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screwdetermines

Screwdetermines is a term used in screw theory to describe a class of algebraic invariants derived from sets of screws, which are twists or wrenches represented in Plücker coordinates. The concept provides a compact way to capture linear dependencies and compatibility conditions among multiple screws in a rigid body system.

Construction and interpretation: Given a collection of n screws s_i, each represented by a Plücker coordinate

Properties: Screwdetermines are invariant under rigid motions up to sign and scale. They reflect the geometric

Applications: In robotics and mechanism analysis, screwdetermines can be used to assess the independence of a

See also: Screw theory, Plücker coordinates, twists, wrensches, determinants.

pair
(ω_i,
v_i)
in
six
dimensions,
form
a
6×n
matrix
M
whose
columns
are
the
coordinates
[ω_i;
v_i].
The
screwdetermines
are
defined
as
the
maximal
minors
of
M,
i.e.,
the
determinants
det(M_J)
for
all
6-element
subsets
J
of
{1,...,n}.
A
nonzero
minor
indicates
a
set
of
screws
that
is
linearly
independent
in
the
screw
space,
while
a
zero
minor
signals
a
dependence
among
the
corresponding
screws.
These
invariants
are
homogeneous
and
scale
appropriately
with
the
screw
coordinates.
compatibility
of
the
screws
with
respect
to
a
chosen
reference
frame.
Because
the
construction
uses
Plücker
coordinates,
the
invariants
respect
the
projective
nature
of
screw
representations.
However,
for
sets
with
fewer
than
six
screws,
the
minors
may
be
underdetermined,
and
the
interpretation
focuses
on
relations
among
larger
subcollections.
set
of
screw
motions
or
forces,
identify
overconstrained
configurations,
and
aid
in
kinematic
synthesis.
They
offer
a
compact
algebraic
tool
to
detect
potential
singularities
or
redundancy
in
a
system’s
motion-planning
or
force-closure
analysis.