScore subtrahend)
Returns a Score whose value is (this - subtrahend).
|
Number[] |
toLevelNumbers()
Returns an array of numbers representing the Score.
|
String |
toShortString()
Like
Object.toString() , but trims score levels which have a zero weight. |
String |
toString() |
static SimpleBigDecimalScore |
valueOf(BigDecimal score)
Deprecated.
in favor of
of(BigDecimal) |
static SimpleBigDecimalScore |
valueOfUninitialized(int initScore,
BigDecimal score)
Deprecated.
in favor of
ofUninitialized(int, BigDecimal) |
SimpleBigDecimalScore |
withInitScore(int newInitScore)
For example
0hard/-8soft with -7 returns -7init/0hard/-8soft . |
assertNoInitScore, buildScorePattern, buildShortString, getInitPrefix, getInitScore, isSolutionInitialized, parseInitScore, parseLevelAsBigDecimal, parseLevelAsDouble, parseLevelAsInt, parseLevelAsLong, parseScoreTokens
clone, finalize, getClass, notify, notifyAll, wait, wait, wait
toInitializedScore
public static final SimpleBigDecimalScore ZERO
public static final SimpleBigDecimalScore ONE
public static SimpleBigDecimalScore parseScore(String scoreString)
public static SimpleBigDecimalScore ofUninitialized(int initScore, BigDecimal score)
@Deprecated public static SimpleBigDecimalScore valueOfUninitialized(int initScore, BigDecimal score)
ofUninitialized(int, BigDecimal)
public static SimpleBigDecimalScore of(BigDecimal score)
@Deprecated public static SimpleBigDecimalScore valueOf(BigDecimal score)
of(BigDecimal)
public BigDecimal getScore()
public SimpleBigDecimalScore withInitScore(int newInitScore)
Score
0hard/-8soft
with -7
returns -7init/0hard/-8soft
.newInitScore
- always negative (except in statistical calculations), 0 if all planning variables are initializedScore.getInitScore()
is set to newInitScore
public SimpleBigDecimalScore add(SimpleBigDecimalScore addend)
Score
addend
- value to be added to this Scorepublic SimpleBigDecimalScore subtract(SimpleBigDecimalScore subtrahend)
Score
subtrahend
- value to be subtracted from this Scorepublic SimpleBigDecimalScore multiply(double multiplicand)
Score
Math.floor(double)
).
If the implementation has a scale/precision, then the unspecified scale/precision of the double multiplicand should have no impact on the returned scale/precision.
multiplicand
- value to be multiplied by this Score.public SimpleBigDecimalScore divide(double divisor)
Score
Math.floor(double)
).
If the implementation has a scale/precision, then the unspecified scale/precision of the double divisor should have no impact on the returned scale/precision.
divisor
- value by which this Score is to be dividedpublic SimpleBigDecimalScore power(double exponent)
Score
Math.floor(double)
).
If the implementation has a scale/precision, then the unspecified scale/precision of the double exponent should have no impact on the returned scale/precision.
exponent
- value by which this Score is to be poweredpublic SimpleBigDecimalScore negate()
Score
public boolean isFeasible()
Score
PlanningSolution
is feasible if it has no broken hard constraints
and Score.isSolutionInitialized()
is true.
Simple scores (SimpleScore
, SimpleLongScore
, SimpleBigDecimalScore
) are always feasible,
if their Score.getInitScore()
is 0.Score.getInitScore()
is 0.public Number[] toLevelNumbers()
Score
When rounding is needed, each rounding should be floored (as defined by Math.floor(double)
).
The length of the returned array must be stable for a specific Score
implementation.
For example: -0hard/-7soft
returns new int{-0, -7}
The level numbers do not contain the Score.getInitScore()
.
For example: -3init/-0hard/-7soft
also returns new int{-0, -7}
ScoreDefinition.fromLevelNumbers(int, Number[])
public int compareTo(SimpleBigDecimalScore other)
public String toShortString()
Score
Object.toString()
, but trims score levels which have a zero weight.
For example 0hard/-258soft returns -258soft.
Do not use this format to persist information as text, use Object.toString()
instead,
so it can be parsed reliably.
public boolean isCompatibleArithmeticArgument(Score otherScore)
otherScore
- never nullScore.add(Score)
, Score.subtract(Score)
and Comparable.compareTo(Object)
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