There is a fairly good example on wikipedia: Fourth normal form. Is there any specific part you don't understand?

You might also want to look at Multivalued dependency.

**UPDATE:** *so what is the difference between trivial and non trivial dependencies?*

It depends if we are talking about functional or multivalued dependencies.

A trivial functional dependency `X -> Y`

is one where `Y`

is a subset of `X`

. Since `X -> Y`

means "Y can be determined from X", this is trivially true for any `X`

and `Y`

where `Y`

is made up of attributes from `X`

; obviously if we know `X`

we can determine `Y`

if it only contains stuff from `X`

!

A trivial multivalued dependency `X ->-> Y`

is one where `Y`

contains every attribute not in `X`

. Note it can also contain attributes in `X`

as well. This kind of multivalued dependency is also true for all `X`

and `Y`

and is therefore trivial. This follows from the definition of multivalued dependency:

*denote by (x,y,z) the tuple having
values for *`X`

, `Y`

, `R − X − Y`

collectively equal to x, y, z,
correspondingly, then whenever the
tuples (a,b,c) and (a,d,e) exist in r,
the tuples (a,b,e) and (a,d,c) should
also exist in r.

In a trivial multivalued dependancy, the set `z = R - X - Y`

is empty, so the requirement reduces to ( `0`

being the empty set):

*tuples (a,b,0) and (a,d,0) exist in r,
the tuples (a,b,0) and (a,d,0) should
also exist in r.*

Which is obviously true.