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schubertpy
Overview
schubertpy is a powerful Python package designed for performing advanced mathematical operations on the Grassmannian, a key concept in algebraic geometry and representation theory. This module facilitates operations such as quantum Pieri rules, quantum Giambelli formulae, and the manipulation of Schubert classes. It is a Python implementation based on the comprehensive maple library available at https://sites.math.rutgers.edu/~asbuch/qcalc/.
Features
- Quantum Pieri Rule Calculations: Efficient computation of quantum Pieri rules applied to Schubert classes.
- Quantum Giambelli Formulae: Expression of products of Schubert classes in alternative forms using quantum Giambelli formulae.
- Schubert Class Operations: Perform actions and multiplications on Schubert classes, in both classical and quantum contexts.
- Dualization and Conversion: Dualize Schubert classes and convert between different Schubert class representations.
Installation
To install the schubertpy module, run the following command:
pip install schubertpy
Usage
Example usage demonstrating the capabilities of schubertpy:
from schubertpy import Grassmannian, OrthogonalGrassmannian, IsotropicGrassmannian
def main():
# Initialize the Grassmannian object with dimensions
gr = Grassmannian(2, 5)
print(gr.qpieri(1, 'S[2,1] - 7*S[3,2]'))
print(gr.qact('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(gr.qgiambelli('S[2,1]*S[2,1]'))
print(gr.qmult('S[2,1]', 'S[2,1]+S[3,2]'))
print(gr.qtoS('S[2,1]*S[2,1]*S[2,1]'))
print(gr.pieri(1, 'S[2,1] - 7*S[3,2]'))
print(gr.act('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(gr.giambelli('S[2,1]*S[2,1]'))
print(gr.mult('S[2,1]', 'S[2,1]+S[3,2]'))
print(gr.toS('S[2,1]*S[2,1]*S[2,1]'))
print(gr.dualize('S[1]+S[2]'))
ig = Grassmannian(2, 6)
print(ig.qpieri(1, 'S[2,1] - 7*S[3,2]'))
print(ig.qact('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(ig.qgiambelli('S[2,1]*S[2,1]'))
print(ig.qmult('S[2,1]', 'S[2,1]+S[3,2]'))
print(ig.qtoS('S[2,1]*S[2,1]*S[2,1]'))
print(ig.pieri(1, 'S[2,1] - 7*S[3,2]'))
print(ig.act('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(ig.giambelli('S[2,1]*S[2,1]'))
print(ig.mult('S[2,1]', 'S[2,1]+S[3,2]'))
print(ig.toS('S[2,1]*S[2,1]*S[2,1]'))
print(ig.dualize('S[1]+S[2]'))
og = Grassmannian(2, 6)
print(og.qpieri(1, 'S[2,1] - 7*S[3,2]'))
print(og.qact('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(og.qgiambelli('S[2,1]*S[2,1]'))
print(og.qmult('S[2,1]', 'S[2,1]+S[3,2]'))
print(og.qtoS('S[2,1]*S[2,1]*S[2,1]'))
print(og.pieri(1, 'S[2,1] - 7*S[3,2]'))
print(og.act('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(og.giambelli('S[2,1]*S[2,1]'))
print(og.mult('S[2,1]', 'S[2,1]+S[3,2]'))
print(og.toS('S[2,1]*S[2,1]*S[2,1]'))
print(og.dualize('S[1]+S[2]'))
og = Grassmannian(2, 7)
print(og.qpieri(1, 'S[2,1] - 7*S[3,2]'))
print(og.qact('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(og.qgiambelli('S[2,1]*S[2,1]'))
print(og.qmult('S[2,1]', 'S[2,1]+S[3,2]'))
print(og.qtoS('S[2,1]*S[2,1]*S[2,1]'))
print(og.pieri(1, 'S[2,1] - 7*S[3,2]'))
print(og.act('S[1]+S[2]*S[3]', 'S[2,1]+S[3,2]'))
print(og.giambelli('S[2,1]*S[2,1]'))
print(og.mult('S[2,1]', 'S[2,1]+S[3,2]'))
print(og.toS('S[2,1]*S[2,1]*S[2,1]'))
print(og.dualize('S[1]+S[2]'))
if __name__ == "__main__":
main()
For detailed examples and more operations, refer to the test cases provided within the module's documentation.
Running Tests
To verify the module's functionality, you can run the included tests with either of the following commands:
make test
Or directly with Python:
python3 -m unittest schubertpy/testcases/*.py
Contributing
Contributions to schubertpy are highly encouraged, whether they involve extending functionality, enhancing performance, or fixing bugs. Please feel free to submit issues or pull requests on GitHub to suggest changes or improvements.
License
schubertpy is made available under the MIT License. For more details, see the LICENSE file included with the source code.
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