Dial implementation: Difference between revisions
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# A specific '''maximum span of keys''' <math>S\in\mathbb{N}</math>, | # A specific '''maximum span of keys''' <math>S\in\mathbb{N}</math>, | ||
# An array <math>A</math> with index set <math>\{0,\ldots,S-1\}</math> and [[Sets and sequences|sets]] of keys as components, | # An array <math>A</math> with index set <math>\{0,\ldots,S-1\}</math> and [[Sets and sequences|sets]] of keys as components, | ||
# A '''current position of the minimum''' <math>P | # A '''current position of the minimum''' <math>P</math>, which is dynamically changing, | ||
# An [[Index handler|index handler]], whose value type is a pointer to an element in a [[Sets and sequences|set]] | # An [[Index handler|index handler]], whose value type is a pointer to an element in a [[Sets and sequences|set]] | ||
of keys | of keys |
Revision as of 05:00, 14 October 2014
General information
Abstract Data Structure: Bounded monotonous priority queue.
Implementation Invariant: An object of "Dial implementation" comprises:
- A specific maximum span of keys [math]\displaystyle{ S\in\mathbb{N} }[/math],
- An array [math]\displaystyle{ A }[/math] with index set [math]\displaystyle{ \{0,\ldots,S-1\} }[/math] and sets of keys as components,
- A current position of the minimum [math]\displaystyle{ P }[/math], which is dynamically changing,
- An index handler, whose value type is a pointer to an element in a set
of keys All keys at an index of [math]\displaystyle{ A }[/math] are equal. For [math]\displaystyle{ i\in\{0,\ldots,S-1\}\setminus\{P\} }[/math], the value of the keys at position $i$ is larger than the value of the keys at index [math]\displaystyle{ P }[/math] by exactly [math]\displaystyle{ (S+i-P)\bmod S }[/math].
For each key currently stored in [math]\displaystyle{ A }[/math], the index handler contains a pointer to the corresponding set element.
Methods
- The minimum keys are found at position [math]\displaystyle{ P }[/math]. The position is increased in the minimum extraction method by 1 modulo [math]\displaystyle{ S }[/math], when the set at position [math]\displaystyle{ P }[/math] becomes empty.
- A key [math]\displaystyle{ K }[/math] is inserted at index [math]\displaystyle{ (S+K-P)\bmod S }[/math].
- Decreasing a key value [math]\displaystyle{ K }[/math] to value [math]\displaystyle{ K' }[/math] amounts to removing the key from the set at index [math]\displaystyle{ (S+K-P)\bmod S }[/math] and re-insert it at index [math]\displaystyle{ (S+K'-P)\bmod S }[/math].
Remark
The implementations of the methods Bounded priority queue: number and Bounded priority queue: find minimum are trivial and, hence, left out here.