Base (module)

The concept of the basis of a module is a generalization of the concept of the basis of a vector space in the mathematical branch of algebra . As with these, a base of a module is defined as a linearly independent generating system; In contrast to vector spaces, however, not every module has a basis.

definition

A system of elements of a module over a ring with one element defines a map ${\ displaystyle \ {x_ {i} \ mid i \ in I \}}$ ${\ displaystyle M}$ ${\ displaystyle R}$

{\ displaystyle \ xi \ colon R ^ {(I)} \ longrightarrow M}

from the direct sum of copies from after that from the illustrations ${\ displaystyle R}$ ${\ displaystyle M}$

{\ displaystyle R \ to M, \ quad 1 \ mapsto x_ {i}}

is induced.

Is injective , it means linearly independent . ${\ displaystyle \ xi}$ ${\ displaystyle \ {x_ {i} \ mid i \ in I \}}$

If surjective , then a generating system is called . ${\ displaystyle \ xi}$ ${\ displaystyle \ {x_ {i} \ mid i \ in I \}}$

If bijective , then a base is called from . ${\ displaystyle \ xi}$ ${\ displaystyle \ {x_ {i} \ mid i \ in I \}}$ ${\ displaystyle M}$

A basis is therefore a linearly independent generating system.

properties

The linear independence of is equivalent to the fact that the 0 can only be represented as the trivial linear combination: ${\ displaystyle \ {x_ {i} \ mid i \ in I \}}$

{\ displaystyle \ sum a_ {i} x_ {i} = 0 \ quad \ Longrightarrow \ quad a_ {i} = 0 \ \ mathrm {f {\ ddot {u}} r \ all} \ i \ in I.}

If a set is linearly dependent, it generally does not follow from this - in contrast to the case of vector spaces - that one of the elements can be represented as a linear combination of the others. This has the following consequences:

In general, a linearly independent subset cannot be added to a basis.
A maximally linearly independent subset is generally not a basis.
A minimal generating system is generally not a basis.

Consider the module as an example : The system {2} is maximally linearly independent, the system {2,3} is a minimal generating system, neither of the two is a basis. ${\ displaystyle \ mathbb {Z}}$ ${\ displaystyle \ mathbb {Z}}$

A module over a ring with a single element has a base if and only if it is free . The term free module is a generalization of the basic existence on modules whose base ring does not necessarily have a single element. Each sub-module of a free module is free again via main ideal rings .

Inductive calculation of a base

If a free module is over a main ideal ring and a sub-module of , then a basis of inductive can be calculated: ${\ displaystyle M}$ ${\ displaystyle R}$ ${\ displaystyle N}$ ${\ displaystyle M}$ ${\ displaystyle N}$

Be a base of , consider . ${\ displaystyle \ {m_ {1}, \ dotsc, m_ {n} \}}$ ${\ displaystyle M}$ ${\ displaystyle N_ {i} = N \ cap \ langle m_ {1}, \ dotsc, m_ {i} \ rangle}$

The ideal is generated by the ring element and it is ${\ displaystyle \ {r \ in R: \ exists m \ in N_ {i + 1} {\ text {with}} m = m '+ r \ cdot m_ {i + 1} {\ text {and}} m '\ in \ langle m_ {1}, \ dotsc, m_ {i} \ rangle \}}$ ${\ displaystyle a_ {i + 1}}$

${\ displaystyle n_ {i + 1} = m '+ a_ {i + 1} \ cdot m_ {i + 1} \ in N_ {i + 1} {\ text {with}} m' \ in \ langle m_ { 1}, \ dotsc, m_ {i} \ rangle}$ ,

then applies . ${\ displaystyle N_ {i + 1} = N_ {i} \ oplus R \ cdot n_ {i + 1}}$

example

Let be a module and the sub-module is defined by . ${\ displaystyle M = \ mathbb {Z} ^ {3} = \ langle (1,0,0), (0,1,0), (0,0,1) \ rangle}$ ${\ displaystyle \ mathbb {Z}}$ ${\ displaystyle N: = \ {z \ in \ mathbb {Z} ^ {3}: 2z_ {1} + 3z_ {2} + 4z_ {3} = 0 \ land 5 {\ text {divides}} z_ {2 } \}}$

A basis of can now be calculated as follows: ${\ displaystyle N}$

{\ displaystyle N_ {1} = N \ cap \ langle (1,0,0) \ rangle = \ {z \ in \ mathbb {Z} ^ {3}: 2z_ {1} = 0 \} = \ {( 0,0,0) \}}

{\ displaystyle N_ {2} = N \ cap \ langle (1,0,0), (0,1,0) \ rangle = \ {z \ in \ mathbb {Z} ^ {3}: 2z_ {1} + 3z_ {2} = 0 \ land 5 \ vert z_ {2} \}}

We are now looking for the smallest positive that satisfies the above equation. ${\ displaystyle z_ {2}}$

${\ displaystyle \ Rightarrow N_ {2} = \ langle (-15,10,0) \ rangle}$

{\ displaystyle N_ {3} = N \ cap \ langle (1,0,0), (0,1,0), (0,0,1) \ rangle = N}

We're looking for the smallest positive that satisfies the equation. ${\ displaystyle z_ {3}}$

${\ displaystyle \ Rightarrow N_ {3} = N_ {2} \ oplus \ langle (-2,0,1) \ rangle}$

We have found a base . ${\ displaystyle N = \ langle (-15,10,0), (- 2,0,1) \ rangle}$

Examples

ℤ as a ℤ module

Let it be the Abelian group of whole numbers as a module over the ring of whole numbers. Then ${\ displaystyle M = \ mathbb {Z}}$

${\ displaystyle \ {2 \}}$ a maximal linearly independent subset, but no generating system.
${\ displaystyle \ {2,3 \}}$ a minimal generating system, but not linearly independent.

The only bases of are and . ${\ displaystyle M}$ ${\ displaystyle \ {1 \}}$ ${\ displaystyle \ {- 1 \}}$

Grid in ℝ ⁿ as a ℤ module

Lattice with basis vectors and

{\ displaystyle b_ {1} = ({\ tfrac {2} {3}}, {\ tfrac {1} {3}})}

{\ displaystyle b_ {2} = ({\ tfrac {1} {3}}, - {\ tfrac {1} {3}})}

Let there be linearly independent vectors of the Euclidean vector space . Then it is called the module ${\ displaystyle b_ {1}, b_ {2}, \ ldots, b_ {m}}$ ${\ displaystyle \ mathbb {R} ^ {n}}$ ${\ displaystyle \ mathbb {Z}}$

{\ displaystyle \ Gamma: = \ langle b_ {1}, \ dots, b_ {m} \ rangle _ {\ mathbb {Z}}: = \ left \ {\ left. \ textstyle \ sum \ limits _ {i = 1} ^ {m} g_ {i} b_ {i} \ \ right | \, g_ {i} \ in \ mathbb {Z} \ right \}}

a lattice with a base of rank . ${\ displaystyle \ {b_ {1}, b_ {2}, \ ldots, b_ {m} \}}$ ${\ displaystyle m}$

Grids in play a central role in the theory of elliptic functions and elliptic curves , grids in are related to complex Tori and Abelian varieties . ${\ displaystyle \ mathbb {C} = \ mathbb {R} ^ {2}}$ ${\ displaystyle \ mathbb {C} ^ {g} = \ mathbb {R} ^ {2g}}$