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In abstract algebra, the free monoid on a set is the monoid whose elements are all the finite sequences (or strings) of zero or more elements from that set, with string concatenation as the monoid operation and with the unique sequence of zero elements, often called the empty string and denoted by ε or λ, as the identity element.
The most general setting for a free object is in category theory, where one defines a functor, the free functor, that is the left adjoint to the forgetful functor. Consider a category C of algebraic structures ; the objects can be thought of as sets plus operations, obeying some laws.
This monoid is denoted Σ ∗ and is called the free monoid over Σ. It is not commutative if Σ has at least two elements. Given any monoid M, the opposite monoid M op has the same carrier set and identity element as M, and its operation is defined by x • op y = y • x. Any commutative monoid is the opposite monoid of itself.
In mathematics, it is more commonly known as the free monoid construction. The application of the Kleene star to a set V {\\displaystyle V} is written as V ∗ {\\displaystyle V^{*}} . It is widely used for regular expressions , which is the context in which it was introduced by Stephen Kleene to characterize certain automata , where it means ...
The July massacre, which took place during the Student–People's uprising, resulted in significant casualties, including protesters, opposition members, and civilians.. The mass killing occurred under the Sheikh Hasina government and involved law enforcement agencies like the Police and RAB, along with participation from the Awami League's student wing, Chhatra League, youth wing, Jubo League ...
The monoid is then presented as the quotient of the free monoid (or the free semigroup) by these relations. This is an analogue of a group presentation in group theory. As a mathematical structure, a monoid presentation is identical to a string rewriting system (also known as a semi-Thue system). Every monoid may be presented by a semi-Thue ...
The syntactic monoid is the group of order 2 on {,}. [9] For the language (+), the minimal automaton has 4 states and the syntactic monoid has 15 elements. [10] The bicyclic monoid is the syntactic monoid of the Dyck language (the language of balanced sets of parentheses).
In concise terms, a monad is a monoid in the category of endofunctors of some fixed category (an endofunctor is a functor mapping a category to itself). According to John Baez, a monad can be considered at least in two ways: [1] A monad as a generalized monoid; this is clear since a monad is a monoid in a certain category,