share
13 ÁÕ¹Ò¤Á 2021, 11:02
is a problem of finding the conditions that two functions
forming profiles of a two-dimensional mountain must satisfy,
so that two climbers can start on the bottom on the opposite sides of the mountain
and coordinate their movements to meet (possibly at the top)
while always staying at the same height.
This problem was named and posed in this form by James V. Whittaker (1966),
but its history goes back to Tatsuo Homma (1952), who solved a version of it.
The problem has been repeatedly rediscovered and solved independently in different context
by a number of people
In the past two decades the problem was shown to be connected to
the weak Fréchet distance of curves in the plane,[1]
various planar motion planning problems in computational geometry,[2]
the inscribed square problem,[3]
semigroup of polynomials,[4] etc.
The problem was popularized in the article by Goodman, Pach & Yap (1989),
which received the Mathematical Association of America's Lester R. Ford Award in 1990.[5]
forming profiles of a two-dimensional mountain must satisfy,
so that two climbers can start on the bottom on the opposite sides of the mountain
and coordinate their movements to meet (possibly at the top)
while always staying at the same height.
This problem was named and posed in this form by James V. Whittaker (1966),
but its history goes back to Tatsuo Homma (1952), who solved a version of it.
The problem has been repeatedly rediscovered and solved independently in different context
by a number of people
In the past two decades the problem was shown to be connected to
the weak Fréchet distance of curves in the plane,[1]
various planar motion planning problems in computational geometry,[2]
the inscribed square problem,[3]
semigroup of polynomials,[4] etc.
The problem was popularized in the article by Goodman, Pach & Yap (1989),
which received the Mathematical Association of America's Lester R. Ford Award in 1990.[5]