Abstract: Discusses the calculation of discriminants of polynomials. The discriminant is a function of the coefficients that indicates if the polynomial has any double roots.
This means that any 2DH tensor diagram consisting of polynomial nodes and epsilons represents a transfor- mational invariant. Tangency. Given the diagrams for ...
The discriminant of a polynomial is an example of an invariant quantity. When you calculate such a quantity for a polynomial its sign will remain unchanged if ...
It is shown that a relationship exists between the possible root structures of a 4th-order polynomial and the possible degeneracies of a 3rd-order curve.
Quartic discriminants and tensor invariants - ResearchGate
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Oct 22, 2024 · Discusses the calculation of discriminants of polynomials. The discriminant is a function of the coefficients that indicates if the ...
Discusses the calculation of discriminants of polynomials. The discriminant is a function of the coefficients that indicates if the polynomial has any ...
Most parallel manipulators have multiple solutions to the direct kinematic problem. The ability to perform assembly changing motions has received the ...
We establish a complete set of invariants for ternary quartic forms. Further, we express four classical invariants in terms of these generators.
Missing: Tensor | Show results with:Tensor
In the last post we discussed how the discriminant for a polynomial of degree n can be seen as an SL(2) invariants on a fully symmetric tensor of rank n.
Our bound on the primes appearing in the denom- inators of class invariants gives an explicit bound, closely related to the discriminant of the primitive ...
Missing: Tensor | Show results with:Tensor