uucp@ucbvax.UUCP (08/11/84)
From: decvax!mcvax!ariadne!kateveni (Manolis Katevenis)
To parakatw keimeno einai to episimo kai teliko gia tin fetini
Akadimaiki chronia 1984-85. Dechomaste kai proskaloume scholia
kai protaseis allagis gia ti chronia 1985-86.
To keimeno einai se "machine readable form", katallili gia to
filtro "grk" -- morfi pou twra eponomastike "LCG": Latin-Coded
Greek. DEN echei entoles troff mesa tou. Edw stin Kriti ypar-
chei mia morfi tou filtrou "grk" pou typwnei fakellous LCG se
ellinikous ektypwtes. Episis yparchei to antistrofo filtro,
pou metatrepei fakellous me ellinikous charaktires se morfi LCG.
An yparchei endiaferon, tha dianeimw syntoma autes tis nees morfes
tou filtrou.
Chairetismous,
Manolis Katevenis,
Hrakleio, Kriti.
.G
PANEPISTIIMIO KRIITIIS
TMIIMA EPISTIIMIIS YPOLOGISTWN
PROPTYCHIAKO PROGRAMMA SPOYDWN
archeiothetiimEno sto:
\fLariadne:/u/uofc/pr-sp/84-07/propt.lcg\fG
(1) GenikA.
ParakAtw dInetai to proptychiakO prOgramma spoudWn tou TmIImatos
EpistIImiis YpologistWn tou PanepistIImiou KrIItiis, stiin prWtii tou
morfII, 'opws kathorIstiike apO to D.E.P. tou TmIImatos ton IoUlii 1984.
EpidIwxii tou progrAmmatos autoU eInai na eInai prosarmosmEno stis
sYgchrones antilIIpseis giA tiin epistIImii twn ypologistWn kathWs kai
stis anAgkes tiis EllAdas, na dInei ston proptychiakO foitiitII to sw-
stO syndyasmO eurYtiitas kai bAthous gnWsewn, apaitOntas apO to foitii-
tII tiin katabolII arketIIs -- allA 'ochi kai yperbolikIIs -- ergasIas,
kai na 'echei miA kateUthynsii efarmosmEnii, me 'emfasii stiin ergastii-
riakII ekpaIdeusii.
EnnoeItai 'oti to prOgramma autO tha upOkeitai se synecheIs allagEs
kai beltiWseis kAthe Akadiima:i:kII chroniA, antanaklWntas tiin exElixii
tiis epistIImiis kathWs kai tiin peIra apO tiin efarmogII tou stiin
prAxii. EpIsiis, to periechOmeno kAthe mathIImatos mporeI na poikIlei
ws kApoio bathmO, anAloga me ton didAskonta kai tiin kateUthynsii 'ii
'emfasii pou autOs/'ii thElei na dWsei.
To prOgramma apoteleItai apO ta "mathIImata pyrIIna", pou eInai ypo-
chrewtikA, apO dYo omAdes "mathiimAtwn epilogIIs", apO kAthe miA ap' tis
opoIes o foitiitIIs prEpei na parakolouthIIsei orismEno arithmO mathii-
mAtwn, kai apO 'ena toulAchisto akOma mAthiima eleUtheriis epilogIIs. Oi
epilogEs gInontai apO kAthe foitiitII me tii boIItheia symboulIIs apO ta
mElii tou D.E.P., kai dInoun tiin euchEreia sto foitiitII na akolouthII-
sei miA elafrA eidIkeusii s' 'ena tomEa twn H/Y -- elafrA mOno eidIkeu-
sii, ef' 'oso prOkeitai giA proptychiakEs mOno spoudEs.
Oi spoudEs tiis epistIImiis ypologistWn 'echoun apOlytii anAgkii apO
tii gnWsii tiis AgglikIIs glWssas. Ta antIstoicha ypochrewtikA mathII-
mata tha prEpei oi foitiitEs na ta parakolouthoUn ta dUo prWta chrOnia
twn spoudWn tous me kAthe thysIa (ef' 'oso, fysikA, den xEroun 'iidii
AgglikA se bathmO pou na mporoUn na perAsoun tis antIstoiches exetAseis
chwrIs parakoloUthiisii).
Ston parakAtw katAlogo mathiimAtwn, ii arIthmiisii twn mathiimAtwn
kai ta ypOloipa sYmbola kathorIzoun tii chroniA twn spoudWn stiin opoIa
kanonikA antistoicheI to kAthe mAthiima, ton tomEa ston opoIo anIIkei,
to bAros tou se DidaktikEs MonAdes (DM), tiin pithanII taUtisii tou me
kApoio mAthiima 'allou TmIImatos, to katA pOso eInai mAthiima pyrIIna 'h
epilogIIs, kathWs kai ta proapaitoUmena tou mathIImata ta opoIa o foi-
tiitIIs prEpei na 'echei perAsei giA na mporeI na to parakolouthIIsei.
- 2 - (Propt.Pr.Sp.84-85)
(2) ArIthmiisii MathiimAtwn.
Ta mathIImata pou synIIthws parakolouthoUn oi foitiitEs tou Tm. H/Y
arithmIzontai symbolikA me dYo grAmmata kai trIa psiifIa: \fL "HY xyy" ,\fG
'opou to psiifIo \fL"x"\fG antistoicheI sto 'etos 'opou synIIthws parakolou-
thiEtai to mAthiima (1 ws 4 gia proptychiakA, 5 kai pAnw giA metaptychi-
akA) kai ta psiifIa \fL"yy"\fG antistoichoUn ston TomEa 'opou anoIkei to
mAthiima:
00 ws 19 : eisagwgikA kai genikA mathIImata
20 ws 39 : architektonikII ypologistWn - \fLhardware\fG
40 ws 59 : programmatismOs - \fLsoftware\fG
60 ws 79 : efarmogEs ypologistWn
80 ws 99 : thewrIa ypologistWn kai ypologismWn
Ston parakAtw katAlogo akolouthioUntai oi exIIs symbolismoI:
\fL HYxyy \fG : mathIImata pou didAskontai apO to DEP. tou Tm.H/Y
\fL(HYxyy)\fG : mathIImata pou didAskountai apO to DEP. 'allwn
TmiimAtwn, toulAchisto se prWtii fAsii
\fL<z>\fG : arithmOs DidaktikWn MonAdwn (DM) tou mathIImatos
[AN] : mathIImata me anoichtO akroatIIrio, 'h me xechw-
ristII didaskalIa se anoichtO akroatIIrio
[E1] : omAda epilogIIs 1 (MathiimatikA-FysikII) --
-- DYO epilogEs anA foitiitII
[E2] : omAda epilogIIs 2 (YpologistEs) --
-- TESSEREIS epilogEs anA foitiitII
(Ta mathIImata pou DEN siimeiWnontai [E1] 'h [E2]
eInai ypochrewtikA)
[PROAP: ---] : proapaitoUmena mathIImata
(3) F'ortos ergasIas foitiitII kai pro:y:pothEseis apOktiisiis ptychIou.
O fOrtos ergasIas enOs foitiitII, 'ena exAmiino, eInai to 'athroisma
twn DidaktikWn MonAdwn (DM) twn mathiimAtwn pou autOs/'h parakoloutheI
autO to exAmiino. SynistAtai o fOrtos autOs na eInai perIpou 'isos me
19 (dekaennEa) DM giA kAthe exAmiino. O MEGISTOS EPITREPTOS FORTOS eI-
nai 28 (EIKOSIOKTW) DidaktikEs MonAdes anA exAmiino.
Oi pro:y:pothEseis giA tiin apOktiisii ptychIou eInai oi exIIs:
(a) ParakoloUthiisii mathiimAtwn giA toulAchisto 8 (oktW) exAmiina.
(b) Na perAsei o foitiitIIs 'ola ta ypochrewtikA mathIImata (diiladII
'osa DEN siimeiWnontai me [E1] 'h [E2] ston parakAtw katAlogo).
(g) Na perAsei o foitiitIIs toulAchisto DYO mathIImata tiis omAdas epi-
logIIs [E1] (MathiimatikWn-FysikIIs), kai toulAchisto TESSERA
mathIImata tiis omAdas epilogIIs [E2] (YpologistWn).
(d) Na 'echei perAsei o foitiitIIs SYNOLIKA toulAchisto 150 (ekatO pe-
nIInta) DidaktikEs MonAdes (DM).
SiimeiWnetai 'oti ta ypochrewtikA mathIImata 'echoun synolikA 123 DM,
oi dYo epilogEs [E1] 8 ws 10 DM, oi tEssereis epilogEs [E2] 16 DM, dii-
ladII sYnolo 147 ws 149 DM. 'Ara apaiteItai ii parakoloUthiisii enOs
akOma mathIImatos. SynistAtai to mAthiima autO na eInai 'ena mAthiima
oikonomikoU, koinwnikoU, filosofikoU, istorikoU, 'h 'allou parOmoiou
periechOmenou.
- 3 - (Propt.Pr.Sp.84-85)
(4) SynoptikOs P'inakas
PROPTYCHIAKOY PROGRAMMATOS SPOYDWN
Tm. Epist. YpologistWn Panep. KrIItiis
HY 100 <4> EisagwgII stous H/Y [AN]
HY 110 <3> LogikII
(HY 111) <5> (MATH-102) ApeirostikOs LogismOs I
(HY 112) <5> (FYS-101) FysikII I
(HY 113) <5> (FYS-102) FysikII I\fGI
(HY 119A)<3> AgglikA I
(HY 119B)<3> AgglikA I\fGI
HY 120 <5> PsiifiakII SchedIasii
HY 140 <5> ProgrammatismOs
(HY 211) <5> (MATH-103) ApeirostikOs LogismOs I\fGI [PROAP: 111]
(HY 215) <5> (MATH-105) GrammikII 'Algebra
(HY 216) <4> (MATH-231) ArithmiitikII AnAlysii [PROAP: 211]
HY 217 <3> PithanOtiites I [PROAP: 111]
(HY 219A)<3> AgglikA I\fGI\fGI
(HY 219B)<3> AgglikA I\fLV\fG
HY 220 <5> ProgrammatismOs \fLAssembly\fG
[HY 221] <4> ArchitektonikII H/Y, Gl. \fLAssembly\fG [AN-foit.ALLWN Tm. MONO]
HY 230 <5> OrgAnwsii YpologistWn [PROAP: 120, 220]
HY 240 <5> DomEs DedomEnwn [PROAP: 140]
HY 250 <5> LeitourgikA SystIImata [PROAP: 240]
HY 280 <4> ThewrIa YpologismWn [PROAP: 110]
(HY 311) <4> (MATH-212) DiaforikEs ExisWseis [E1] [PROAP: 211]
(HY 312) <5> (FYS-218) HlektronikII FysikII [E1] [PROAP:112,113,211]
(HY 313) <5> (FYS-331) HlektronikA I [E1] [PROAP:112,113,211]
(HY 314) <5> (FYS-332) HlektronikA I\fGI [E1] [PROAP:112,113,211]
(HY 315) <4> (MATH-220) 'Algebra [E1] [PROAP: 215]
HY 317 <3> PithanOtiites I\fGI [PROAP: 217]
HY 320 <4> PsiifiakEs EpikoinwnIes [PROAP: 120, 220]
HY 340 <5> GlWsses kai MetafrastEs (\fLCompilers\fG) [PROAP: 240, 280]
HY 350 <5> ArcheIa kai B'aseis DedomEnwn [PROAP: 250]
HY 360 <5> GrafikII [PROAP: 240]
HY 368 <4> EpicheiriisiakII 'Ereuna [PROAP: 215, 217]
HY 370 <4> PsiifiakII EpexergasIa SiimAtwn I [PROAP:211,215,317]
HY 380 <4> AlgOrithmoi kai PolyplokOtiita [PROAP: 280]
HY 420 <4> D'iktya YpologistWn [E2] [PROAP: 250, 320]
HY 430 <4> ArchitektonikII YpologistWn [E2] [PROAP: 230, 340]
HY 440 <4> TechnologIa \fLSoftware\fG [E2] [PROAP: 340]
HY 460 <4> TechniitII No\fGiimosYnii [E2] [PROAP: 240]
HY 470 <4> PsiifiakII EpexergasIa SiimAtwn I\fGI [E2] [PROAP: 370]
HY 471 <4> EpexergasIa EikOnwn [E2] [PROAP: 370]
HY 480 <4> ThewrIa KwdIkwn kai KryptografIa [E2] [PROAP: 315, 317]
MikrO YpOmniima:
\fL<z>\fG : arithmOs DidaktikWn MonAdwn (DM) tou mathIImatos
[AN] : mathIImata me anoichtO akroatIIrio, 'h me xechw-
ristII didaskalIa se anoichtO akroatIIrio
[E1] : omAda epilogIIs 1 - DYO epilogEs anA foitiitII
[E2] : omAda epilogIIs 2 - TESSEREIS epilogEs anA foit.
[PROAP: ---] : proapaitoUmena mathIImata
- 4 - (Propt.Pr.Sp.84-85)
(5) AnalytikOs katAlogos mathiimAtwn.
SEIRA 00 - 19 : GENIKA MATHIIMATA.
------------------------------------------------------------------------
HY 100 <4> EisagwgII stous H/Y [AN]
------------------------------------------------------------------------
GenikII eisagwgII stis 'ennoies kai tis praktikEs tiis epist. twn Ypolo-
gistWn. EisagwgII stis 'ennoies: analogikA systIImata, psiifiakA systII-
mata, pliiroforIa, algOrithmos, architektonikII \fLvonNeumann\fG (entolEs kai
dedomEna, mnIImii kai epexergastIIs, akolouthiakII ektElesii entolWn),
prOgramma, glWsses, orgAnwsii ypologistikWn systiimAtwn (epexergastIIs,
termatikA, ektypwtEs, dIskoi, dIktya, klp.), systIImata archeIwn (\fLfile
systems\fG), leitourgikA systIImata, iilektronikO tachydromeIo. Koinw-
nikA thEmata YpologistWn. PraktikII exoikeIwsii me tii chrIIsii ypolo-
gistWn (p.ch. proswpikoI ypologistEs, \fLBasic, Visicalc, editors,
MS DOS, mail\fG, klp.).
------------------------------------------------------------------------
HY 110 <3> LogikII
------------------------------------------------------------------------
EpilogII themAtwn apO ta mathIImata LogikII I (MATH-200) kai I\fGI (MATH-331) tou
Tm. MathiimatikWn. DidaskalIa eidikA prosarmosmEnii se akroatIIrio H/Y.
------------------------------------------------------------------------
(HY 111) <5> (MATH-102) ApeirostikOs LogismOs I
(HY 211) <5> (MATH-103) ApeirostikOs LogismOs I\fGI [PROAP: 111]
(HY 215) <5> (MATH-105) GrammikII 'Algebra
(HY 216) <4> (MATH-231) ArithmiitikII AnAlysii [PROAP: 211]
(HY 311) <4> (MATH-212) DiaforikEs ExisWseis [E1] [PROAP: 211]
(HY 315) <4> (MATH-220) 'Algebra [E1] [PROAP: 215]
------------------------------------------------------------------------
Ta antIstoicha mathIImata tou TmIImatos MathiimatikWn.
------------------------------------------------------------------------
(HY 112) <5> (FYS-101) FysikII I
(HY 113) <5> (FYS-102) FysikII I\fGI
(HY 312) <5> (FYS-218) HlektronikII FysikII [E1] [PROAP:112,113,211]
(HY 313) <5> (FYS-331) HlektronikA I [E1] [PROAP:112,113,211]
(HY 314) <5> (FYS-332) HlektronikA I\fGI [E1] [PROAP:112,113,211]
------------------------------------------------------------------------
Ta antIstoicha mathIImata tou TmIImatos FysikIIs.
------------------------------------------------------------------------
HY 217 <3> PithanOtiites I [PROAP: 111]
HY 317 <3> PithanOtiites I\fGI [PROAP: 217]
------------------------------------------------------------------------
217: BasikII thewrIa pithanotIItwn kai StochastikWn MetabliitWn.
317: ThewrIa stochastikWn anelIxewn kai efarmogEs se epexergasIa sii-
mAtwn, epikoinwnIes, thewrIa anamonIIs, epicheiriisiakII 'ereuna.
------------------------------------------------------------------------
(HY 119A)<3> AgglikA I
(HY 119B)<3> AgglikA I\fGI
(HY 219A)<3> AgglikA I\fGI\fGI
(HY 219B)<3> AgglikA I\fLV\fG
------------------------------------------------------------------------
EntatikA mathIImata AgglikWn. H glWssa autII eInai aparaItiitii pro:y:pO-
thesii giA tis parapEra spoudEs H/Y. 'Osoi xEroun 'iidii (merikA) AgglikA
mporoUn na pernoUn tis antIstoiches exetAseis chwrIs parakoloUthiisii.
- 5 - (Propt.Pr.Sp.84-85)
SEIRA 20 - 39 : MATHIIMATA TOMEA ARCHITEKTONIKIIS.
------------------------------------------------------------------------
HY 120 <5> PsiifiakII SchedIasii
------------------------------------------------------------------------
BasikII HlektronikII. LogikEs pYles kai iilektronikII pragmatopoIhsII
toys. SyndyastikA kyklWmata. FlIp-FlOp. AkoloythiakA kyklWmata. Mii-
chanEs peperasmEnwn katastAsewn. (ErgastiiriakO mAthiima).
------------------------------------------------------------------------
HY 220 <5> ProgrammatismOs \fLAssembly\fG
[HY 221] <4> ArchitektonikII H/Y, Gl. \fLAssembly\fG [AN-foit.ALLWN Tm. MONO]
------------------------------------------------------------------------
DomII kai leitoyrgIa ypologistII se epIpedo glWssas miichanIIs. GlWssa
\fLAssembly\fG. DiakopEs. \fLVirtual memory\fG. (ErgastiiriakO mAthiima).
221: MiA morfII tou HY-220 eidikA prosarmosmEnii kai apeuthynOmenii se
foitiitEs 'allwn TmiimAtwn mOno. PerissOterii 'emfasii sta genikA thE-
mata architektonikIIs, kai ligOterii se leptomEreies.
------------------------------------------------------------------------
HY 230 <5> OrgAnwsii YpologistWn [PROAP: 120, 220]
------------------------------------------------------------------------
PragmatopoIhsii twn ypologistWn 'opws perigrAfontai sto HY 220, me ta
kyklWmata poy perigrAfontai sto HY 120. (SchediastikII ergasIa se chartI,
'h kai pithanA me boIItheia systIImatos \fLCAD\fG, kai pithanII ergastiiriakII kata-
skeuII).
------------------------------------------------------------------------
HY 320 <4> PsiifiakEs EpikoinwnIes [PROAP: 120, 220]
------------------------------------------------------------------------
PSiifiakA sIImata, grammEs, prwtOkolla chamiiloY epipEdoy. S'yndesii
termatikWn kai perifereiakWn monAdwn me ypologistEs. S'ygchronii kai
asYgchronii epikoinwnIa.
------------------------------------------------------------------------
HY 420 <4> D'iktya YpologistWn [E2] [PROAP: 250, 320]
------------------------------------------------------------------------
TopikA kai genikA dIktya. \fLPacket switching\fG. PrwtOkolla epikoinwnIas.
------------------------------------------------------------------------
HY 430 <4> ArchitektonikII YpologistWn [E2] [PROAP: 230, 340]
------------------------------------------------------------------------
H architektonikII \fLvon Neumann\fG. DiAfora sYnola entolWn, \fLaddressing
modes, instruction formats\fG, kai melEtii twn ypEr kai twn katA kAthe
styl. \fLPipelining\fG. MnIImes \fLcache\fG. ArchitektonikEs giA tiin ypostIIrixii
glwssWn psiiloU epIpedou kai leitourgikWn systiimAtwn. (ProchwriimEno
proptychiakO / chamiilO metaptychiakO mAthiima).
- 6 - (Propt.Pr.Sp.84-85)
SEIRA 40 - 59 : MATHIIMATA TOMEA PROGRAMMATISMOY.
------------------------------------------------------------------------
HY 140 <5> ProgrammatismOs
------------------------------------------------------------------------
SchedIasii, ylopoIhsii, diOrthwsii kai tekmiirIwsii domiimEnwn (\fLstructured\fG)
programmAtwn. (ErgastIIrio p.ch. me \fLPascal\fG se proswpikoUs ypologistEs).
------------------------------------------------------------------------
HY 240 <5> DomEs DedomEnwn [PROAP: 140]
------------------------------------------------------------------------
P'inakes, l'istes, swroI, ourEs, dEndra, grAfoi, archeIa, diasporA.
TaxinOmiisii kai aneYresii. (ErgastIIrio p.ch. me \fLC\fG).
------------------------------------------------------------------------
HY 250 <5> LeitourgikA SystIImata [PROAP: 240]
------------------------------------------------------------------------
PerigrafII diadikasiWn leitoyrgikoY systIImatos kai ylopoIhsII toys.
PyrIInas, sygchronismOs, AxiolOgiisii apOdosiis systiimAtwn. (ErgastII-
rio me \fLUNIX\fG kai \fLC\fG).
------------------------------------------------------------------------
HY 340 <5> GlWsses kai MetafrastEs (\fLCompilers\fG) [PROAP: 240, 280]
------------------------------------------------------------------------
DedomEna kai 'elegchos. OnOmata kai parAmetroi. MetAfrasii kai ektEle-
sii. LektikII kai syntaktikII anAlysii. YlopoIhsii peribAllontos ek-
tElesiis. (\fLLex, Yacc, C\fG).
------------------------------------------------------------------------
HY 350 <5> ArcheIa kai B'aseis DedomEnwn [PROAP: 250]
------------------------------------------------------------------------
MontElla schediasmoY dedomEnwn. GlWsses aneYresiis. M'ethodes prospE-
lasiis. SchedIasii bAsewn dedomEnwn. \fL(Pfs-file, MRS)\fG.
------------------------------------------------------------------------
HY 440 <4> TechnologIa \fLSoftware\fG [E2] [PROAP: 340]
------------------------------------------------------------------------
MethodologIes domiimEnoy programmatismoY kai programmatismoY megAliis
klImakas. AnAlysii kai tekmiirIwsii \fLsoftware\fG. OloklIIrwsii \fLsoftware\fG.
- 7 - (Propt.Pr.Sp.84-85)
SEIRA 60 - 79 : MATHIIMATA TOMEA EFARMOGWN.
------------------------------------------------------------------------
HY 360 <5> GrafikII [PROAP: 240]
------------------------------------------------------------------------
\fLBit-mapped graphics\fG kai \fLuser-interfaces (icons, windows)\fG. YpologistikII
gewmetrIa.
------------------------------------------------------------------------
HY 368 <4> EpicheiriisiakII 'Ereuna [PROAP: 215, 217]
------------------------------------------------------------------------
EisagwgII stii diamOrfwsii probliimAtwn, kataskeuII protYpwn, technikEs
tiis EE. GrammikOs programmatismOs. AnAlysii diktYwn. AkEraios kai
miktOs programmatismOs. AkolouthiakEs apofAseis -- dynamikOs program-
matismOs. ChronikOs programmatismOs (\fLscheduling\fG). ProsomoIwsii (grafi-
kII, dialogikII).
------------------------------------------------------------------------
HY 370 <4> PsiifiakII EpexergasIa SiimAtwn I [PROAP:211,215,317]
------------------------------------------------------------------------
ThewrIa grammikIIs psiifiakIIs epexergasIas siimAtwn \fL(DSP)\fG. MetatropII
synechWn siimAtwn se diakritA siimata (deigmatoleipsIa, kbantismOs, kai
thOrybos). AnaparagwgII synechWn siimAtwn apO diakritA deIgmata (\fLD/A
conversion, interpolation, estimation\fG, klp.). ThewrIa metaschiimatismoU-\fLz\fG.
AnAlysii kai schedIasii psiifiakWn fIltrwn. O GrIIgoros Metaschiimati-
smOs FouriE \fL(FFT)\fG. (ErgasIes \fLDSP\fG kai schedIasiis fIltrwn ston H/Y).
------------------------------------------------------------------------
HY 460 <4> TechniitII No\fGiimosYnii [E2] [PROAP: 240]
------------------------------------------------------------------------
MethodologIa kai technikEs techniitIIs nohmosYniis (\fLAI\fG). B'aseis gnWsewn.
SystIImata eidikWn \fL(expert systems). (Lisp \fG'h\fL Smalltalk)\fG.
------------------------------------------------------------------------
HY 470 <4> PsiifiakII EpexergasIa SiimAtwn I\fGI [E2] [PROAP: 370]
------------------------------------------------------------------------
TechnikEs psiifiakIIs epexergasIas siimAtwn pou chriisimopoioUntai se
diAfores periochEs, 'opws epexergasIa fwnIIs, seismologIa, iatrikII, oi-
konomikA, klp. DiakritOs metaschiimatismOs FouriE, fasmatikII ektImii-
sii, anIchneusii kai ektImiisii siimAtwn se thOrybo, \fLsystem modeling\fG.
------------------------------------------------------------------------
HY 471 <4> EpexergasIa EikOnwn [E2] [PROAP: 370]
------------------------------------------------------------------------
EpexergasIa siimAtwn eikOnwn. AnAlysii kai katharismOs eikOnwn.
- 8 - (Propt.Pr.Sp.84-85)
SEIRA 80 - 99 : MATHIIMATA TOMEA THEWRIAS.
------------------------------------------------------------------------
HY 280 <4> ThewrIa YpologismWn [PROAP: 110]
------------------------------------------------------------------------
AytOmata, glWsses, ypologismoI. BasikA montElla PliiroforikIIs.
------------------------------------------------------------------------
HY 380 <4> AlgOrithmoi kai PolyplokOtiita [PROAP: 280]
------------------------------------------------------------------------
ArchEs anAlysiis kai schedIasiis algorIthmwn. AlgOrithmoi gia taxinOmiisii,
grAfoys, epexergasIa siimAtwn, epexergasIa keimEnwn kai gewmetri-
kWn eikOnwn.
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HY 480 <4> ThewrIa KwdIkwn kai KryptografIa [E2] [PROAP: 315, 317]
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ThewrIa kwdIkwn (kwdikopoIhsii kai apokwdikopoIhsii kwdIkwn-mplOk kai
aneliktikWn kwdIkwn). EfarmogEs kwdIkwn se ypologistEs kai tiilepikoi-
nwnIes. BasikII thewrIa kryptografIas kai efarmogEs.
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