-
arise in
tessarines,
inspiring him to use the term "impossibles". The
tessarines are now best
known for
their subalgebra of real
tessarines t = w + y...
- theory. In the
nineteenth century,
number systems called quaternions,
tessarines, coquaternions, biquaternions, and
octonions became established concepts...
-
original vector algebras of the
nineteenth century,
including Quaternions Tessarines Coquaternions Biquaternions Hyperbolic quaternions This disambiguation...
-
recounted by
Michael J.
Crowe in A
History of
Vector Analysis. Soon after,
tessarines and
coquaternions were
introduced as
other four-dimensional
algebras over...
- split-complex
numbers dates back to 1848 when
James ****le
revealed his
tessarines.
William Kingdon Clifford used split-complex
numbers to
represent sums...
- octonions, and Gr****man
introduced exterior algebras.
James ****le
presented tessarines in 1848 and
coquaternions in 1849.
William Kingdon Clifford introduced...
-
example split-complex
numbers or split-quaternions. It was the
algebra of
tessarines discovered by
James ****le in 1848 that
first provided hyperbolic versors...
-
fields Fundamental theorem of
Riemannian geometry Fundamental theorem of
tessarine algebra Fundamental theorem of
symmetric polynomials Fundamental theorem...
- ⊕ C {\displaystyle \mathbf {C} \oplus \mathbf {C} } is the
algebra of
tessarines introduced by
James ****le in 1848. H ⊕ H , {\displaystyle \mathbf {H}...
-
scientific investigations. For
instance he
invented the
number systems of
tessarines and coquaternions, and
worked with
Arthur Cayley (1821–1895) on the theory...
