finite projective plane造句
例句與造句
- Any finite projective plane of order is an ( ( configuration.
- The existence of finite projective planes of other orders is an open question.
- The construction also works over finite fields, providing examples in finite projective planes.
- Thus, every oval can be uniquely extended to a hyperoval in a finite projective plane of even order.
- In fact, for all known finite projective planes, the order " N " is a prime power.
- It's difficult to find finite projective plane in a sentence. 用finite projective plane造句挺難的
- In summary, von Staudt conics are not ovals in finite projective planes ( desarguesian or not ) of even order.
- A finite projective plane will produce a finite affine plane when one of its lines and the points on it are removed.
- When such a structure does exist, it is called a finite projective plane; thus showing how finite geometry and combinatorics intersect.
- In a finite projective plane ( not necessarily Desarguesian ) a set of points such that no three points of are hyperoval " '.
- In 1992 he received the Lester Randolph Ford Award for the article " The search for a finite projective plane of order 10 ".
- The eponymous Lam's problem is equivalent to finding a finite projective plane of order 10 or finding 9 orthogonal Latin squares of order 10.
- Let ? be a finite projective plane of order " N " with a proper subplane ? 0 of order " M ".
- It is also possible to give more precise statements in the case of a finite geometry, so we shall emphasize the results in finite projective planes.
- An oval in a finite projective plane of order is a ( )-Desarguesian ( pappian ) projective plane for odd are just the nonsingular conics.
- The "'order "'of a finite projective plane is, that is, one less than the number of points on a line.
更多例句: 下一頁