Greedy Algorithms Prof. Sin-Min Lee Department of Computer Science.
Revision of Midterm 2 Prof. Sin-Min Lee Department of Computer Science.
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Transcript of Revision of Midterm 2 Prof. Sin-Min Lee Department of Computer Science.
Revision of Midterm 2
Prof. Sin-Min Lee
Department of Computer Science
Relational Calculus
• Important features:– Declarative formal query languages for relational mode
l
– Based on the branch mathematical logic known as predicate calculus
– Two types of RC:• 1) tuple relational calculus
• 2) domain relational calculus
– A single statement can be used to perform a query
Tuple Relational Calculus
• based on specifying a number of tuple variables
• a tuple variable refers to any tuple
Generic Form
• {t | COND (t)} – where– t is a tuple variable and – COND(t) is Boolean expression involving t
Simple example 1
• To find all employees whose salary is greater than $50,000– {t| EMPLOYEE(t) and t.Salary>5000}
• where
• EMPLOYEE(t) specifies the range of tuple variable t
– The above operation selects all the attributes
Simple example 2
• To find only the names of employees whose salary is greater than $50,000– {t.FNAME, t.NAME| EMPLOYEE(t) and
t.Salary>5000}
• The above is equivalent to• SELECT T.FNAME, T.LNAME• FROM EMPLOYEE T• WHERE T.SALARY > 5000
Elements of a tuple calculus
• In general, we need to specify the following in a tuple calculus expression:– Range Relation (I.e, R(t)) = FROM– Selected combination= WHERE– Requested attributes= SELECT
More Example:Q0
• Retrieve the birthrate and address of the employee(s) whose name is ‘John B. Smith’
• {t.BDATE, t.ADDRESS| EMPLOYEE(t) AND t.FNAME=‘John’ AND t.MINIT=‘B” AND t.LNAME=‘Smith}
Formal Specification of tuple Relational Calculus
• A general format:• {t1.A1, t2.A2,…,tn.An |COND ( t1 ,t2 ,…, tn, tn+1,
tn+2,…,tn+m)}– where– t1,…,tn+m are tuple var
– Ai : attributeR(ti)– COND (formula)
• Where COND corresponds to statement about the world, which can be True or False
Elements of formula
• A formula is made of Predicate Calculus atoms:– an atom of the from R(ti)– ti.A op tj.B op{=, <,>,..}– F1 And F2 where F1 and F2 are formulas– F1 OR F2– Not (F1)– F’=(t) (F) or F’= (t) (F)
Y friends (Y, John) X likes(X, ICE_CREAM)
•
Example Queries Using the Existential Quantifier
• Retrieve the name and address of all employees who work for the ‘ Research ’ department
• {t.FNAME, t.LNAME, t.ADDRESS| EMPLOYEE(t) AND ( d) (DEPARTMENT (d) AND d.DNAME=‘Research’ AND d.DNUMBER=t.DNO)}
More Example
• For every project located in ‘Stafford’, retrieve the project number, the controlling department number, and the last name, birthrate, and address of the manger of that department.
Cont.
• {p.PNUMBER,p.DNUM,m.LNAME,m.BDATE, m.ADDRESS|PROJECT(p) and EMPLOYEE(M) and P.PLOCATION=‘Stafford’ and ( d) (DEPARTMENT(D) AND P.DNUM=d.DNUMBER and d.MGRSSN=m.SSN))}
Safe Expressions
• A safe expression R.C:– An expression that is guaranteed to generate a fi
nite number of rows (tuples)
• Example:– {t | not EMPLOYESS(t))} results values not bei
ng in its domain (I.e., EMPLOYEE)
Domain Relational Calculus (DRC)
• Another type of formal predicate calculus-based language
• QBE is based on DRC
• The language shares a lot of similarities with the tuple calculus
DRC
• The only difference is the type of variables:– variables range over singles values from domai
ns of attributes
• An expression of DRC is:– {x1, x2,…,xn|COND(x1,x2,…,xn, xn+2,…,xn+m)}
• where x1,x2,…,xn+m are domain var range over attrib
uters
• COND is a condition (or formula)
Examples
• Retrieve the birthdates and address of the employee whose name is ‘John B. Smith’
• {uv| (q)(r)(s) (EMPLOYEE(qrstuvwxyz) and q=‘John’ and r=‘B’ and s=‘Smith’
Alternative notation
• Ssign the constants ‘John’, ‘B’, and ‘Smith’ directly
• {uv|EMPLOYEE (‘John’, ’B’, ’Smith’ ,t ,u ,v ,x ,y ,z)}
More example
• Retrieve the name and address of all employees who work for the ‘Reseach’ department
• {qsv | ( z) EMPLOYEE(qrstuvwxyz) and ( l) ( m) (DEPARTMENT (lmno) and l=‘Research’ and m=z))}
More example
• List the names of managers who have at least on e dependent
• {sq| ( t) EMPLOYEE(qrstuvwxyz) and (( j)( DEPARTMENT (hijk) and (( l) | (DEPENTENT (lmnop) and t=j and t=l))))}
QBE
• Query-By-Example– Supports graphical query language based on
DRC– Implemented in commercial db such as
Access/Paradox– Query can be specified by filling in templates
of relations– Fig 9.5
Summary
• It can be shown that any query that can be expressed in the relational algebra, it can also be expressed in domain and tuple relational calculus
Quiz
• In what sense doe R.C differ from R.A, and in what sense are they similar?
Relational Algebra
• Relational algebra operations operate on relations and produce relations (“closure”)f: Relation -> Relation f: Relation x Relation
-> Relation• Six basic operations:
– Projection (R)– Selection (R)– Union R1 [ R2
– Difference R1 – R2
– Product R1 £ R2
– (Rename) (R)
Example Data Instance
sid name
1 Jill
2 Qun
3 Nitin
4 Marty
fid name
1 Ives
2 Saul
8 Roth
sid exp-grade cid
1 A 550-0103
1 A 700-1003
3 A 700-1003
3 C 500-0103
4 C 500-0103
cid subj sem
550-0103 DB F03
700-1003 AI S03
501-0103 Arch F03
fid cid
1 550-0103
2 700-1003
8 501-0103
STUDENT Takes COURSE
PROFESSOR Teaches
Natural Join and IntersectionNatural join: special case of join where is implicit – attributes with same name must be equal:
STUDENT Takes ⋈ ´ STUDENT ⋈STUDENT.sid = Takes.sid Takes
Intersection: as with set operations, derivable from difference
A-B B-A
A B
A B
Division
• A somewhat messy operation that can be expressed in terms of the operations we have already defined
• Used to express queries such as “The fid's of faculty who have taught all subjects”
• Paraphrased: “The fid’s of professors for which there does not exist a subject that they haven’t taught”
Division Using Our Existing Operators
• All possible teaching assignments: Allpairs:
• NotTaught, all (fid,subj) pairs for which professor fid has not taught subj:
• Answer is all faculty not in NotTaught:
fid,subj (PROFESSOR £ subj(COURSE))
Allpairs - fid,subj(Teaches COURSE)⋈fid(PROFESSOR) - fid(NotTaught)
´ fid(PROFESSOR) - fid(fid,subj (PROFESSOR £ subj(COURSE)) -
fid,subj(Teaches COURSE))⋈
Division: R1 R2
• Requirement: schema(R1) ¾ schema(R2)• Result schema: schema(R1) – schema(R2)• “Professors who have taught all courses”:
• What about “Courses that have been taught by all faculty”?
fid (fid,subj(Teaches ⋈ COURSE) subj(COURSE))
The Big Picture: SQL to Algebra toQuery Plan to Web Page
SELECT * FROM STUDENT, Takes, COURSE
WHERE STUDENT.sid = Takes.sID AND Takes.cID = cid
STUDENT
Takes COURSE
Merge
Hash
by cid by cidOptimizer
ExecutionEngine
StorageSubsystem
Web Server / UI / etc
Query Plan – anoperator tree
Relational Calculus: A Logical Way of
Expressing Query Operations• First-order logic (FOL) can also be thought of as a
query language, and can be used in two ways:– Tuple relational calculus– Domain relational calculus– Difference is the level at which variables are used: for at
tributes (domains) or for tuples
• The calculus is non-procedural (declarative) as compared to the algebra– More like what we’ll see in SQL– More convenient to express certain things
Domain Relational Calculus
Queries have form:
{<x1,x2, …, xn>| p}
Predicate: boolean expression over x1,x2, …, xn
– Precise operations depend on the domain and query language – may include special functions, etc.
– Assume the following at minimum:<xi,xj,…> R X op Y X op const const op X
where op is , , , , ,
xi,xj,… are domain variables
domain variables
predicate
More Complex Predicates
Starting with these atomic predicates, build up new predicates by the following rules:– Logical connectives: If p and q are predicates, then so are
pq, pq, p, and pq• (x>2) (x<4)• (x>2) (x>0)
– Existential quantification: If p is a predicate, then so is x.p
x. (x>2) (x<4)
– Universal quantification: If p is a predicate, then so is x.p
x.x>2 x. y.y>x
Some Examples
• Faculty ids
• Course names for courses with students expecting a “C”
• Courses taken by Jill
Logical Equivalences
• There are two logical equivalences that will be heavily used:– pq p q
(Whenever p is true, q must also be true.) x. p(x) x. p(x)
(p is true for all x)
• The second can be a lot easier to check!
Free and Bound Variables
• A variable v is bound in a predicate p when p is of the form v… or v…
• A variable occurs free in p if it occurs in a position where it is not bound by an enclosing or
• Examples: – x is free in x>2– x is bound in x.x>y
Can Rename Bound Variables Only
• When a variable is bound one can replace it with some other variable without altering the meaning of the expression, providing there are no name clashes
• Example: x.x>2 is equivalent to y.y>2
• Otherwise, the variable is defined outside our “scope”…
Safety
• Pitfall in what we have done so far – how do we interpret: {<sid,name>| <sid,name> STUDENT}
– Set of all binary tuples that are not students: an infinite set (and unsafe query)
• A query is safe if no matter how we instantiate the relations, it always produces a finite answer– Domain independent: answer is the same regardless of the domain
in which it is evaluated– Unfortunately, both this definition of safety and domain independ
ence are semantic conditions, and are undecidable
Safety and Termination Guarantees
• There are syntactic conditions that are used to guarantee “safe” formulas– The definition is complicated, and we won’t discuss it;
you can find it in Ullman’s Principles of Database and Knowledge-Base Systems
– The formulas that are expressible in real query languages based on relational calculus are all “safe”
• Many DB languages include additional features, like recursion, that must be restricted in certain ways to guarantee termination and consistent answers
Mini-Quiz
How do you write:– Which students have taken more than one
course from the same professor?
– What is the highest course number offered?
Translating from RA to DRC
• Core of relational algebra: , , , x, -• We need to work our way through the structure of
an RA expression, translating each possible form.– Let TR[e] be the translation of RA expression e into D
RC.
• Relation names: For the RA expression R, the DRC expression is {<x1,x2, …, xn>| <x1,x2, …, xn> R}
Selection: TR[ R]
• Suppose we have (e’), where e’ is another RA expression that translates as:
TR[e’]= {<x1,x2, …, xn>| p}• Then the translation of c(e’) is
{<x1,x2, …, xn>| p’}where ’ is obtained from by replacing each attribute with the corresponding variable
• Example: TR[#1=#2 #4>2.5R] (if R has arity 4) is
{<x1,x2, x3, x4>|< x1,x2, x3, x4> R x1=x2 x4>2.5}
Projection: TR[i1,…,im(e)]
• If TR[e]= {<x1,x2, …, xn>| p} then TR[i1,i2,…,im
(e)]=
{<x i1,x i2
, …, x im >| xj1,xj2
, …, xjk.p},
where xj1,xj2
, …, xjk are variables in x1,x2, …, xn
that are not in x i1,x i2
, …, x im
• Example: With R as before,#1,#3 (R)={<x1,x3>| x2,x4. <x1,x2, x3,x4> R}
Union: TR[R1 R2]
• R1 and R2 must have the same arity• For e1 e2, where e1, e2 are algebra expressions
TR[e1]={<x1,…,xn>|p} and TR[e2]={<y1,…yn>|q}
• Relabel the variables in the second:TR[e2]={< x1,…,xn>|q’}
• This may involve relabeling bound variables in q to avoid clashesTR[e1e2]={<x1,…,xn>|pq’}.
• Example: TR[R1 R2] = {< x1,x2, x3,x4>| <x1,x2, x3,x4>R1 <x1,x2, x3,x4>R2
Other Binary Operators
• Difference: The same conditions hold as for unionIf TR[e1]={<x1,…,xn>|p} and TR[e2]={< x1,…,xn>|q}
Then TR[e1- e2]= {<x1,…,xn>|pq}
• Product: If TR[e1]={<x1,…,xn>|p} and TR[e2]={< y1,…,ym>|q}
Then TR[e1 e2]= {<x1,…,xn, y1,…,ym >| pq}
• Example: TR[RS]= {<x1,…,xn, y1,…,ym >|
<x1,…,xn> R <y1,…,ym > S }
Summary
• Can translate relational algebra into (domain) relational calculus.
• Given syntactic restrictions that guarantee safety of DRC query, can translate back to relational algebra
• These are the principles behind initial development of relational databases– SQL is close to calculus; query plan is close to algebra– Great example of theory leading to practice!
Limitations of the Relational Algebra / Calculus
Can’t do:– Aggregate operations– Recursive queries– Complex (non-tabular) structures
• Most of these are expressible in SQL, OQL,