元となった辞書の項目
Lipschitz condition
noun
(mathematical
analysis)
A
property
which
can
be
said
to
be
held
by
some
point
in
the
domain
of
a
real-valued
function
if
there
exists
a
neighborhood
of
that
point
and
a
certain
constant
such
that
for
any
other
point
in
that
neighborhood,
the
absolute
value
of
the
difference
of
their
function
values
is
less
than
the
product
of
the
constant
and
the
absolute
value
of
the
difference
between
the
two
points.
意味(1)
(mathematical
analysis)
A
property
which
can
be
said
to
be
held
by
some
point
in
the
domain
of
a
real-valued
function
if
there
exists
a
neighborhood
of
that
point
and
a
certain
constant
such
that
for
any
other
point
in
that
neighborhood,
the
absolute
value
of
the
difference
of
their
function
values
is
less
than
the
product
of
the
constant
and
the
absolute
value
of
the
difference
between
the
two
points.