Box spline
The box spline $ M _ \Xi $
associated with the $ ( s \times n ) $-
matrix $ \Xi = [ \xi _ {1} \dots \xi _ {n} ] $
of its directions $ \xi _ {i} $(
assumed non-zero) is the distribution defined inductively by
$$ M _ {[ \Xi, \zeta ] } = \int\limits _ { 0 } ^ { 1 } {M _ \Xi ( \cdot - t \zeta ) } {d t } $$
with $ M _ {[ ] } $ the point evaluation at $ 0 \in \mathbf R ^ {s} $. This implies that $ M _ \Xi \phi = \int {\phi ( \Xi t ) } {d t } $, with the integral taken over the half-open unit $ n $- cube $ [ 0,1 ) ^ {n} $.
$ M _ \Xi $ is (representable as) a piecewise-polynomial function on the linear hull $ { \mathop{\rm ran} } \Xi $ of its directions, with support in the convex hull of its directions, its polynomial degree being equal to $ s - { \mathop{\rm dim} } { \mathop{\rm ran} } \Xi $, its discontinuities on hyperplanes in $ { \mathop{\rm ran} } \Xi $ spanned by its directions, and its smoothness across such a hyperplane determined by the number of directions lying in that hyperplane.
For $ s = 1 $ and $ \Xi = [ 1 \dots 1 ] $, $ M _ \Xi $ is the uniform or cardinal B-spline. Correspondingly, the extant box spline theory (see [a1]) is a partial lifting of Schoenberg's cardinal spline theory [a2]. Its highlights include a study of the linear independence of the integer translates of a box spline (with integer directions), the shift-invariant spaces spanned by the integer translates of one or more box splines, the dimension of the space of polynomials contained in such a box spline space, the refinability of such box splines and the related subdivision schemes and discrete box splines.
References
[a1] | C. de Boor, K. Höllig, S. Riemenschneider, "Box splines" , Appl. Math. Sci. , 98 , Springer (1993) |
[a2] | I.J. Schoenberg, "Cardinal spline interpolation" , CMBS , SIAM (1973) |
Box spline. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Box_spline&oldid=16133