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I'm having trouble understanding relational algebra when it comes to theta joins, equijoins and natural joins. Could someone please help me better understand it? If I use the = sign on a theta join is it exactly the same as just using a natural join?

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re the quotation in question from the bounty...he's not quoting Codd there, he's quoting from my answer that his comment appears under. –  heisenberg Mar 5 '13 at 20:23

5 Answers 5

A theta join allows for arbitrary comparison relationships (such as ≥).

An equijoin is a theta join using the equality operator.

A natural join is an equijoin on attributes that have the same name in each relationship.

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7  
the natural join will remove the columns with the same name –  Bogdan Gavril Mar 5 '13 at 14:40
    
All of them, or all but one? –  cs. Oct 9 at 19:20

@outis's answer is good: concise and correct as regards relations.

However, the situation is slightly more coplicated as regards SQL.

First, I don't quite know what the result of SELECT * FROM table_expression; is. I know it is not a relation because, among other reasons, it can have columns with duplicate names. I know it is not a set because, among other reasons, the column order is significant. It's not even a SQL table or SQL table expression. I shall call it a resultset.

Consider the usual suppliers and parts database but implemented in SQL:

SELECT * FROM S NATURAL JOIN SP;

would return a resultset with columns

SNO, SNAME, STATUS, CITY, PNO, QTY

The join is performed on the column with the same name in both tables, SNO. Note that the resultset has six columns and only contains one column for SNO.

Now consider a theta eqijoin, where the column names for the join must be explicitly specified:

SELECT * FROM S JOIN SP ON S.SNO = SP.SNO;

The resultset will have seven columns, including two columns for SNO. The names of the resultset are what the SQL Standard refers to as "implementation dependent" but could look like this:

SNO, SNAME, STATUS, CITY, SNO, PNO, QTY

or perhaps this

S.SNO, SNAME, STATUS, CITY, SP.SNO, PNO, QTY

In other words, NATURAL JOIN in SQL can be considered to remove the duplicate column name from the resultset (but alas will not remove duplicate rows).

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Same goes for JOIN ... USING(...). –  Benoit Oct 24 '11 at 8:51

Natural is a subset of Equi which is a subset of Theta.

If I use the = sign on a theta join is it exactly the same as just using a natural join???

Not necessarily, but it would be an Equi. Natural means you are matching on all similarly named columns, Equi just means you are using '=' exclusively (and not 'less than', like, etc)

This is pure academia though, you could work with relational databases for years and never hear anyone use these terms.

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I suspect that when you say "relational databases" I suspect you mean something else e.g. "SQL". –  onedaywhen Oct 24 '11 at 7:54
    
@onedaywhen you suspect wrong –  heisenberg Oct 24 '11 at 13:34
2  
In Codd's original algebra, natural join is the fundamental type of join whereas an equi- or theta- "join" is shorthand for a NJ (e.g. cross product) followed by a restriction. "Natural is a subset of Equi which is a subset of Theta" presumably what that means is that every NJ could also be expressed as an EJ or TJ. I suppose that's true if σ 1=1 (A x B) counts as a equijoin, in which case every operation of the relational algebra could be expressed as an equijoin in that form. The ambiguity here is that there is more than one possible set of fundamental operators for the RA. –  sqlvogel Sep 21 '12 at 16:13
1  
@EricFail: sqlvogel is just quoting kekekela's answer, rather than anything from Codd. If you want more on Codd's writings about joins (θ or otherwise), you might try "The Relational Model for Database Management", or work your way through his bibliography. –  outis Mar 5 '13 at 2:29
1  
... The question you link to has an answer that gets close to what you're looking for, probably as close as is possible. It links to Relational Completeness of Data Base Sublanguages. P. 10 describes the connection between θ, = and natural joins (though natural are not strictly subsets of = in Codd's formulation, but rather the projection of =-joins). –  outis Mar 5 '13 at 2:41

While the answers explaining the exact differences are fine, I want to show how the relational algebra is transformed to SQL and what the actual value of the 3 concepts is.

The key concept in your question is the idea of a join. To understand a join you need to understand a Cartesian Product (the example is based on SQL where the equivalent is called a cross join as onedaywhen points out);

This isn't very useful in practice. Consider this example.

Product(PName, Price)
====================
Laptop,   1500
Car,      20000
Airplane, 3000000


Component(PName, CName, Cost)
=============================
Laptop, CPU,    500
Laptop, hdd,    300
Laptop, case,   700
Car,    wheels, 1000

The Cartesian product Product x Component will be - bellow or sql fiddle. You can see there are 12 rows = 3 x 4. Obviously, rows like "Laptop" with "wheels" have no meaning, this is why in practice the Cartesian product is rarely used.

|    PNAME |   PRICE |  CNAME | COST |
--------------------------------------
|   Laptop |    1500 |    CPU |  500 |
|   Laptop |    1500 |    hdd |  300 |
|   Laptop |    1500 |   case |  700 |
|   Laptop |    1500 | wheels | 1000 |
|      Car |   20000 |    CPU |  500 |
|      Car |   20000 |    hdd |  300 |
|      Car |   20000 |   case |  700 |
|      Car |   20000 | wheels | 1000 |
| Airplane | 3000000 |    CPU |  500 |
| Airplane | 3000000 |    hdd |  300 |
| Airplane | 3000000 |   case |  700 |
| Airplane | 3000000 | wheels | 1000 |

JOINs are here to add more value to these products. What we really want is to "join" the product with its associated components, because each component belongs to a product. The way to do this is with a join:

Product JOIN Component ON Pname

The associated SQL query would be like this (you can play with all the examples here)

SELECT *
FROM Product
JOIN Component
  ON Product.Pname = Component.Pname

and the result:

|  PNAME | PRICE |  CNAME | COST |
----------------------------------
| Laptop |  1500 |    CPU |  500 |
| Laptop |  1500 |    hdd |  300 |
| Laptop |  1500 |   case |  700 |
|    Car | 20000 | wheels | 1000 |

Notice that the result has only 4 rows, because the Laptop has 3 components, the Car has 1 and the Airplane none. This is much more useful.

Getting back to your questions, all the joins you ask about are variations of the JOIN I just showed:

Natural Join = the join (the ON clause) is made on all columns with the same name; it removes duplicate columns from the result, as opposed to all other joins; most DBMS (database systems created by various vendors such as Microsoft's SQL Server, Oracle's MySQL etc. ) don't even bother supporting this, it is just bad practice (or purposely chose not to implement it). Imagine that a developer comes and changes the name of the second column in Product from Price to Cost. Then all the natural joins would be done on PName AND on Cost, resulting in 0 rows since no numbers match.

Theta Join = this is the general join everybody uses because it allows you to specify the condition (the ON clause in SQL). You can join on pretty much any condition you like, for example on Products that have the first 2 letters similar, or that have a different price. In practice, this is rarely the case - in 95% of the cases you will join on an equality condition, which leads us to:

Equi Join = the most common one used in practice. The example above is an equi join. Databases are optimized for this type of joins! The oposite of an equi join is a non-equi join, i.e. when you join on a condition other than "=". Databases are not optimized for this! Both of them are subsets of the general theta join. The natural join is also a theta join but the condition (the theta) is implicit.

Source of information: university + certified SQL Server developer + recently completed the MOO "Introduction to databases" from Stanford so I dare say I have relational algebra fresh in mind.

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You use the term 'Cartesian product' somewhat loosely. The relational operator product results in a relation (in common with all relational operators!) A CROSS JOIN operation in SQL results in a table expression (rows of columns). The set operation Cartesian product results in a set of pairs. –  onedaywhen Mar 6 '13 at 16:09
    
"Natural Join...is just bad practice" -- your opinion, which I don't agree. From a 'relational algebra' point of view, NATURAL JOIN makes a lot of sense (you start by saying that RM and concepts are you reasons for posting...?) Natural join is more general than product and therefore more useful. Consider that the truly relational language Tutorial D has but one join type being natural join. If my SQL product of choice had natural join I would use it all the time. Perhaps changing existing column names on production code is the bad practise here? –  onedaywhen Mar 6 '13 at 16:15
    
When you say "Databases" you actually mean "DBMSs", a crucial difference when addressing the 'concepts'. –  onedaywhen Mar 6 '13 at 16:17
    
onedaywhen - thank you for all the useful comments! feels like a code review :). I fixed the cartesian product and DBMS problems. I maintain my opinion that natural joins are only of academic interest and important DBMSs such as SQL Server do not implement this on purpose - adding a condition explicitly leads to better code understanding and maintenance. A related question: stackoverflow.com/questions/4826613/natural-join-in-sql-server –  Bogdan Gavril Mar 6 '13 at 18:44
    
I have to agree about Natural joins, they are in practice simply dangerous. Databaseas have to be maintained over time and using something this fragile to changes is just a plain bad idea. There is a good reason why many of the major database players do not allow natural joins at all. I woudl also submit that while you can join on inequalities or left(somefield, 2) or something other than =, it is almost always a sign of a bad data model if you have to do so. –  HLGEM Mar 6 '13 at 19:14

A theta join allows for arbitrary comparison relationships.

An equijoin is a theta join using the equality operator.

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