Home

ycriteria

Ycriteria is a term used to describe a family of evaluation criteria that are parameterized by a real-valued variable y. In this sense, for each y in a set Y there is a criterion C_y: X → R that assigns a score to each candidate x in a domain X. The collection of these scoring rules is referred to as the ycriteria. The parameter y can encode preferences, risk tolerance, or thresholds, so changing y yields different rankings or selections from the same domain.

Common forms include linear combinations, such as C_y(x) = w1(x) + y·w2(x), where y modulates the relative weight

Properties of interest include monotonicity or continuity in y, which affect the stability of selections as

Applications of ycriteria appear in parameterized model evaluation, decision analysis, and multi-criteria optimization, where different stakeholders

of
two
components.
Another
form
is
loss-plus-penalty,
C_y(x)
=
Loss(x)
+
y·Penalty(x),
with
y
controlling
the
trade-off
between
fidelity
and
complexity.
In
thresholding
scenarios,
y
may
specify
a
probability
or
percentile
whose
associated
criterion
reorders
options.
Analysts
may
study
how
C_y(x)
varies
with
y
to
understand
the
stability
and
sensitivity
of
decisions
across
different
operating
conditions.
y
changes.
If
the
family
is
convex
in
x
for
every
y,
standard
optimization
techniques
can
be
applied;
if
C_y
is
convex
in
y
for
fixed
x,
sensitivity
analysis
becomes
more
straightforward.
or
operating
conditions
require
different
evaluation
emphasis.
They
provide
a
unified
framework
to
compare
alternatives
under
a
continuum
of
criteria
rather
than
a
single
metric.
The
term
is
not
universally
standardized
and
is
often
described
as
describing
a
parametric
evaluation
framework
within
context-specific
literature.