Dynamic problem (algorithms)
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Dynamic problems in computational complexity theory are problems stated in terms of changing input data. In its most general form, a problem in this category is usually stated as follows:
- Given a class of input objects, find efficient algorithms and data structures to answer a certain query about a set of input objects each time the input data is modified, i.e., objects are inserted or deleted.
Problems in this class have the following measures of complexity:
- Space – the amount of memory space required to store the data structure;
- Initialization time – time required for the initial construction of the data structure;
- Insertion time – time required for the update of the data structure when one more input element is added;
- Deletion time – time required for the update of the data structure when an input element is deleted;
- Query time – time required to answer a query;
- Other operations specific to the problem in question
The overall set of computations for a dynamic problem is called a dynamic algorithm.
Many algorithmic problems stated in terms of fixed input data (called static problems in this context and solved by static algorithms) have meaningful dynamic versions.
Special cases[edit]
Incremental algorithms, or online algorithms, are algorithms in which only additions of elements are allowed, possibly starting from empty/trivial input data.
Decremental algorithms are algorithms in which only deletions of elements are allowed, starting with the initialization of a full data structure.
If both additions and deletions are allowed, the algorithm is sometimes called fully dynamic.
Examples[edit]
Maximal element[edit]
- Static problem
- For a set of N numbers find the maximal one.
The problem may be solved in O(N) time.
- Dynamic problem
- For an initial set of N numbers, dynamically maintain the maximal one when insertion and deletions are allowed.
A well-known solution for this problem is using a self-balancing binary search tree. It takes space O(N), may be initially constructed in time O(N log N) and provides insertion, deletion and query times in O(log N).
- The priority queue maintenance problem
- It is a simplified version of this dynamic problem, where one requires to delete only the maximal element. This version may do with simpler data structures.
Graphs[edit]
Given a graph, maintain its parameters, such as connectivity, maximal degree, shortest paths, etc., when insertion and deletion of its edges are allowed.[1]
See also[edit]
References[edit]
- ^ D. Eppstein, Z. Galil, and G. F. Italiano. "Dynamic graph algorithms". In CRC Handbook of Algorithms and Theory of Computation, Chapter 22. CRC Press, 1997.