What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
1 | initial version |
What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
2 | retagged |
What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
At very least it should be accepted by PolynomialRing
as the domain for coefficients.
4 | retagged |
What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
At very least it should be accepted by PolynomialRing
as the domain for coefficients.
5 | retagged |
What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
At very least it should be accepted by PolynomialRing
as the domain for coefficients.
6 | retagged |
What would be the simplest way to define the semiring with elements $\{0, 1\}$ with the logical OR ($|$) operation as addition and the standard integer multiplication?
At very least it should be accepted by PolynomialRing
as the domain for coefficients.