| Package | Description |
|---|---|
| cc.redberry.rings | |
| cc.redberry.rings.io | |
| cc.redberry.rings.linear | |
| cc.redberry.rings.poly | |
| cc.redberry.rings.poly.multivar | |
| cc.redberry.rings.poly.univar |
| Class and Description |
|---|
| ARing
Abstract ring which holds perfect power decomposition of its cardinality.
|
| ChineseRemainders.ChineseRemaindersMagic
Magic data to make CRT faster via precomputing Bezout coefficients
|
| ChineseRemainders.ChineseRemaindersMagicZp64 |
| FactorDecomposition
Factor decomposition of element.
|
| Integers
The ring of integers (Z).
|
| IntegersZp
Ring of integers modulo some
modulus. |
| IntegersZp64
Zp ring over machine numbers which provides fast modular arithmetic.
|
| Rational |
| Rationals
The ring of rationals (Q).
|
| Ring
Ring of elements.
|
| Class and Description |
|---|
| Rational |
| Rationals
The ring of rationals (Q).
|
| Ring
Ring of elements.
|
| Class and Description |
|---|
| IntegersZp64
Zp ring over machine numbers which provides fast modular arithmetic.
|
| Ring
Ring of elements.
|
| Class and Description |
|---|
| ARing
Abstract ring which holds perfect power decomposition of its cardinality.
|
| FactorDecomposition
Factor decomposition of element.
|
| ImageRing
A ring obtained via isomorphism specified by
ImageRing.image(Object) and ImageRing.inverse(Object) functions. |
| Rational |
| Ring
Ring of elements.
|
| Class and Description |
|---|
| IntegersZp64
Zp ring over machine numbers which provides fast modular arithmetic.
|
| Rational |
| Ring
Ring of elements.
|
| Class and Description |
|---|
| ChineseRemainders.ChineseRemaindersMagic
Magic data to make CRT faster via precomputing Bezout coefficients
|
| IntegersZp
Ring of integers modulo some
modulus. |
| IntegersZp64
Zp ring over machine numbers which provides fast modular arithmetic.
|
| Rational |
| Ring
Ring of elements.
|
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