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My aim is to create a language that can represent directly all algorithms that can be
discovered.
Currently, my biggest challenge is to improve Egison in order to represent directly
calculations that appear in mathematical physics.
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Pattern-matching against the wider range of data types.
Customizable symbolic computation using Egison pattern-matching.
Tensor index notation in programming.
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The theory for investigating a curved space.
It is easy for us in the 3 dimensional space to recognize a 2 dimensional curved
surface is curved.
How about our world? Is it curved for who can recognize the higher dimensional
space?
https://commons.wikimedia.org/wiki/File:Trian
gles_(spherical_geometry).jpg
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The theory explains the gravity as the curve of 4 dimensional time-space.
https://commons.wikimedia.org/wiki/File:Spacetime_lattice_analogy.svg
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Formulas in Riemannian geometry are represented with partial derivative
operator and tensor index notation.
We can represent both of them concisely in Egison!
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Egison program that represents the above formula
Formula of Riemann curvature tensor~: superscript_: subscript
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Pattern-matching against the wider range of data types.
Customizable symbolic computation using Egison pattern-matching.
Tensor index notation in programming.
16
Pattern-matching against the wider range of data types.
Customizable symbolic computation using Egison pattern-matching.
Tensor index notation in programming.
19
Pattern-matching against the wider range of data types.
Customizable symbolic computation using Egison pattern-matching.
Tensor index notation in programming.
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We can apply Egison pattern-matching
against math expressions.
Math expressions are a multiset of terms.
Terms are a multiset of factors.
Therefore, Egison pattern-matching is
very useful to handle them.
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Pattern-matching against the wider range of data types.
Customizable symbolic computation using Egison pattern-matching.
Tensor index notation in programming.
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We can use tensor index notation to multiply any order of tensors.
The tensor index notation is necessary to represent the multiplication of order
tensors higher than matrices.
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In Egison method, we can apply directly both “∂/∂” and “.” functions to tensors.
Egison program that represents the above formula
Formula of Riemann curvature tensor~: superscript_: subscript
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Wolfram program that represents the above formula
Egison program that represents the above formula
Formula of Riemann curvature tensor
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Currently, I am working to represent differential forms, exterior derivative, and
Hodge operator directly in Egison.
If we realize that, there are the wide range of application, e.g. mathematics,
physics, and computer simulation.