Uses of Package
org.episteme.core.mathematics.structures.groups
Packages that use org.episteme.core.mathematics.structures.groups
Package
Description
Defines fundamental algebraic concepts:
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.algebraClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.algebra.algebrasClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.algebra.ringsClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.algebra.spacesClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.geometryClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.linearalgebraClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.linearalgebra.matricesClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.linearalgebra.spacesClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.linearalgebra.vectorsClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.numbers.complexClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.numbers.integersClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.numbers.rationalsClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.numbers.realClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.setsClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.structures.groupsClassDescriptionAn abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.Marker interface for elements of a group structure.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.structures.ringsClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.core.mathematics.structures.spacesClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.nativ.mathematics.linearalgebra.matricesClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.nativ.mathematics.linearalgebra.vectorsClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.
-
Classes in org.episteme.core.mathematics.structures.groups used by org.episteme.nativ.mathematics.numbers.realClassDescriptionAn abelian group is a commutative group.An abelian monoid is a commutative monoid.A group is a set with an associative binary operation, an identity element, and inverse elements.A magma is a set equipped with a binary operation.A monoid is a semigroup with an identity element.