hello my name is way been done i'm working at his mom for map yes

this test is

under the guidance a professor to being one and the winnie

is small he's engineering score in the model from

i'm glad to give a brief introduction of all work on sports truncation

as these well known

ranking is a kind of evaluation and the one additional information according to certain quite

here

you many khmer at the systems different plunking structures play a very important or in

the formation function and evaluation of human society

and the reflect or the complexity is may contain

is that is to go physics

how to understand the wrong indoors and the power lost in many cases these the

around all the matter

in this work we are interested in the ranking properties of support systems

since the underlining dynamics of the drunk aims bosses terms is relatively simple

competition to reach as high as long as possible

hence the name of competition driven sisters

we collected updater into our spot fear was totally forty data are samples

which include tallies

therefore

table tallies and so on

we first take actually at the cumulative distributions of scores or prize money what difference

was systems

which show or the distributions could be well for at the by the power law

with exponential decay

order to understand this common feature

the proposed a model to simulates the competition process is both systems

the competition is paralyse half of the play your side eliminated actually each wrong

so the k mac please our aim of this model is to decide which player

wins

and record these the way in probability

here where assume that such a probability depends only on the run differs it when

the pair

if the roundy phrase is larger than the chance for the higher ranked player to

waste greater

and this claim has been well supported by the empirical evidence

from tallies

presented on these three

in the form an arrow in probability

if the compare the instruments parameter is larger

is more likely that the higher ground player wins

where is the about mac please arms we can find that the cumulative distributions of

scores from the simulation

indeed to follow the power low with exponential decay

we also checks the dependence of the probability distribution on different parameters

such as a compact instruments parameter lumber turn omens and the number of players

results show that our model for the year the power law with exponential decay if

a large range of these parameters

our come to read the paper for more teeth here's thank you