In algebra and algebraic geometry, the multi-homogeneous Bézout theorem is a generalization to multi-homogeneous polynomials of Bézout's theorem, which counts the number of isolated common zeros of a set of homogeneous polynomials. This generalization is due to Igor Shafarevich.[1]
Given a polynomial equation or a system of polynomial equations it is often useful to compute or to bound the number of solutions without computing explicitly the solutions.
In the case of a single equation, this problem is solved by the fundamental theorem of algebra, which asserts that the number of complex solutions is bounded by the degree of the polynomial, with equality, if the solutions are counted with their multiplicities.
In the case of a system of polynomial equations in unknowns, the problem is solved by Bézout's theorem, which asserts that, if the number of complex solutions is finite, their number is bounded by the product of the degrees of the polynomials. Moreover, if the number of solutions at infinity is also finite, then the product of the degrees equals the number of solutions counted with multiplicities and including the solutions at infinity.
However, it is rather common that the number of solutions at infinity is infinite. In this case, the product of the degrees of the polynomials may be much larger than the number of roots, and better bounds are useful.
Multi-homogeneous Bézout theorem provides such a better root when the unknowns may be split into several subsets such that the degree of each polynomial in each subset is lower than the total degree of the polynomial. For example, let
p1,\ldots,p2n
x1,\ldotsxn,
y1,\ldotsyn.
22n,
\binom{2n}{n}=
| (2n)! | |
| (n!)2 |
\sim
| 22n | |
| \sqrt{\pin |
A multi-homogeneous polynomial is a polynomial that is homogeneous with respect to several sets of variables.
More precisely, consider positive integers
n1,\ldots,nk
ni+1
xi,0,xi,1,\ldots,
| x | |
| i,ni |
.
d1,\ldots,dk,
di
xi,0,xi,1,\ldots,
| x | |
| i,{ni |
A multi-projective variety is a projective subvariety of the product of projective spaces
| P | |
| n1 |
x … x
| P | |
| nk |
,
Pn
xi,0,xi,1,\ldots,xi,n
Bézout's theorem asserts that homogeneous polynomials of degree
d1,\ldots,dn
d1 … dn
For stating the generalization of Bézout's theorem, it is convenient to introduce new indeterminates
t1,\ldots,tk,
d1,\ldots,dk
d=d1t1+ … +dktk.
Setting
n=n1+ … +nk,
With above notation, multi-homogeneous polynomials of multi-degrees
d1,\ldots,dn
| n1 | |
| t | |
| 1 |
…
| nk | |
| t | |
| k |
d1 … dn.
The multi-homogeneous Bézout bound on the number of solutions may be used for non-homogeneous systems of equations, when the polynomials may be (multi)-homogenized without increasing the total degree. However, in this case, the bound may be not sharp, if there are solutions "at infinity".
Without insight on the problem that is studied, it may be difficult to group the variables for a "good" multi-homogenization. Fortunately, there are many problems where such a grouping results directly from the problem that is modeled. For example, in mechanics, equations are generally homogeneous or almost homogeneous in the lengths and in the masses.