Revision as of 02:35, 9 October 2013 edit SchreiberBike (talk \| contribs) Autopatrolled, Extended confirmed users, Pending changes reviewers 313,169 edits Disambiguation needed for the link lattice. ← Previous edit		Revision as of 14:53, 24 October 2013 edit undo Alex Selby (talk \| contribs) 115 edits m →Definition: Disambiguated "Lattice" Next edit →
Line 6: :<math>\Theta_\Lambda(\tau) = \sum_{x\in\Lambda}e^{i\pi\tau\\|x\\|^2}\qquad\mathrm{Im}\,\tau > 0.</math> The theta function of a [[Lattice (discrete subgroup)\|lattice]]~~{{dn\|date=October 2013}}~~ is then a [[holomorphic function]] on the [[upper half-plane]]. Furthermore, the theta function of an even [[unimodular lattice]] of rank ''n'' is actually a [[modular form]] of weight ''n''/2. The theta function of an integral lattice is often written as a power series in <math>q = e^{2i\pi\tau}</math> so that the coefficient of ''q''<sup>''n''</sup> gives the number of lattice vectors of norm 2''n''. ==References==

Theta function of a lattice: Difference between revisions