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Numerical integration and parallel microprocessors systems
NDHERICAL
RJTRGRATIoeJ AND PARALLZL HICROPROCRSSORS
‘)
Kwwskf
Siri
Abstraot:
Imsrioal
solution
the regicms, where toaow,
-
equations
digital systems represent
neither
optimum method for an extremely equatiaps
oaa be obtained by mesns
of parallel nioroprooessors.
Stiff systems, equations, problems
preoise
preoise auwrioal
of ordinary differential
differential
one of
repressnts
has not been prwided
yet. Up aor
spee-
- for suoh a kind of oomputations.
osmputers
A new
of differential
optimum user's oafort
oaPfemporary
dy enou&
SYSTMS
is presented. Eigh-spssd
partial differential
equatiam,
geaeratiop
systems
equations,
of algebra10
of funotions,
strmg
nonlinear
and transoeadeatal
linear and nonlinear
of oaxtrol have been suooessfully
solutim
operations
progrraimg,
solved and sLUrted
by the
given method. Key
words:
-A,
RQM%RICAL
TAYLOR'S
1. Nwerioal
PARALI2L WICROPROCRSSORS,
DIFFZRXXTIAL
of aumerioal
solution
EULER, RUNGE
EQUATIm
of ordinary differential
solution
Methods analyasd
INTEGRATION,
EXPARSIUN,
equatims
of differential
equations
were
in detail by Rrolge snd Kutta a& the end of the last osntury.
A lot of aey asettmds for ths aumerioal
solution
of differential
equations have been published sinoe. We have had sme-step -Kutta, Taylor)
and multi-step
.
(Euler, Rungs-
(sxplioit and implioit) methods at our
disposal. The aumerioal at our dspartnnt ooopsratiax. equations
possibility
solution a)
espsoially
of differential with respsot
equations
to parallel
Ve have found that the aumsrioal
represents
operations arwrioal
solution
a very attraotive
of starting and oompating independent
solution system
b) systr
almritim,
of differential
the 8-0,
wbioh gives us a shsoltamestm,
equatiam
Parallel
that the
must be divided
into the
systems:
of hsmo~ous
osmstant
qioroprooessor
soluficm
of eaoh other. It has been prwed
of differsatial
of two follow*
has bsea aaalyasd
lhear
differential
equatiam
with
owffioisnts
of asmljnoar
1) J.RmoIsIf,TBcHRIcAL 612 66 BBIO, &JR
differential
DBITERSITI,
lqaatiolls
DEP. OF CONPUTBRS,
BO&'i!CEOVA
2
453
2. System
of homogenou8
linear differential
equationm
with oon8tmt
ooeffioiant8 lolutian
Analytio oaastant
oo8ffioient8
numerioal
of homogenou8
linear differential
8olution ha8 not been malyzed
It wa8 just the numerioal tial 8quatian8 department
with oaa8tant
that prwided
ooeffioient8
th8 lsthudology
we oarvfully
analyzed at our for the realiza-
parallel operatiau
oaloulaticmo
8imulfanoou8ly
to determine
a new (next) value of 8olutiam
Rung8=Kutta,
3. Sy8tem
intogratiun Hilne)
to Taylor.8
of nonlinear
The 8olution
method
independent
M
initial oonditiap8) in aooordanoe
ntrerioal
oan be generalized expa~ion
of eaoh
of how to *tart and how
with a
(again 8imultaneou8ly integrati~
in leprrrte (Euler,
- the g8neralization
method.
differential
equation8
of a 8y8t8m of nonlinear
not been eatiafaotory method8
the give
All the algoritln8
Adam,
lead8 direotly
(fra
linear diff8r8n-
and prinoipl8
other. The nrplerioal lolufiar grvo ~8 the methodology
qioroprooe88oro).
with
in great detail yet.
lolution of homogenou8
tiaDl of the 8am0, 8imultaneou8,
suitable numerioal
equatioP8
ha8 b88n well known for a long time. That i8 why
differential
equatiaao hao
obtained yet. That i8 why a lot o@ numerioal
eriat.
It ha8 been przv8d again that, when 8olving a 8y8fr differential oooperation
equatiolu,
the ba8io problem of parallel mioroprooe88or
oau be 8olved by m8ak
tranofoxmation
of a lpeoial
(not oaplioated)
of a giv8n 8j8t8m. The tran8formatiar
generally noprutamomou8
of nonlinear
oonv8rt8 a
8y8tem Y'S f (t, Y)
to an autanamoua
ome with the 8p8oial form of z't F (z)
The tran8forration differential
i8 based on a 8yotem of 80 oalled goaerating
equaticm8.
4.sumary Colrorefe reoulf8 the leotur8.
Moreover,
(gfving aoouraoy aud th8 hardvare
ayetom will be di8ouo8ed.
lpood)
willb8
moonted
of a parallel nioroprooe88or
in
RJTRGRATIoeJ AND PARALLZL HICROPROCRSSORS
‘)
Kwwskf
Siri
Abstraot:
Imsrioal
solution
the regicms, where toaow,
-
equations
digital systems represent
neither
optimum method for an extremely equatiaps
oaa be obtained by mesns
of parallel nioroprooessors.
Stiff systems, equations, problems
preoise
preoise auwrioal
of ordinary differential
differential
one of
repressnts
has not been prwided
yet. Up aor
spee-
- for suoh a kind of oomputations.
osmputers
A new
of differential
optimum user's oafort
oaPfemporary
dy enou&
SYSTMS
is presented. Eigh-spssd
partial differential
equatiam,
geaeratiop
systems
equations,
of algebra10
of funotions,
strmg
nonlinear
and transoeadeatal
linear and nonlinear
of oaxtrol have been suooessfully
solutim
operations
progrraimg,
solved and sLUrted
by the
given method. Key
words:
-A,
RQM%RICAL
TAYLOR'S
1. Nwerioal
PARALI2L WICROPROCRSSORS,
DIFFZRXXTIAL
of aumerioal
solution
EULER, RUNGE
EQUATIm
of ordinary differential
solution
Methods analyasd
INTEGRATION,
EXPARSIUN,
equatims
of differential
equations
were
in detail by Rrolge snd Kutta a& the end of the last osntury.
A lot of aey asettmds for ths aumerioal
solution
of differential
equations have been published sinoe. We have had sme-step -Kutta, Taylor)
and multi-step
.
(Euler, Rungs-
(sxplioit and implioit) methods at our
disposal. The aumerioal at our dspartnnt ooopsratiax. equations
possibility
solution a)
espsoially
of differential with respsot
equations
to parallel
Ve have found that the aumsrioal
represents
operations arwrioal
solution
a very attraotive
of starting and oompating independent
solution system
b) systr
almritim,
of differential
the 8-0,
wbioh gives us a shsoltamestm,
equatiam
Parallel
that the
must be divided
into the
systems:
of hsmo~ous
osmstant
qioroprooessor
soluficm
of eaoh other. It has been prwed
of differsatial
of two follow*
has bsea aaalyasd
lhear
differential
equatiam
with
owffioisnts
of asmljnoar
1) J.RmoIsIf,TBcHRIcAL 612 66 BBIO, &JR
differential
DBITERSITI,
lqaatiolls
DEP. OF CONPUTBRS,
BO&'i!CEOVA
2
453
2. System
of homogenou8
linear differential
equationm
with oon8tmt
ooeffioiant8 lolutian
Analytio oaastant
oo8ffioient8
numerioal
of homogenou8
linear differential
8olution ha8 not been malyzed
It wa8 just the numerioal tial 8quatian8 department
with oaa8tant
that prwided
ooeffioient8
th8 lsthudology
we oarvfully
analyzed at our for the realiza-
parallel operatiau
oaloulaticmo
8imulfanoou8ly
to determine
a new (next) value of 8olutiam
Rung8=Kutta,
3. Sy8tem
intogratiun Hilne)
to Taylor.8
of nonlinear
The 8olution
method
independent
M
initial oonditiap8) in aooordanoe
ntrerioal
oan be generalized expa~ion
of eaoh
of how to *tart and how
with a
(again 8imultaneou8ly integrati~
in leprrrte (Euler,
- the g8neralization
method.
differential
equation8
of a 8y8t8m of nonlinear
not been eatiafaotory method8
the give
All the algoritln8
Adam,
lead8 direotly
(fra
linear diff8r8n-
and prinoipl8
other. The nrplerioal lolufiar grvo ~8 the methodology
qioroprooe88oro).
with
in great detail yet.
lolution of homogenou8
tiaDl of the 8am0, 8imultaneou8,
suitable numerioal
equatioP8
ha8 b88n well known for a long time. That i8 why
differential
equatiaao hao
obtained yet. That i8 why a lot o@ numerioal
eriat.
It ha8 been przv8d again that, when 8olving a 8y8fr differential oooperation
equatiolu,
the ba8io problem of parallel mioroprooe88or
oau be 8olved by m8ak
tranofoxmation
of a lpeoial
(not oaplioated)
of a giv8n 8j8t8m. The tran8formatiar
generally noprutamomou8
of nonlinear
oonv8rt8 a
8y8tem Y'S f (t, Y)
to an autanamoua
ome with the 8p8oial form of z't F (z)
The tran8forration differential
i8 based on a 8yotem of 80 oalled goaerating
equaticm8.
4.sumary Colrorefe reoulf8 the leotur8.
Moreover,
(gfving aoouraoy aud th8 hardvare
ayetom will be di8ouo8ed.
lpood)
willb8
moonted
of a parallel nioroprooe88or
in