{"status":"ok","message-type":"work","message-version":"1.0.0","message":{"indexed":{"date-parts":[[2025,12,11]],"date-time":"2025-12-11T07:08:53Z","timestamp":1765436933025},"reference-count":93,"publisher":"American Mathematical Society (AMS)","issue":"333","license":[{"start":{"date-parts":[[2022,9,16]],"date-time":"2022-09-16T00:00:00Z","timestamp":1663286400000},"content-version":"am","delay-in-days":365,"URL":"https:\/\/www.ams.org\/publications\/copyright-and-permissions"}],"funder":[{"DOI":"10.13039\/501100001665","name":"Agence Nationale de la Recherche","doi-asserted-by":"publisher","id":[{"id":"10.13039\/501100001665","id-type":"DOI","asserted-by":"publisher"}]}],"content-domain":{"domain":[],"crossmark-restriction":false},"short-container-title":["Math. Comp."],"abstract":"

Let \n\n \n E<\/mml:mi>\n E<\/mml:annotation>\n <\/mml:semantics>\n<\/mml:math>\n<\/inline-formula> be an ordinary elliptic curve over a finite field and \n\n \n g<\/mml:mi>\n g<\/mml:annotation>\n <\/mml:semantics>\n<\/mml:math>\n<\/inline-formula> be a positive integer. Under some technical assumptions, we give an algorithm to span the isomorphism classes of principally polarized abelian varieties in the isogeny class of \n\n \n \n E<\/mml:mi>\n g<\/mml:mi>\n <\/mml:msup>\n E^g<\/mml:annotation>\n <\/mml:semantics>\n<\/mml:math>\n<\/inline-formula>. The varieties are first described as hermitian lattices over (not necessarily maximal) quadratic orders and then geometrically in terms of their algebraic theta null point. We also show how to algebraically compute Siegel modular forms of even weight given as polynomials in the theta constants by a careful choice of an affine lift of the theta null point. We then use these results to give an algebraic computation of Serre\u2019s obstruction for principally polarized abelian threefolds isogenous to \n\n \n \n E<\/mml:mi>\n 3<\/mml:mn>\n <\/mml:msup>\n E^3<\/mml:annotation>\n <\/mml:semantics>\n<\/mml:math>\n<\/inline-formula> and of the Igusa modular form in dimension \n\n \n 4<\/mml:mn>\n 4<\/mml:annotation>\n <\/mml:semantics>\n<\/mml:math>\n<\/inline-formula>. We illustrate our algorithms with examples of curves with many rational points over finite fields.<\/p>","DOI":"10.1090\/mcom\/3672","type":"journal-article","created":{"date-parts":[[2021,12,10]],"date-time":"2021-12-10T16:42:56Z","timestamp":1639154576000},"page":"401-449","source":"Crossref","is-referenced-by-count":7,"title":["Spanning the isogeny class of a power of an elliptic curve"],"prefix":"10.1090","volume":"91","author":[{"given":"Markus","family":"Kirschmer","sequence":"first","affiliation":[]},{"given":"Fabien","family":"Narbonne","sequence":"additional","affiliation":[]},{"given":"Christophe","family":"Ritzenthaler","sequence":"additional","affiliation":[]},{"given":"Damien","family":"Robert","sequence":"additional","affiliation":[]}],"member":"14","published-online":{"date-parts":[[2021,9,16]]},"reference":[{"key":"1","series-title":"Translations of Mathematical Monographs","isbn-type":"print","doi-asserted-by":"publisher","DOI":"10.1090\/mmono\/079","volume-title":"Elements of the theory of elliptic functions","volume":"79","author":"Akhiezer, N. 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