# How can I find MAX with relational algebra?

Working with databases, how can I find MAX using relational algebra?

• MAX what? The maximum value of a column? Of a row? Someone named "Max"? Maximum allowed value of an integer? The maximum number of rows? Transactions? What "relational-database" are you talking about? MS SQL Server? Dataphor? – Dour High Arch Mar 30 '11 at 23:43
• Given a relation R with |R| > 0 and containing an attribute A, let X be the set of all values of A for some tuple in R. Then MAX(A) = MAX(X) = x ∈ X | ∀ y ∈ X, x ≥ y. Note that MAX is only defined over a totally-ordered domain. – Jeffrey L Whitledge Mar 30 '11 at 23:49
• @Jeffrey -- That isn't Relational Algebra AFAIK? More like Relational Calculus. – Martin Smith Mar 31 '11 at 0:24
• Dour: I believe that "MAX" and "relational algebra" give you more than enough context to understand what is being asked. – julio.g Feb 4 '13 at 0:49

Assuming you have a relation, A, with a single attribute, 'a' (reducing a more complex relation to this is a simple task in relational algebra, I'm sure you got this far), so now you want to find the maximum value in A.

One way to do it is to find the cross product of A with itself, be sure to rename 'a' so your new relation has attributes with distinct names. for example:

(rename 'a' as 'a1') X (rename 'a' as 'a2')

now select 'a1' < 'a2', the resulting relation will have all values except the maximum. To get the max simply find the difference between your original relation:

``````(A x A) - (select 'a1' < 'a2') ((rename 'a' as 'a1')(A) x (rename 'a' as 'a2')(A))
``````

Then use the `project` operator to reduce down to a single column as Tobi Lehman suggests in the comment below.

Writing this in relational algebra notation would be (if I remember correctly). Note the final rename (i.e. ρ) is just to end up with an attribute that has the same name as in the original relation:

ρa/a1a1((A x A) - σa1 < a2a1/a(A) x ρa2/a(A))))

• Just a small nit pick, but the set difference expression A-(...) should be (AxA - (...)), since the right hand set is full of pairs. Then, after subtracting all of the pairs, use the projection operator to extract it. – tlehman Oct 31 '11 at 0:00
• This answer is only partly right. Firstly, I don't believe `A x A` is well defined since `A` and `A` have attributes in common (obviously since they have the same schemas) and a relation can't have duplicate attributes. You note this yourself, and I suppose you've just forgotten to perform the same renaming on the left cartesian product as on the right. – gblomqvist Sep 17 '18 at 17:00
• Furthermore, you take the difference of the cartesian product of `A` with itself, and all of the tuples from the cartesian product of `A` with itself where `a1 < a2`. This results in a relation where `a1 >= a2`. Finally, you project onto `a1` and rename `a1` to `a`, leaving you with the same instance of relation `A` as the one you began with. I'm clueless as to why this answer has got this many upvotes without being corrected, is my reasoning maybe faulty? The last part of @idipous answer is the correct answer to the question. – gblomqvist Sep 17 '18 at 17:01
• @gblomqvist yeah you're right, I looked through the edit history and originally just had `A - ...` and a comment saying you still need to project but then I changed it based on tlehman's comment above. idipous's answer is more complete – Dan Sep 17 '18 at 17:16

Just my two cents as I was trying to solve this today myself.

Lets say we have A = 1,2,3

If you use

``````A x A - (select 'a1' < 'a2') ((rename 'a' as 'a1')(A) x (rename 'a' as 'a2')(A))
``````

you will not get the single max value rather two columns like 1|1, 2|1,3|2,3|1,3|2,3|3

the way to get just 3 is

``````project(a)A - project(a1)((select 'a1' < 'a2') ((rename 'a' as 'a1')(A) x (rename 'a' as 'a2')(A)))
``````

At least that is what I had to do in a similar situation.

Hope it helps someone

• Actually I think your answer is more correct than Dan's since you get a one-column relation in the result, good job! :) – Dmitry Pashkevich Jan 28 '13 at 21:17
• Thanks. I only expanded on what Dan did though. So most credit should go to him :) – idipous Jan 29 '13 at 15:44

lets think we have a relation with an attribute A and values 1,2,3

``````A

1
2
3
``````

so now..

project A values and rename with A1

``````A1
1
2
3
``````

again project A values and rename with A2

``````A2
1
2
3
``````

join this with `A2<A1` i.e `\join_{A2<A1}`
so the - Output schema: (A2 integer, A1 integer)

``````A2<A1

1|2
1|3
2|3
``````

hear always A2 values will be less than A1 because we `join` like that(`a2<a1`)

now project A2 the output is like below

``````A2
1
2
``````

now diff with original attribute

``````A diff A2
``````

``````A
1
2
3
``````

`````` diff
``````

``````A2
1
2
``````

Output is `3` which is maximum value

Hi, i know some one have to help in editing, for better look

I've forgotten most of the relational algebra syntax now. A query just using `SELECT`, `PROJECT`, `MINUS` and `RENAME` would be

``````SELECT v1.number
FROM values v1
MINUS
SELECT v1.number
FROM values v1 JOIN values v2 ON v2.number > v1.number
``````

Hopefully you can translate!

I know this is old, but here is a hand-written formula which might be handy! Relation A: 1,2,3,4

``````1. First we want to PROJECT and RENAME relation A
2. We then to a THETA JOIN with the test a1<a2
3. We then PROJECT the result of the relation to give us a single set of values
a1: 1,2,3 (not max value since a1<a2)

4. We then apply the difference operator with the original relation so:
1,2,3,4 --- 1,2,3 returns 4

4 is the Max value.
``````
• Step 4 is wrong, the correct is 1,2,3,4 --- 1,2,3 – D_S_toowhite Nov 20 '14 at 9:01
• @D_S_toowhite you're correct. updated – benscabbia Nov 21 '14 at 6:59
• @gudthing The think the formula has a mistake in the sense that the two expressions around the - operator should change their position. the difference of r1(X) and r2(X) is expressed as r1 − r2 and is a relation on X containing the tuples that belong to r1 and not to r2 – new-kid Oct 25 '16 at 13:27
• Please use text, not images/links, for text (including code, tables & ERDs). Use an image only for convenience to supplement text and/or for what cannot be given in text. And never give a diagram without a legend/key. Use edit functions to inline, not links, if you have the rep--make your post self-contained. – philipxy Oct 12 '18 at 19:10

Find the MAX:

• Strategy:

1. Find those `x` that are not the `MAX`.

• Rename `A` relation as `d` so that we can compare each `A` `x` with all others.
2. Use `set difference` to find those `A` `x` that were not found in the earlier step.

• Suppose A had another column `y`, and you were asked to select `y` with `max` `x`, how would you do that? Thanks. – Zubin Kadva Sep 28 '17 at 0:38
• Please use text, not images/links, for text (including code, tables & ERDs). Use an image only for convenience to supplement text and/or for what cannot be given in text. And never give a diagram without a legend/key. Use edit functions to inline, not links, if you have the rep--make your post self-contained. – philipxy Oct 12 '18 at 19:10

`````` Project x(A) - Project A.x
(Select A.x < d.x (A x Rename d(A)))
``````