Home

proportionella

Proportionella is a theoretical construct used in mathematics and related disciplines to describe systems in which a set of quantities scales proportionally with a single parameter. The idea centers on maintaining fixed proportions among components as the overall magnitude changes, so that the structure of the system remains constant under scaling.

Formal definition: Let q = (q1, q2, ..., qn) be a vector of nonnegative quantities. The system is

Properties: Proportionella is invariant under uniform scaling of the global parameter t; the ratios qi/qj are

Applications: The notion helps in resource allocation, manufacturing, and economics where maintaining a stable product mix

Relation to other notions: Proportionella generalizes direct proportionality to multi-quantity systems with a fixed composition. It

See also: proportionality, proportional reasoning, scaling, homogeneity, normalization.

proportionella
if
there
exists
a
nonnegative
vector
s
=
(s1,
s2,
...,
sn)
and
a
scalar
t
≥
0
such
that
qi
=
si
t
for
all
i.
The
vector
s
is
called
the
proportion
profile,
and
t
is
the
global
scale.
Equivalently,
all
pairwise
ratios
qi/qj
are
constant
across
the
system,
equal
to
si/sj.
fixed
and
independent
of
t.
The
model
is
homogeneous
of
degree
1,
meaning
that
doubling
t
doubles
every
qi.
The
concept
emphasizes
a
fixed
composition
across
all
components,
with
the
precise
scale
determined
by
t.
or
input
composition
across
different
scales
is
desirable.
In
data
analysis,
proportionella
can
underlie
normalization
schemes
that
preserve
relative
structure.
In
computer
graphics
and
modeling,
it
supports
uniform
scaling
of
multi-component
objects
while
preserving
proportions.
is
related
to
ideas
of
homogeneity
and
scaling,
and
contrasts
with
models
where
components
vary
independently.