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7. Indexes Heap files allow record retrieval:

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1 7. Indexes Heap files allow record retrieval:
by specifying the Record IDentifier, RID, or by scanning all records sequentially. Sometimes, retrieval of records by specifying the values in one or more fields is needed (semantic search or value-based querying), e.g., Find all students in the CS dept; or Find students with gpa > 3; Indexes are auxilliary files (separate from the data files they index) that enable answering these value-based queries efficiently. An index contains a “search key attribute”, k, and “data entries”, k*, which lead us to the records containing the search key value. the k*s can be actual records, or pointers to the records or pointers to pointers to the records (indirect pointers). In these notes we will always assume the second alternative (pointer to the records). Chapter 18 of Fundamentals of Database Systems by Elmasri and Navathe provides an different and alternative coverage of these concepts.

2 Index Classification Primary Indexes vs. Secondary Indexes:
If the search key is, or at least contains, the clustered primary key, then the index is called a primary index, otherwise it is called a secondary index. Clustered Indexes vs. Unclustered Indexes: If closeness of key values implies closeness of the data records containing those key values, the index is called a clustered index, else it is an unclustered index. (recall, since physical disk storage is not completely linear, "close" means 1st: close on one disk track 2nd: on differnt tracks but on the same cylinder 3rd: on the different cylinders but on close cylinders. A file can be clustered on at most 1 attribute (search key) but that attribute may be composite (made up of multiple attributes). The cost of retrieving data records through an index varies greatly based on whether index is clustered or not! 11

3 Index Classification continued
key Ashby Cass Smith Sparse Index on Name Anchor records of each page Ashby, 25, Smith, 44, 22 25 30 40 44 50 Data File Dense Index on Age 33 Bristow, 30, Basu, 33, Cass, 50, Tracy, 44, Daniels, 22, Jones, 40, Name, age, bonus If there is at least one index entry per existing attribute value, then it is called dense, else sparse or non-dense. Every sparse index must be clustered! Sparse indexes are smaller. We show a sparse index on the Name attribute. The key values (name in this example) that do occur in a sparse index are called ANCHOR values (always the first key value that occurs on a page). In this example the anchor names are Ashby, Cass and Smith. Basu, Bristow, Daniels, Jones and Tracy are non-anchor names. 13

4 Primary Index PRIMARY INDEX: I(k, k*)
k  ordered or clustered "key" field values from an ordered or clustered field of file with the uniqueness property (individual value occurrences are "unique" i.e., each value can occur at most once.) k* = pointer to page (sematic pointer - namely page number) containing the first record with key value, k. Example: Assume the blocking factor (bfr) is 2, which means there is room for 2 records per page. STUDENT |S#|SNAME |LCODE | |17|BAID |NY2091| |25|CLAY |NJ5101| |32|THAISZ|NJ5102| |38|GOOD |FL6321| |57|BROWN |NY2092| |83|THOM |ND3450| Primary Index on S# |S#|pg |17| 1 |32| 2 |57| 3 page 1 page 2 page 3 11

5 Clustering Index is like a primary index except that the attribute need not be a key - but the file must be clustered on the attribute, k - and the pointer for any k is the 1st page with that k-value ENROLL2 |S#|C#|GRADE |17|6 | 96 | |25|6 | 76 | |32|6 | 62 | |38|6 | 98 | |32|6 | 91 | |25|7 | 68 | |32|8 | 89 | |17|9 | 95 | |C#|pg| Dense Clustering_Index on C# |6 | 1| |7 | 3| |8 | 4| |9 | 4| |C#|pg| Non-dense Clustering_Index on C# |6 | 1| (indexing new anchor records only) |8 | 4| There's no more search overhead with this 2nd type of non-dense clustering index, but How can you know which page has C#=7? (search pages sequentially starting at page=1) How can you know which page has C#=9? (search pages sequentially starting at page=4) page 1 page 2 page 3 page 4 11

6 Secondary Index These indexes are the same as Clustering Indexes except, - the file need not be clustered on k, - k* points to the page or record containing k - every record must be indexed (all secondary indexes are dense). Why? Option1: If there are multiple occurences of k, use multiple index entries for that k. Option2: Use repeating groups of pointers (requires a variable length page attribute) |C#|page |5 | 4 |6 | 1,2,3 |7 | 3,4 |8 | 1,2,4 S#|C#|GRADE ENROLL (unclustered C#) 32|8 | 89 | 25|6 | 76 | 32|6 | 62 | 25|8 | 86 | 38|6 | 98 | 32|7 | 91 | 17|5 | 96 | 25|7 | 68 | 17|8 | 95 | C#|pg Secondary_Index, Option1 on C# 5 | 4 6 | 1 6 | 2 6 | 3 7 | 3 7 | 4 8 | 1 8 | 2 8 | 4 Option3: Use 1 index entry for each value, with 1 pointer to a linked list of record pointers. (1 level of indirection) |S#|C#|GRADE ENROLL (unclustered C#) |32|8 | 89 | |25|6 | 76 | |32|6 | 62 | |25|8 | 86 | |38|6 | 98 | |32|7 | 91 | |17|5 | 96 | |25|7 | 68 | |17|8 | 95 | |C#| page |5 | -->|4| |6 | -->|1|->|2|->|3| |7 | -->|3|->|4| |8 | -->|1|->|2|->|4| page 1 page 2 page 3 page 4 page 5 11

7 Multi-level Index (made up of an index on an index)
For any index, since it is a file clustered on the key, k, it can have a primary or clustering index on it. (constituting the second level of the multilevel index). STUDENT |S#|SNAME |LCODE | |17|BAID |NY2091| |25|CLAY |NJ5101| |32|THAISZ|NJ5102| |38|GOOD |FL6321| |57|BROWN |NY2092| |83|THOM |ND3450| |91|PARK |MN7334| |94|SIVA |OR1123| |S#|pg| (of index file) S#-index (nondense, primary) |17| 1| |32| 2| |57| 3| |91| 4| 2nd_LEVEL (a second level, nondense index) |S#|pg| |57| 2| page 1 of STUDENT page 4 page 1 of First Level Index page 2 11

8 ISAM Tree-structured or Multilevel indexing techniques: index entry
ISAM: (a variation of multilevel Secondary indexing) static structure; B+ tree: dynamic structure which adjusts gracefully under insert and delete. K* K 1 2 m index entry ISAM 1 index every record by <k, k*>. This Index file may still be quite large, but we can apply the idea repeatedly! Non-leaf (inode Leaf Leaf pages contain data entries, <k,k*>. Non-Leaf or Inodes contain k values only Pages Overflow page Primary pages 4

9 Example ISAM Tree Blocking factor is 2 (each node has 2 k entries)
In any internal node or inode (non-leaf) add a ptr for key_values < first k-value 10,10* 15,15* 20,20* 27,27* 33,33* 37,37* 40,40* 46,46* 51,51* 55,55* 63,63* 97,97* 20 33 51 63 40 Root 6

10 Insert k=23 Insert k=48 Insert k=41 Insert k=42 Index Primary Leaf
40 Overflow Pages Leaf Index Primary 20 33 51 63 10,10* 15,15* 20,20* 27,27* 33,33* 37,37* 40,40* 46,46* 51,51* 55,55* 63,63* 97,97* 23,23* 48,48* Need overflow page Need overflow page 41,41* Need overflow page 42,42* 7

11 Note that 51 appears in index levels, but not in leaf!
Deleting 42 40 Deleting 51 Deleting 97 20 33 51 63 10,10* 15,15* 20,20* 27,27* 33,33* 37,37* 40,40* 46,46* 51,51* 55,55* 63,63* 97,97* 23,23* 48,48* 41,41* 42,42* Note that 51 appears in index levels, but not in leaf! 8

12 B+ Tree: The Most Widely Used Index
keeps tree height-balanced. Minimum 50% occupancy (except for root). Each node contains m entries, where d  m  2d. d is called the degree or order of the index. Supports equality and range-searches efficiently. Index Entries Data Entries ("Sequence set") (“Direct search set or index set”) 9

13 Example B+ Tree (d=2) Search for 5 Search for 15
Search begins at root, key comparisons direct it to a leaf (similar to ISAM except use  comparisons to keys and take left pointer iff < lowest key). Search for 5 Search for 15 Search for all data entries  24 Root 13 17 24 30 Leaves are doubly linked for fast sequential <, , , > search 2* 3* 5* 5* 7* 14* 16* 19* 20* 22* 24* 27* 29* 33* 34* 38* 39* 15 is not in the file! 10

14 Example B+ Tree (contd.)
Search for all data entries < 23 (note, this is the reason for the double linkage). Root 13 17 24 30 2* 3* 5* 7* 14* 16* 19* 20* 22* 24* 27* 29* 33* 34* 38* 39* 10

15 Inserting a Data Entry into a B+ Tree
Find correct leaf L. Put data entry in L. If L has enough space, done! Else, must split L (into L and a new node L2) Redistribute entries, copy up (promote) middle key. middle value which was promoted and is now the anchor key for L2). This can happen recursively (e.g., if there is no space for the promoted middle value in the inode to which it is promoted) To split inode, redistribute entries evenly, but push up (promote) middle key. So promote means Copy up at leaf; Move up at inode. Splits “grow” tree only a root split increases height. Only tree growth possible: wider or 1 level taller at top. 6

16 Inserting 8* No room for 5, so split and move 17 up.
appears once in the index. Contrast Entry to be inserted in parent node. (Note that 17 is moved up and only this with a leaf split.) 17 No room for 5, so split and move 17 up. Inserting 8* 2* 3* 5* 7* 24 30 5 13 5 17 24 30 13 No room for 8, so split. 5* 7* 8* 2* 3* 2* 3* 5* 7* 14* 16* 19* 20* 22* 24* 27* 29* 33* 34* 38* 39* 5 is promoted to parent node. (Note that 5 is continues to appear in the new leaf node, L2, as its anchor value.) s copied up and Observe how minimum occupancy is guaranteed in both leaf and index pg splits. Note difference between copy-up (leaf) and move-up (inode) 12

17 B+ Tree Before Inserting 8*
Root 17 24 30 2* 3* 5* 7* 14* 16* 19* 20* 22* 24* 27* 29* 33* 34* 38* 39* 13 B+ Tree Before Inserting 8* 2* 3* Root 17 24 30 14* 16* 19* 20* 22* 24* 27* 29* 33* 34* 38* 39* 13 5 7* 5* 8* After Inserting 8* Note height_increase, balance and occupancy maintenance. 13

18 Deleting a Data Entry from a B+ Tree
Start at root, find leaf L where entry belongs. Remove the entry. If L is at least half-full, done! If L has only d-1 entries, Try to re-distribute, borrowing from sibling (adjacent node with same parent as L). If re-distribution fails, merge L and a sibling. Merge could propagate to root, and therefore decreasing height. 14

19 Example Tree After Inserting 8*
2* 3* Root 17 24 30 14* 16* 19* 20* 22* 24* 27* 29* 33* 34* 38* 39* 13 5 7* 5* 8* Example Tree After Inserting 8* Root 2* 3* 17 30 14* 16* 33* 34* 38* 39* 13 5 7* 5* 8* 22* 24* 27 27* 29* Then Deleting 19*, 20* Deleting 19* is easy. Deleting 20* is done with re-distribution of 24* (and revision of anchor value (from 24 to 27) in inode. 15

20 Must merge. ... And Then Deleting 24*
2* 3* 17 30 14* 16* 33* 34* 38* 39* 13 5 7* 5* 8* 22* 24* 27 27* 29* ... And Then Deleting 24* Must merge. 2* 3* 17 30 14* 16* 33* 34* 38* 39* 13 5 7* 5* 8* 22* 27 27* 29* Observe `toss’ of index entry, 27, now that inode is below min occupancy so merge it with its sibling and index entry, 17 can be `pulled down’ (sibling merge, followed by pull-down) 2* 3* 7* 14* 16* 22* 27* 29* 33* 34* 38* 39* 5* 8* Root 30 13 5 17 16

21 Multidimensional Index
Multidimensional data almost always requires multidimensional indexing for effective access. One dimensional indexes assume a single search column, attribute (search key) which can be a composite column or key. Data structures, that support queries into multidimensional data specifically, fall in two categories: 1. Hash-table-like (e.g., Grid files and Partitioned Hash Functions) 2. Tree-like, eg, multi-key indexes, kd-trees, quad-trees (for sets of points); R-trees (for sets of regions as well as sets of points) ), Predicate-trees (P-trees) for vertical compressed, representations of data 11

22 Hash-like Structures for Multidimensional e.g., Data Grid Files
Partition the POINTS in the space into a grid. In each dimension "grid lines" partition space into stripes. Points that fall directly on a grid line belong to the stripe above or to the right of it. Example: 12 customer(age,salary) 2-dimensional data records. (age,salary): (24,60) (46,60) (50,80) (50,100) (50,120) (70,100) (84,140) (30,260) (26,400) (44,360) (50,280) (60,260) If vertical grid lines are drawn at age=40, age=65, horizontal at SAL=90K, SAL=224K The points are hashed by ranges: 400K 380K 360K 340K 320K 300K 280K 260K 240K 220K 200K 180K 160K 140K 120K 100K 80K 60K 40K 20K 0K  AGE * Grid hash function age sal points range range K (24,60) K (46,60) (50,80) K (50,100) (50,120) K (70,100) (84,140) K (30,260) (26,400) K (44,360) (50,280) K (60,260) Inserting into Grid files: If there is room, insert, else (two methods) 1. add overflow block and chain it to the primary block, or 2. reorganize the structure by adding or moving grid lines (similar to dynamic hashing) A problem with Grid files is that the number of buckets grows exponentially with dimension and the grid may become sparse. 11

23 Hash-like Structures for Multidimensional e.g., Partitioned hash Files
is a sequence of hash functions, h=(h1,...hn) such that hi produces the ith segment of bits in the hash key, that is, h(a) is the concatenation of bit subsequences, h1(a)h2(a)..hn(a). Example: The data file is CUSTOMER(AGE,SAL) consisting again of (24,60) (46,60) (50,80) (50,100) (50,120) (70,100) (84,140) (30,260) (26,400) (44,360) (50,280) (60,260) Use 2 hash functions and 3 bits, the 1st bit is for age with hash function, mod2(tens_digit of age) and the last 2 bits are for salary with hash function, mod4(hundreds_digit of sal) The lookup table is: Partitioined hash function key points (24,060) (46,060) (26,400) (84,140) (60,260) (44,360) (50,080) (50,100) (50,120) (70,100) (30,260) (50,280) 1 1 1 11

24 Tree-like Structures for Multidimensional e.g., Multi-key Index
Assume several attributes representing "dimensions" of the data points (data cube tuples) - uses a multi-level index, e.g., suppose there are 2 attributes: Provides a second level of Indexes on 2nd attribute to all tuples with same 1st attribute value /|--> / |--> Index on .--> < |--> 1st attr / \ |.. /|/ \|--> / | / | /|--> / | / |--> --> < |----> < |--> \ | \ |.. \ |\ \|--> \ | \ \| \ /|--> \ \ / |--> \ `>< |--> \ \ |.. \ \|--> \ `-> . . . indexes on 2nd attr Take the (age, salary) points again (24,60) (24,260) (24,400) (50,80) (50,100) (50,120) (50,280) (60,100) (60,260) (84,140) > (24,060) / > (24,060) / / > (24,400) ___/_________/______/ .--> |_60_|_260_|_400_____| / > (50,080) age / ____/________________ 24----' .-> |_80_|_100|_120_|_280_| > (50,280) ' \ ` > (50,120) _______ ` > (50,100) 84 `-->|100|260| > (60,260) \ ` > (60,100) \ _____ `- >|_140_| > (84,140) 11

25 Tree-like Structures for Multidimensional e. g
Tree-like Structures for Multidimensional e.g., k dimensional (kd tree) Index Interior nodes have (Attribute, Value, LowPointer, HighPontr) - Value is a value which splits data points - The example below will show (a, V, down, up) with pointers going down for LowPointer and up for HighPointer. (goes up on greater or equal actually). - Attributes used for different levels are different and ROTATE among the dimensions (round robin). - The leaves are blocks of records (assume data blocks hold 2 records, i.e., the blocking factor, bfr, is 2). - to search: decide along the tree until you reach a leaf (going up on greater or equal) - to insert: decide along the tree until you reach the proper leaf if there is room there, insert; else split the block and divide its contents according to the appropriate attribute (next one in the rotation). Example: (insert into kd-tree in this order using age first then salart, sal): age,sal (50,80) (84,140) (30,260) (44,360) (50,120) (70,100) (24,60) (26,400) (50,280) (46,60) (60,260) (50,100) insert the first 2 pairs (no tree yet, since just 1 leaf block): 50, 80 84, 140 age sal 30, 260 (leaf is full so split it and divide the contents by sal=150) 30,260 sal / { ,150} < \ 50,80 84,140 11

26 Tree-like Structures for Multidimensional e. g
Tree-like Structures for Multidimensional e.g., k dimensional (kd tree) Index continued 30,260 sal / { ,150} < \ 50,80 84,140 age sal 44,360 (leaf is not full so insert) 30,260 44,360 sal / { ,150} < \ 50,80 84,140 age sal 50,120 (leaf is full so split, divide contents by age=55) 30,260 44,360 sal / { ,150} < \ 84,140 \age / { 55, } < \ 50,80 50,120 11

27 Tree-like Structures for Multidimensional e. g
Tree-like Structures for Multidimensional e.g., k dimensional (kd tree) Index continued age sal 50,120 30,260 44,360 sal / { ,150} < \ 84,140 \age / { 55, } < \ 50,80 age sal 70,100 (leaf is not full so insert) 30,260 44,360 sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,80 50,120 age sal 24,060 (leaf is full so split, divide by sal=75) 30,260 44,360 sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 11

28 Tree-like Structures for Multidimensional e. g
Tree-like Structures for Multidimensional e.g., k dimensional (kd tree) Index continued 30,260 44,360 sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 age sal 50,280 (leaf full split, div by sal=300) 44,360 sal / (300, }< age / \ { 28, }< 30,260 / \ 50,280 / 26,400 / sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 age sal 26,400 (leaf full split, div by age=28) 30,260 44,360 age / { 28, }< / \ / 26,400 / sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 11

29 Tree-like Structures for Multidimensional e. g
Tree-like Structures for Multidimensional e.g., k dimensional (kd tree) Index continued 44,360 sal / (300, }< age / \ { 28, }< 30,260 / \ 50,280 / 26,400 / sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 age sal 46,060 (leaf not full so insert) 44,360 sal / (300, }< age / \ { 28, }< 30,260 / \ 50,280 / 26,400 / sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 46,060 11

30 Tree-like Structures for Multidimensional e. g
Tree-like Structures for Multidimensional e.g., k dimensional (kd tree) Index continued 44,360 sal / (300, }< age / \ { 28, }< 30,260 / \ 50,280 / 26,400 / sal / { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 46,060 age sal 60,260 (leaf full split by age=40) 44,360 sal / (300, }< age / \ 30,260 { 28, }< \ age / / \ { 40, }< / 26,400 \ / ,280 sal / ,260 { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 46,060 11

31 Tree-like Structures for Multidim e. g
Tree-like Structures for Multidim e.g., k dim (kd tree) Index continued 44,360 sal / (300, }< age / \ 30,260 { 28, }< \ age / / \ { 40, }< / 26,400 \ / ,280 sal / ,260 { ,150} < 84,140 \ 70,100 \age / { 55, } < \ 50,080 \ 50,120 \ sal / { ,75)< \ 24,060 46,060 age sal 50,100 (full split age=50 full again split sal=90) 44,360 sal / (300, }< age / \ 30,260 { 28, }< \ age / / \ { 40, }< / 26,400 \ / ,280 sal / ,260 { ,150} < 84, ,120 \ 70, ,100 \age / sal / { 55, } < { , 90 }< \ age / \ \ { 50, }< 50,080 \ sal / \ { ,75)< \ 24,060 46,060 11

32 Tree-like Structures for Multidimensional datasets e. g
Tree-like Structures for Multidimensional datasets e.g., Quad tree indexes - Interior nodes (Inodes) correspond to rectangulars in 2-D (more generally, they can be constructed to represent hypercubes higher dimensional space) - If the number of points in the rectangle fits in a block, it's a leaf, else the rectangle is treated as interior node with children corresponding to its 4 quadrants. - to insert into the quad treee index: search to find the proper leaf; if there's room, insert; else split node into 4 quadrants, divide contents appropriately. Example: Build the Quad-tree index as it would develop, assuming (age,sal) arrive in this order: age,sal (24,60) (46,60) (50,80) (50,100) (50,120) (70,100) (84,140) (30,260) (26,400) (44,360) (50,280) (60,260) Insert (24,60) (46,60) 400K 380K 360K 340K 320K 300K 280K 260K 240K 220K 200K 180K 160K 140K 120K 100K 80K 60K 40K 20K 0K  AGE * The only leaf node is: age sal 24,060 46,060 11

33 Tree-like Structures for Multidim datasets e.g., Quad tree indexes
insert age sal 50, 080 (leaf full split (e.g., at age=50 and sal=200) divide contents by quadrant .-NW / /---NE age,sal / {50,200} < \ \---SW 24,060 \ ,060 `SE 50,080 24,060 46,060 400K 380K 360K 340K 320K 300K 280K 260K 240K 220K 200K 180K 160K 140K 120K 100K 80K 60K 40K 20K 0K  AGE * 11

34 Tree-like Structures for Multidim datasets e.g., Quad tree indexes
insert 50, 120 full split SE at 75,100 .-NW / /---NE age,sal / {50,200} < \ \---SW 24,060 \ ,060 `SE(75,100)< insert 50, 100 (not full insert .-NW / /---NE age,sal / {50,200} < \ \---SW 24,060 \ ,060 `SE 50,080 50,100 .-NW / /---NE age,sal / {50,200} < \ \---SW 24,060 \ ,060 `SE 50,080 .-NW 50,100 / ,120 /---NE / < \ \---SW 50,080 `SE 400K 380K 360K 340K 320K 300K 280K 260K 240K 220K 200K 180K 160K 140K 120K 100K 80K 60K 40K 20K 0K  AGE * ETC. * * 11

35 Tree-like Structures for Multidim datasets: Region tree (Rtree) indexes
- inodes of an R-tree correspond to interior regions, (which can be overlapping) (usually regions are rectangles, tho, not necessarily) - R-tree regions have subregions that represent the contents of their children - And the subregions need not cover the region they subdivide (but all data must be within a subregion) Example, Consider the spatial image: Example: Consider the spatial image: 100________________________________________________________ | | | | | | | | | | school | | | |_________| | | | | | | road1 | | | | |house2 | | | |r | |_______| | | ________ |o_|_____________________________| | |house1|________ |a_|________pipeline_____________| | |______| |d | | | |2 | | | | | | 0 ` ' Assume a leaf can hold 6 regions (bfr=6) and that the 6 regions or objects above are together on 1 leaf block, whose region is shown as the outer red rectangle Thus the R-tree has a root and 1 leaf: ( (0,0), (100,90) ) (corners of outer red region) road1 road2 house1 school house2 pipeline (a full leaf with 6 objects) 11

36 school | house2 | pipeline
Rtree indexes cont. (0,0), (100,90) (0,0), (60,50) (20,20), (100,80) road1 | road2 | house1 school | house2 | pipeline POP 100________________________________________________________ | | | | | | | | | | school | | | |_________| | | | | | | road1 | | | | |house2 | | | |r | |_______| | | ________ |o_|_____________________________| | |house1|________ |a_|________pipeline_____________| | |______| |d | | | |2 | | | | | | 0 ` ' Split the full leaf putting 4 objects in 1 new leaf and 3 in the other (minimize overlap and split ~evenly) Now suppose a local cellular phone company adds a POP as shown. POP 11

37 school | house2 | pipeline
Rtree indexes cont. (0,0), (100,90) (0,0), (60,50) (80,50) house2 house3 (20,20), (100,80) road1 | road2 | house1 school | house2 | pipeline POP Note that house2 is in both regions. 100________________________________________________________ | | | | | | | | | | school | | | |_________| | | | | | | road1 | | | | |house2 | | | |r | |_______| | | ________ |o_|_____________________________| | |house1|________ |a_|________pipeline_____________| | |______| |d | | | |2 | | | | | | 0 ` ' Since house3 is not in either region (and both have room) we must decide to expand one of them. If we pick the green, expanding it to (0,20), (100,80) we add 1600 units2 If we pick the purple, expanding it to ((0,0), (80,50) we add 1000 units2 so to minimize we pick the purple. POP Now suppose we insert house3 house3 11

38 Binary Radix Tree Index (AKA a trie) an additional index structure (e
Binary Radix Tree Index (AKA a trie) an additional index structure (e.g., used in IBM AS/400 systems) Similar to B-tree, except - only the common parts of key values are embedded in inodes - a single bit is used to make the navigation direction decision at each level (0 for up and 1 for down). (zero-based bit positions are used) Example: (in this example, the tree structure is being built left-to-right) Starting with an empty structure, INSERT JAY | LA | 25 | STAR (assigned RRN=1 to it) nam_trie_INDEX CUSTOMER FILE RRN nam loc age job name part RRN 1 | JAY | LA | 25 | STAR b3 J< ON 2 JAY 1 2 | JON | LA | 45 | HOOD INSERT JON | LA | 45 | HOOD (assigned RRN=2 1st letters are teh same (J) so the common pat is embedded in the root 2nd letters: A and O, bit 3 (zero-based count) is 1st difference (and makes the decision) bit positions DBCDIC for A= EBCDIC for O= 11

39 Binary Radix Tree Index (AKA a trie) cont.
nam_trie_INDEX CUSTOMER FILE RRN nam loc age job N 3 b2 A< Y 1 b3 J< ON 2 1 | JAY | LA | 25 | STAR JAY 1 b3 J< ON 2 2 | JON | LA | 45 | HOOD 3 | JAN | RO | 93 | DOC INSERT JAN | RO | 93 | DOC (assigned RRN=3 bit positions DBCDIC for N= EBCDIC for Y= 11

40 Binary Radix Tree Index (AKA a trie) cont.
nam_trie_INDEX CUSTOMER FILE RRN nam loc age job N 3 b2 A< Y 1 b3 J< ON 2 1 | JAY | LA | 25 | STAR b2 < SUE 2 2 | JON | LA | 45 | HOOD 3 | JAN | RO | 93 | DOC 4 | SUE | RO | 16 | PROG INSERT SUE | RO | 16 | PROG (assigned RRN=4 bit positions DBCDIC for J= EBCDIC for Y= 11

41 Thank you.


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