![]() This symbol takes one argument which should be an Abelian semigroup. It returns a binary function, which should represent the operation of the Abelian semigroup. This Symbol represents the generic category of Abelian semigroup. The Abelian semigroup constructor takes two arguments, the set of the Abelian semigroup and a binary function which represents the operation of the Abelian semigroup. ![]() This symbol is the constructor for an Abelian semigroup, that is a semigroup which has an operator which is commutative over the set of the semigroup. This symbol takes one argument which should be an Abelian monoid, it returns the set of the Abelian monoid. This symbol takes one argument which should be an Abelian monoid, it returns the operation of the Abelian monoid. This symbol takes one argument which should be an Abelian monoid, it returns the identity of the Abelian monoid. This Symbol represents the generic category of Abelian monoid. The Abelian_monoid constructor takes three arguments, the set of the Abelian monoid, a binary function taking two elements of the set into itself to represent the operation of the Abelian monoid and an element of the set to represent the identity of the Abelian monoid. An Abelian monoid is a monoid, such that the operation is commutative between members of the Abelian monoid. This is the constructor for Abelian monoids. This symbol takes one argument which should be an Abelian group. It returns a binary function, which represents the operation of the Abelian group. ![]() It reurns a unary function, which should be the inverse function for the Abelian group. It returns the identity of the Abelian group. This Symbol represents the generic category of Abelian group. The Abelian_group constructor takes four arguments, the set of the Abelian group, a binary function taking two elements of the set into itself to represent the operation of the Abelian group, an element of the set to represent the identity of the Abelian group and a unary function taking the set into itself to specify inverse elements. This symbol is the constructor for Abelian groups, that is a group such that the operation is commutative between members of the group. This symbol represents the set of algebraic numbers.Ī-hypergeometric series reference: authors: "Saito, Sturmfels, Takayama" title: "Grobner Deformations of Hypergeometric Differential Equations" pages: 127 Call to mind creative projects that you wish to guide this energy toward.A combined list of all 1600 symbols defined in this Content Dictionary collection. Now invite the fire of creativity and passion to ignite this space.Build a pile of all the things that you want to release and put them in the fire. Visualize a flame of purification before you.Spin it first counterclockwise to discharge any stagnant or blocked energy, then spin it clockwise to charge your energy centers. Once you feel the alignment and expansion of this activation, visualize a circle within the square.Allow it to wash over you and be absorbed into your organs and every cell in your body. Visualize a channel of white light piercing the tip of the pyramid and flowing into the space that you have created. The apex where these points join represents the ether. Do this by drawing a line from each corner of the square to just above your crown. ![]() Draw (in your mind's eye) four triangles up from the base of your square to complete your pyramid.Set the intention that this square represents the anchor to your physical reality, which will serve to ground the higher frequencies that you are calling in.As you do so, acknowledge the four directions, north, south, east, west, and the four elements, earth, air, fire, and water. In your mind's eye, draw a square on the ground around you.Take six deep breaths in through your nose, drawing the breath down through your spine and up through your solar plexus and heart, out through your mouth.Sit cross-legged with a hand rested on each knee so that you form a pyramid with your body.
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