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2. Zero element - Wikipedia

   en.wikipedia.org/wiki/Zero_element

   In mathematics, the zero ideal in a ring is the ideal {} consisting of only the additive identity (or zero element). The fact that this is an ideal follows directly from the definition. The fact that this is an ideal follows directly from the definition.

3. Null (mathematics) - Wikipedia

   en.wikipedia.org/wiki/Null_(mathematics)

   In set theory, the empty set, that is, the set with zero elements, denoted "{}" or "∅", may also be called null set. [3] [5] In measure theory, a null set is a (possibly nonempty) set with zero measure. A null space of a mapping is the part of the domain that is mapped into the null element of the image (the inverse image of the null element).

4. Absorbing element - Wikipedia

   en.wikipedia.org/wiki/Absorbing_element

   The most well known example of an absorbing element comes from elementary algebra, where any number multiplied by zero equals zero. Zero is thus an absorbing element. The zero of any ring is also an absorbing element. For an element r of a ring R, r0 = r(0 + 0) = r0 + r0, so 0 = r0, as zero is the unique element a for which r − r = a for any ...

5. Kernel (algebra) - Wikipedia

   en.wikipedia.org/wiki/Kernel_(algebra)

   For the converse direction, we need the notion of quotient in the Mal'cev algebra (which is division on either side for groups and subtraction for vector spaces, modules, and rings). Using this, elements a and b of A are equivalent under the kernel-as-a-congruence if and only if their quotient a/b is an element of the kernel-as-an-ideal.

6. 0 - Wikipedia

   en.wikipedia.org/wiki/0

   In abstract algebra, 0 is commonly used to denote a zero element, which is the identity element for addition (if defined on the structure under consideration) and an absorbing element for multiplication (if defined). (Such elements may also be called zero elements.) Examples include identity elements of additive groups and vector spaces.

7. Ring (mathematics) - Wikipedia

   en.wikipedia.org/wiki/Ring_(mathematics)

   For any element x in a ring R, one has x0 = 0 = 0x (zero is an absorbing element with respect to multiplication) and (–1)x = –x. If 0 = 1 in a ring R (or more generally, 0 is a unit element), then R has only one element, and is called the zero ring. If a ring R contains the zero ring as a subring, then R itself is the zero ring. [6]

8. Additive inverse - Wikipedia

   en.wikipedia.org/wiki/Additive_inverse

   In mathematics, the additive inverse of an element x, denoted -x, [1] is the element that when added to x, yields the additive identity, 0 (zero). [2] In the most familiar cases, this is the number 0, but it can also refer to a more generalized zero element .

9. Zero object (algebra) - Wikipedia

   en.wikipedia.org/wiki/Zero_object_(algebra)

   Over a commutative ring, a trivial algebra is simultaneously a zero module. The trivial ring is an example of a rng of square zero. A trivial algebra is an example of a zero algebra. The zero-dimensional vector space is an especially ubiquitous example of a zero object, a vector space over a field with an empty basis. It therefore has dimension ...