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reconstructibility

Reconstructibility is a property of mathematical objects describing whether the original object can be uniquely determined from a collection of derived data, rather than from direct observation of the object itself. In this sense, an object is reconstructible if its essential structure is identifiable from the related subobjects, invariants, or observations that are systematically related to it.

In graph theory, reconstructibility is most often discussed through the reconstruction problem. For a graph G

Outside graph theory, reconstructibility appears in various disciplines where objects are recovered from partial information. In

Limitations and variations abound. Reconstructibility may depend on the category of objects under consideration, the type

with
vertex
set
V,
its
deck
is
the
multiset
of
graphs
obtained
by
deleting
each
vertex
in
turn
(G
−
v
for
v
in
V),
up
to
isomorphism.
A
graph
is
reconstructible
if
it
is
uniquely
determined,
up
to
isomorphism,
by
its
deck.
The
Reconstruction
Conjecture,
formulated
independently
by
Kelly
and
Ulam
in
1942,
posits
that
every
graph
with
at
least
three
vertices
is
reconstructible.
The
conjecture
remains
open
in
general,
though
many
graph
classes
are
known
to
be
reconstructible,
and
the
deck
often
suffices
to
distinguish
most
graphs
in
practice.
algebra,
model
theory,
and
data
analysis,
one
speaks
of
reconstructing
a
structure
from
substructures,
invariants,
or
partial
measurements.
The
notion
underpins
ideas
of
identifiability
and
data
sufficiency:
what
partial
data
are
needed
to
recover
the
original
object
uniquely?
of
derived
data
allowed,
and
the
notion
of
equivalence
used
(e.g.,
isomorphism).