gyrogroup

As nouns the difference between terms and gyrogroup

is that terms is while gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.

As a noun gyrogroup

is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.

As an adjective gyrocommutative is

(mathematics|of a gyrogroup) whose binary operation obeys a $\backslash oplus$ b = gyr[a, b](b $\backslash oplus$ a).

As nouns the difference between axiom and gyrogroup

is that axiom is axiom while gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.

As nouns the difference between operation and gyrogroup

is that operation is operation (method by which a device performs its function) while gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.

As nouns the difference between binary and gyrogroup

is that binary is (mathematics|computing|uncountable) the bijective base-2 numeral system, which uses only the digits while gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.

As an adjective binary

is being in a state of one of two mutually exclusive conditions such as on or off, true or false, molten or frozen, presence or absence of a signal.

As nouns the difference between groupoid and gyrogroup

is that groupoid is (algebra) a magma: a set with a total binary operation while gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.

In mathematics|lang=en terms the difference between gyrogroup and gyrovector

is that gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors while gyrovector is (mathematics) a type of vector for which addition is defined by a formula that satisfies the axioms for a gyrogroup.

As nouns the difference between gyrogroup and gyrovector

is that gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors while gyrovector is (mathematics) a type of vector for which addition is defined by a formula that satisfies the axioms for a gyrogroup.