# Simple Entailment with Excercise

I found these excercises with solutions, but I do not understand this solution. Can you explain me the Simple Entailment to understand this example: http://cgi.csc.liv.ac.uk/~valli/Comp318/PDF/Entailment.pdf

Given the RDF graph G (expressed in Turtle):

``````    :u rdfs:subClassOf :v .
:u rdfs:domain _:n .
:w rdf:type owl:class .
:w :a :x .
``````

Is the following graph simple-entailed by G? Explain the answer

``````    :u rdfs:domain _:m .
:w :a :x .
``````

Simple Entailment Deduction Rules:

se1:

``````    u a x   .
---------
u a _:n .
``````

se2:

``````    u a x   .
---------
_:n a x .
``````

Here is the solution:

By applying se1 to the triple

``````  :u rdfs:domain _:n .
``````

we obtain the following graph:

``````   :u rdfs:subClassOf :v .
:u rdfs:domain _:n .
:w rdf:type owl:class .
:w :a :x .
:u rdfs:domain _:m .
``````

Therefore the graph S

``````  :u rdfs:domain _:m .
:w :a :x .
``````

is entailed by G because S ⊆ G

-
Can you clarify what you don't understand about the solution? There's really just one step to it, viz., applying se1 to the triple `:u rdfs:domain _:n` to obtain `:u rdfs:domain _:m`. Can you clarify what doesn't make sense? –  Joshua Taylor Jan 12 at 22:57
What is the connection between :w and :u? How can we apply the se1 to the triple :u rdfs:domain _:n .? Why do we get one graph (:u rdfs:subClassOf :v . :u rdfs:domain _:n . :w rdf:type owl:class . :w :a :x . :u rdfs:domain _:m .) for me here at least 2 different graphs one for ":u" and one for ":w"? –  Lamine Jan 13 at 13:14
Those aren't `:w` and `:u`, which would be absolute IRIs (since the `:` prefix is defined). Those are blank nodes, and act as existential variables. You might find another StackOverflow question, RDF Graph Entailment, useful here. –  Joshua Taylor Jan 13 at 13:17
Knowing that `_:foo` is a blank node might make those se1 and se2 rules clearer. Se1 says that whenever you have a triple `subject predicate object` you can infer `subject predicate blank-node` which, since blank nodes are existential variables, is like saying "There exists an `x` such that `subject predicate x`. –  Joshua Taylor Jan 13 at 13:20
This triple :p :name :nickname. :p :name _:n. means: Every person ":p" has a nickname. So I can say that there exists at least one for each person ":p". But if there's a person, that has no name then you cannot say ":p :name _:n." and so this graph cannot be simple-entailed. Is this true? –  Lamine Jan 13 at 13:40
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