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nonreconstructible

Nonreconstructible is an adjective used in mathematics and related fields to describe an object that cannot be uniquely determined from a specified set of derived data, up to an appropriate notion of equivalence. It is commonly encountered in reconstruction problems, where the goal is to recover the original object from partial or indirect observations.

In graph theory, the term arises in the context of the reconstruction problem. A graph is said

No nonreconstructible graphs are currently known, and discovering one would disprove the conjecture. Researchers have established

Beyond graphs, nonreconstructible describes situations in fields such as tomography, crystallography, and signal processing, where incomplete

See also: graph reconstruction conjecture; deck of a graph; isomorphism.

to
be
reconstructible
from
its
deck,
the
multiset
of
all
vertex-deleted
subgraphs,
if
any
other
graph
with
the
same
deck
is
isomorphic
to
it.
A
graph
that
is
not
uniquely
determined
by
its
deck
would
be
nonreconstructible.
The
Reconstruction
Conjecture
posits
that
every
finite
simple
graph
with
at
least
three
vertices
is
reconstructible;
the
conjecture
remains
open,
with
no
general
proof
or
disproof
known.
reconstructibility
for
many
specific
graph
families
and
have
performed
computational
checks
for
graphs
up
to
certain
sizes,
but
a
universal
resolution
remains
elusive.
The
term
also
appears
in
related
contexts
where
a
structure
cannot
be
uniquely
recovered
from
partial
measurements
or
projections,
reflecting
a
broader
theme
in
data
reconstruction.
or
limited
data
prevents
unique
recovery
of
the
original
object.
The
concept
serves
to
distinguish
cases
where
reconstruction
is
theoretically
possible
from
those
where
data
insufficiency
leads
to
ambiguity.