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dualwert

Dualwert is a term used in theoretical discussions of duality to denote a paired value that combines a primal quantity with its dual counterpart. In this sense, a dualwert summarizes both the original measure and the sensitivity information that accompanies it, often within optimization, economics, and functional analysis.

Etymology: The word combines "dual" with "wert," the German word for value, reflecting the idea of a

Formal framework: Let V be a vector space and V* its dual, with a bilinear pairing ⟨v,

Properties: Dualwerts emphasize the link between primal and dual descriptions, reflecting optimality through conditions such as

Examples and applications: In linear programming, the optimal primal solution x* and the optimal dual solution

Related concepts include duality, shadow price, conjugate function, and sensitivity analysis.

value
and
its
dual
representation.
φ⟩.
A
dualwert
is
a
pair
(v,
φ)
with
v
∈
V
and
φ
∈
V*
that
are
compatible
under
this
pairing
and
record
both
the
primal
quantity
v
and
a
dual
measure
φ.
In
optimization,
v
may
be
a
primal
solution
and
φ
a
dual
variable;
together
they
convey
objective
value
and
marginal
information.
complementarity
and
stability
under
perturbations.
They
are
useful
for
sensitivity
analysis
because
φ
encodes
marginal
values
or
shadow
prices
associated
with
constraints.
y*
form
a
canonical
dualwert
for
the
problem.
In
convex
analysis,
the
gradient
of
a
convex
function
or
a
subgradient
offers
a
dualwert
representation
of
local
behavior
via
the
conjugate
function.