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Banach

Banach is a surname of Polish origin most associated with Stefan Banach (1892–1945), a leading mathematician and one of the founders of functional analysis. A central member of the Lwów School of Mathematics, Banach contributed to the development of modern analysis while working at the University of Lwów and with colleagues such as Hugo Steinhaus and Stanisław Ulam. His work helped formalize the theory of infinite-dimensional spaces and operators.

Many fundamental objects and results in functional analysis bear his name. A Banach space is a complete

In set-theoretic geometry, Banach is also associated with the Banach–Tarski paradox, proven with Alfred Tarski, which

normed
vector
space,
the
natural
setting
for
analysis
in
infinite
dimensions.
The
Banach
fixed-point
theorem
provides
conditions
under
which
a
contraction
on
a
complete
metric
space
has
a
unique
fixed
point,
with
numerous
applications.
Banach
also
helped
develop
the
theory
of
Lp
spaces
and
Banach
algebras
in
functional
analysis.
The
Banach–Steinhaus
theorem
(Uniform
Boundedness
Principle)
and
the
Banach–Mazur
distance
are
named
after
him
and
his
collaborators.
He
coauthored
work
with
Steinhaus
that
contributed
to
the
Banach–Steinhaus
theorem,
and
his
collaboration
with
the
Lwów
School
helped
established
many
foundational
results.
states
that
a
solid
ball
in
three-dimensional
space
can
be
partitioned
and
reassembled
into
two
identical
copies
of
the
original
ball,
using
the
axiom
of
choice.
Banach’s
work
and
the
Lwów
School
had
a
lasting
influence
on
analysis
and
functional
analysis
worldwide.