ATP运行出现错误,求大神指导
You lose, fella. The EMTP logic has detected an error condition, and is now going to terminate program execution.The followingmessage summarizes the circumstances leading to this situation.Where an otherwise-unidentified data card is referred to, or where
the "last" card is mentioned, it is the most recently read card of the input data that is meant.The 80-column image of this card
is generally the last one printed out prior to this termination message.But possibly this last-read card has not yet been
displayed, so a copy follows:
" "
KILL code number Overlay number Nearby statement number
1 13 8109
KILL = 1. Storage exceeded for EMTP List Number 8. See the dimensioned limit in the case-summary statistics below.The problem
is simply too big for the program as currently dimensioned.Yet, do not forget dynamic dimensioning as described in the Oct., 1993,
newsletter. In this case,editLISTSIZE.DAT to increase table sizes,and then try again. Of course, such dynamic expansion is
possible only within limits fixed byLISTSIZE.BPA(used by variable-dimensioning program"VARDIM"as ATP is to be linked).
Sometimes the reason for EMTP table overflow is unclear, and Program Maintenance might wish to inspect the contents of the error
interface vectorsLSTATandFLSTAT. These now follow. First comesLSTAT,using (12I10) encoding; then comesFLSTAT,
using (8E15.6) encoding:
LSTAT = -9999 -9999 -9999 -9999 -9999 -9999 -9999 -9999 -9999 -9999 10 80
LSTAT = 323 0 -9999 8 324 0 8109 -9999 116 155 323 7
FLSTAT = 1.562500E-02 1.562500E-02 7.812500E-02 7.812500E-02 0.000000E+00 0.000000E+00 0.000000E+00 0.000000E+00
FLSTAT = 0.000000E+00 0.000000E+00 0.000000E+00 5.000000E+01 6.000000E+01 0.000000E+00 0.000000E+00 0.000000E+00
FLSTAT = 0.000000E+00 0.000000E+00 0.000000E+00 0.000000E+00 0.000000E+00 0.000000E+00 0.000000E+00 0.000000E+00
Yet maybe the user would like some suggestions as to why the table in question(List Number 8 )has overflowed. If such further
information is available,it will now follow immediately ....
List 8 stores past history points for distributed-parameter transmission circuits (lines or cables) in modal form. Each
propagation mode requires storage, and there are as many modes as there are coupled conductors or phases (e.g., a double-circuit
line will normally have 6 modes).Each mode requires TAU / DELTATentries,where TAU is the modal travel time of the line,
DELTAT is the time-step size,and the division involves integer truncation followed by the addition of unity.
In order to effectively trade memory space among the different EMTP tables (EMTP List Sizes), the user must know how many arrays
(columns) there are in each table.The following tabulation shows the effective multiplicities that are associated with each
independent EMTP List Size (those lists whose lengths are under user control by means of the EMTP variable-dimensioning program
"VARDIM").
-------------1------------------------------------------------------------------------------------------------------------
List Number1 1 2 3 4 5 6 7 8 9101112131415161718192021222324252627
-------------1------------------------------------------------------------------------------------------------------------
Floating Pt. 1 6 5 3 6 112 2 2 8 3 1 4 8 1 2 2 0 6 1 124 2 1 # * 1
Integer 1 4 7 0 2 110 0 011 0 3 0 4 0 0 2 110 2 0 0 0 0 0 0 0
Total 11012 3 8 222 2 219 3 4 412 1 2 116 3 124 2 1 # * 1
-------------1------------------------------------------------------------------------------------------------------------
# --- Used only for virtual computers (Burroughs, PRIME, VAX, Apollo, etc.). Others can ignore this List.
* --- Rather than count List 24 itself,add the value to the floating-pointand total counts for Lists 1 and 6. 乍一看一堆乱码? 你的数据溢出了,需要重新设置一下LISTSIZE.DAT
开始菜单-ATP-ATP Launcher-Tools-Make Tpbig.exe
Change Listsize打勾,然后把第八个值改大一点,然后再运行一遍试一试
我上次遇到过相同的问题,就是这么解决的
https://tech.cepsc.com/thread-85044-1-1.html 回复 3# 螃蟹飞飞
非常感谢,我试了一下,还真是这么回事。多谢了啊! 想请问一下listsize中的参数的修改有什么限制么? 螃蟹飞飞 发表于 2012-12-6 05:04
你的数据溢出了,需要重新设置一下LISTSIZE.DAT
开始菜单-ATP-ATP Launcher-Tools-Make Tpbig.exe
Change ...
data:image/png;base64,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第一行第八个数吗?改成多大合适呢
heshuiniubi 发表于 2012-12-6 12:21
回复 3# 螃蟹飞飞
非常感谢,我试了一下,还真是这么回事。多谢了啊!
具体是哪个数据啊
986305096 发表于 2019-4-2 20:35
具体是哪个数据啊
从第一个数到第八个就好了呀
wangchaoqun 发表于 2019-4-8 22:08
从第一个数到第八个就好了呀
横向数第八个数吗
986305096 发表于 2019-4-12 10:38
横向数第八个数吗
是啊,我修改的就是
页:
[1]
