@**article**{RISC4309,author = {Johannes Middeke},

title = {{Conversion between Hermite and Popov normal forms using an FGLM-like approach}},

language = {english},

abstract = {We are working with matrices over a ring K[D;sigma,theta] of Ore
polynomials over a skew field K. Extending a result of Kojima et
al. for usual polynomials it is shown that in this setting the
Hermite and Popov normal forms correspond to Gröbner bases with
respect to certain orders. The FGLM algorithm is adapted to this
setting and used for converting Popov forms into Hermite forms
and vice versa. The approach works for arbitrary, ie, not
necessarily square matrices where we establish termination
criteria to deal with infinitely dimensional factor spaces.},

journal = {Albanian Journal of Mathematics},

volume = {4},

number = {4},

pages = {181--193},

publisher = {AulonaPress},

isbn_issn = {1930-1235},

year = {2010},

note = {Special Issue, Applications of Computer Algebra 2010, University of Vlora, Albania},

refereed = {yes},

length = {13}

}